uniq xref Type 1 name AFII rq-1 rq-2 MAT C entity set els AMS/TeX name APS AIP ACS IEEE Wolfram Springer KAP DesSci M-Pi Z-id description 00020 space 0 space 00021 exclam 0021 4DQ P excl ISONUM Q\exclam 0x0021 exclamation mark 00021 exclam EE35 0dQ N fact factorial 00022 quotedbl 0022 4DQ quot ISONUM L\textquotedbl 0x0022 quotation mark 00023 numbersign 0023 2DO N num ISONUM P\# num mesh NumberSign 0x0023 number sign 00024 dollar 00A4 2FO N dollar ISONUM bhc C\textdollar dollar dollar 0x0024 dollar sign 00025 percent 0025 2DO N percnt ISONUM P\% percnt percent 0x0025 percent sign 00026 ampersand 0026 2FO N amp ISONUM bha P\& amp amp 0x0026 ampersand 00027 quotesingle 0027 4DQ apos ISONUM 0x0027 apostrophe 00028 parenleft 0028 4DF O lpar ISONUM Q\lparen lpar 0x0028 3 63 left parenthesis #00028 uni0028.lgdisplay1 0028 1DF O lpar ISONUM Q\lparen lpar 0x0028 3 63 left parenthesis #00028 uni0028.lgdisplay2 0028 1DF O lpar ISONUM Q\lparen lpar 0x0028 3 63 left parenthesis #00028 uni0028.lgdisplay3 0028 1DF O lpar ISONUM Q\lparen lpar 0x0028 3 63 left parenthesis #00028 uni0028.lgdisplay4 0028 1DF O lpar ISONUM Q\lparen lpar 0x0028 3 63 left parenthesis 00029 parenright 0029 4DF C rpar ISONUM Q\rparen rpar 0x0029 3 78 right parenthesis #00029 uni0029.lgdisplay1 0029 1DF C rpar ISONUM Q\rparen rpar 0x0029 3 78 right parenthesis #00029 uni0029.lgdisplay2 0029 1DF C rpar ISONUM Q\rparen rpar 0x0029 3 78 right parenthesis #00029 uni0029.lgdisplay3 0029 1DF C rpar ISONUM Q\rparen rpar 0x0029 3 78 right parenthesis #00029 uni0029.lgdisplay4 0029 1DF C rpar ISONUM Q\rparen rpar 0x0029 3 78 right parenthesis 0002A asterisk 002A 2FO N ast ISONUM bl8 ast 0x002A /ast B: asterisk [high; not /ast B:] 0002B plus 002B 2DR B plus ISONUM Q\plus plus plus 0x002B 1 31 plus sign B: 0002C comma 002C 4DQ P comma ISONUM 0x002C comma 0002D hyphen 002D 2DP hyphen 0x002D hyphen-minus 0002E period 002E 4DQ P period ISONUM \ldotp 0x002E full stop, period 0002F 002F slash 002F 4DQ R sol ISONUM pf1 sol 0x002F 1 2F solidus +0002F E687 slash 0FB A pf1 Q\textslash slash (phonetic symbol) #0002F 002F uni002F.lgdisplay1 002F 1DQ R sol ISONUM pf1 sol 0x002F 1 2F solidus #0002F 002F uni002F.lgdisplay2 002F 1DQ R sol ISONUM pf1 sol 0x002F 1 2F solidus #0002F 002F uni002F.lgdisplay3 002F 1DQ R sol ISONUM pf1 sol 0x002F 1 2F solidus #0002F 002F uni002F.lgdisplay4 002F 1DQ R sol ISONUM pf1 sol 0x002F 1 2F solidus 00030 zero 4DA N 0x0030 digit 0 00031 one 4DA N 0x0031 digit 1 00032 two 4DA N 0x0032 digit 2 00033 three 4DA N 0x0033 digit 3 00034 four 4DA N 0x0034 digit 4 00035 five 4DA N 0x0035 digit 5 00036 six 4DA N 0x0036 digit 6 00037 seven 4DA N 0x0037 digit 7 00038 eight 4DA N 0x0038 digit 8 00039 nine 4DA N 0x0039 digit 9 0003A colon 003A 4DQ P colon ISONUM \colon 0x003A colon 0003B semicolon 003B 4DQ P semi ISONUM Q\semicolon 0x003B semicolon P: 0003C less 003C 2FR R lt ISONUM bka A\less lt lt r148 0x003C 1 2C less-than sign R: 0003D equal 003D 2DR R equals ISONUM Q\equal equals equals r149 0x003D 1 35 equals sign R: 0003E greater 003E 2FR R gt ISONUM bma A\greater gt gt r150 0x003E 1 2E greater-than sign R: 0003F question 003F 4DQ P quest ISONUM 0x003F question mark 00040 at 0040 2DO N commat ISONUM Q\textatsign at 0x0040 commercial at 00041 A 4DA A 0x0041 Latin capital letter A 00042 B 4DA A 0x0042 Latin capital letter B 00043 C 4DA A 0x0043 Latin capital letter C 00044 D 4DA A 0x0044 Latin capital letter D 00045 E 4DA A 0x0045 Latin capital letter E 00046 F 4DA A 0x0046 Latin capital letter F 00047 G 4DA A 0x0047 Latin capital letter G 00048 H 4DA A 0x0048 Latin capital letter H 00049 I 4DA A 0x0049 Latin capital letter I 0004A J 4DA A 0x004A Latin capital letter J 0004B K 4DA A 0x004B Latin capital letter K 0004C L 004C 4DA A pfl 0x004C Latin capital letter L 0004D M 4DA A pem 0x004D Latin capital letter M +0004D E686 M 0FB A pem capital M (phonetic symbol) 0004E N 4DA A 0x004E Latin capital letter N 0004F O 4DA A 0x004F Latin capital letter O 00050 P 4DA A 0x0050 Latin capital letter P 00051 Q 4DA A 0x0051 Latin capital letter Q 00052 R 4DA A 0x0052 Latin capital letter R 00053 S 4DA A 0x0053 Latin capital letter S 00054 T 4DA A 0x0054 Latin capital letter T 00055 U 4DA A 0x0055 Latin capital letter U 00056 V 4DA A 0x0056 Latin capital letter V 00057 W 4DA A 0x0057 Latin capital letter W 00058 X 4DA A 0x0058 Latin capital letter X 00059 Y 4DA A 0x0059 Latin capital letter Y 0005A Z 4DA A 0x005A Latin capital letter Z 0005B bracketleft 005B 4DF O lsqb ISONUM P\lbrack lsqb \lbrack 0x005B 3 66 left square bracket #0005B uni005B.lgdisplay1 005B 1DF O lsqb ISONUM P\lbrack lsqb \lbrack 0x005B 3 66 left square bracket #0005B uni005B.lgdisplay2 005B 1DF O lsqb ISONUM P\lbrack lsqb \lbrack 0x005B 3 66 left square bracket #0005B uni005B.lgdisplay3 005B 1DF O lsqb ISONUM P\lbrack lsqb \lbrack 0x005B 3 66 left square bracket #0005B uni005B.lgdisplay4 005B 1DF O lsqb ISONUM P\lbrack lsqb \lbrack 0x005B 3 66 left square bracket 0005C 005C backslash EE3C 2X5A 2DO N bsol ISONUM P\backslash bsol bsol \backslash 0x005C 1 5C reverse solidus +0005C E64A backslash 0FZ pl1 L\textbackslash small backslash (phonetic symbol) #0005C 005C uni005C.lgdisplay1 EE3C 2X5A 1DO N bsol ISONUM P\backslash bsol bsol \backslash 0x005C 1 5C reverse solidus #0005C 005C uni005C.lgdisplay2 EE3C 2X5A 1DO N bsol ISONUM P\backslash bsol bsol \backslash 0x005C 1 5C reverse solidus #0005C 005C uni005C.lgdisplay3 EE3C 2X5A 1DO N bsol ISONUM P\backslash bsol bsol \backslash 0x005C 1 5C reverse solidus #0005C 005C uni005C.lgdisplay4 EE3C 2X5A 1DO N bsol ISONUM P\backslash bsol bsol \backslash 0x005C 1 5C reverse solidus 0005D bracketright 005D 4DF C rsqb ISONUM P\rbrack rsqb \rbrack 0x005D 3 67 right square bracket #0005D uni005D.lgdisplay1 005D 1DF C rsqb ISONUM P\rbrack rsqb \rbrack 0x005D 3 67 right square bracket #0005D uni005D.lgdisplay2 005D 1DF C rsqb ISONUM P\rbrack rsqb \rbrack 0x005D 3 67 right square bracket #0005D uni005D.lgdisplay3 005D 1DF C rsqb ISONUM P\rbrack rsqb \rbrack 0x005D 3 67 right square bracket #0005D uni005D.lgdisplay4 005D 1DF C rsqb ISONUM P\rbrack rsqb \rbrack 0x005D 3 67 right square bracket 0005E asciicircum 005E 2DO L\textasciicircum 0x005E spacing circumflex 0005F underscore 005F 2DO lowbar ISONUM L\textunderscore lowbar 0x005F low line 00060 grave 0060 2DO L\textasciigrave 0x0060 spacing grave 00061 a 4DA A paa 0x0061 Latin small letter a +00061 E62E a E25B 0FB A paa open front unrounded vowel 00062 b 4DA A pab 0x0062 Latin small letter b +00062 E668 b E2A3 0FB A pab voiced bilabial plosive 00063 c 4DA A pac 0x0063 Latin small letter c +00063 E669 c E2D8 0FB A pac voiceless palatal plosive 00064 d 4DA A pad 0x0064 Latin small letter d +00064 E66A d E2B1 0FB A pad voiced dental or alveolar plosive 00065 e 4DA A pae 0x0065 Latin small letter e +00065 E66B e E256 0FB A pae half-close front unrounded vowel 00066 f 4DA A paf 0x0066 Latin small letter f +00066 E66C f E2AC 0FB A paf voiceless labiodental fricative 00067 g 4DA A 0x0067 Latin small letter g +00067 E3D1 g E2E3 0 Z A velar implosive 00068 h 4DA A pah 0x0068 Latin small letter h +00068 E66D h E2EE 0FB A pah voiceless glottal fricative 00069 i 4DA A pai 0x0069 Latin small letter i +00069 E66E i E251 0FB A pai close front unrounded vowel 0006A j 4DA A paj 0x006A Latin small letter j +0006A E66F j E2DB 0FB A paj voiced palatal fricative or approximant 0006B k 4DA A pak 0x006B Latin small letter k +0006B E670 k E2DE 0FB A pak voiceless velar plosive 0006C l 4DA A pal 0x006C Latin small letter l +0006C E671 l E2BD 0FB A pal pell dental or alveolar lateral approximant 0006D m 4DA A pam 0x006D Latin small letter m +0006D E672 m E2A1 0FB A pam bilabial nasal 0006E n 4DA A pan 0x006E Latin small letter n +0006E E673 n E2AF 0FB A pan dental or alveolar nasal 0006F o 4DA A pao 0x006F Latin small letter o +0006F E674 o E269 0FB A pao half-close back rounded vowel 00070 p 4DA A pap 0x0070 Latin small letter p +00070 E675 p E2A2 0FB A pap voiceless bilabial plosive 00071 q 4DA A paq 0x0071 Latin small letter q +00071 E676 q E2E6 0FB A paq voiceless uvular plosive 00072 r 4DA A par 0x0072 Latin small letter r +00072 E677 r E2C0 0FB A par alveolar trill 00073 s 4DA A pas 0x0073 Latin small letter s +00073 E678 s E2B6 0FB A pas voiceless alveolar median fricative 00074 t 4DA A pat 0x0074 Latin small letter t +00074 E679 t E2B0 0FB A pat voiceless dental or alveolar plosive 00075 u 4DA A pau 0x0075 Latin small letter u +00075 E67A u E265 0FB A pau close back rounded vowel 00076 v 4DA A pav 0x0076 Latin small letter v +00076 E67B v E2AD 0FB A pav voiced labiodental fricative 00077 w 4DA A paw 0x0077 Latin small letter w +00077 E67C w E2A8 0FB A paw labial-velar approximant %00077 E631 uni0077.subscript 1FZ pc3 Q\textsubwvar subscript w (phonetic symbol) 00078 x 4DA A pax 0x0078 Latin small letter x +00078 E67D x E2E0 0FB A pax voiceless velar fricative 00079 y 4DA A pay 0x0079 Latin small letter y +00079 E67E y E252 0FB A pay close front rounded vowel 0007A z 4DA A paz 0x007A Latin small letter z +0007A E67F z E2B7 0FB A paz voiced alveolar median fricative 0007B braceleft 007B 4DF O lcub ISONUM P\lbrace lcub \lbrace 0x007B 3 68 left curly bracket #0007B uni007B.lgdisplay1 007B 1DF O lcub ISONUM P\lbrace lcub \lbrace 0x007B 3 68 left curly bracket #0007B uni007B.lgdisplay2 007B 1DF O lcub ISONUM P\lbrace lcub \lbrace 0x007B 3 68 left curly bracket #0007B uni007B.lgdisplay3 007B 1DF O lcub ISONUM P\lbrace lcub \lbrace 0x007B 3 68 left curly bracket #0007B uni007B.lgdisplay4 007B 1DF O lcub ISONUM P\lbrace lcub \lbrace 0x007B 3 68 left curly bracket 0007C 007C bar 007C 4X10 2FF F verbar ISONUM bdk P\vert \vert 0x007C vertical bar +0007C E3D5 uni007C EE7C 0 F F vertdel P\vert /vert - vertical bar, absolute value 0007D braceright 007D 4DF C rcub ISONUM P\rbrace rcub \rbrace 0x007D 3 6A right curly bracket #0007D uni007D.lgdisplay1 007D 1DF C rcub ISONUM P\rbrace rcub \rbrace 0x007D 3 6A right curly bracket #0007D uni007D.lgdisplay2 007D 1DF C rcub ISONUM P\rbrace rcub \rbrace 0x007D 3 6A right curly bracket #0007D uni007D.lgdisplay3 007D 1DF C rcub ISONUM P\rbrace rcub \rbrace 0x007D 3 6A right curly bracket #0007D uni007D.lgdisplay4 007D 1DF C rcub ISONUM P\rbrace rcub \rbrace 0x007D 3 6A right curly bracket 0007E asciitilde 007E 2DO L\textasciitilde 0x007E tilde 0007F uni007F 0D 0x007F delete %000A0 uni00A0 EF21 0 nbsp ISONUM NonBreakingSpace 0x00A0 no break (required) space 000A1 exclamdown 00A1 4FQ P iexcl ISONUM cge L\textexclamdown iexcl DownExclamation 0x00A1 inverted exclamation mark 000A2 cent 00A2 4FA N cent ISONUM bhb C\textcent cent Cent 0x00A2 cent sign 000A3 sterling 00A3 4FA N pound ISONUM bhd A\sterling pound Sterling 0x00A3 pound sign %000A4 currency 0024 2DO N curren ISONUM C\textcurrency Currency 0x00A4 general currency sign 000A5 yen 00A5 4FA N yen ISONUM bhf A\yen yen Yen 0x00A5 yen sign 000A6 brokenbar EF6B 1FN N brvbar ISONUM ben C\textbrokenbar 0x00A6 broken (vertical) bar 000A7 section 00A7 4FA N sect ISONUM bfc P\S sect Section 0x00A7 section sign 000A8 dieresis 2DO C\textasciidieresis 0x00A8 diaeresis 000A9 copyright 00D3 2FO N copy ISONUM bhr L\textcopyright copy Copyright 0x00A9 copyright sign 000AA ordfeminine 00E3 4FA ordf ISONUM cfu L\textordfeminine 0x00AA ordinal indicator, feminine 000AB guillemotleft 00AB 4FQ O laquo ISONUM ce8 L\guillemotleft laquo LeftGuillemet 0x00AB double angle quotation mark (guillemet), left 000AC logicalnot EF6A 2FO N not ISONUM bro P\neg not urcorn \neg Not 0x00AC /neg /lnot not sign %000AD uni00AD EF23 0 shy ISONUM Hyphen 0x00AD soft hyphen 000AE registered 00D2 2FO N reg ISONUM bhs L\textregistered circR reg RegisteredTrademark 0x00AE registered sign 000AF macron 2DO C\textasciimacron 0x00AF macron 000B0 degree 00B0 2FO N deg ISONUM bk7 L\textdegree deg deg Degree \degree 0x00B0 1 38 degree sign 000B1 plusminus 00B1 2FR B plusmn ISONUM btc P\pm plusmn plusmn plusmn \pm PlusMinus 0x00B1 1 36 plus-or-minus sign %000B2 twosuperior 00B2 2 O sup2 ISONUM C\texttwosuperior 0x00B2 superscript two %000B3 threesuperior 00B3 2 O sup3 ISONUM C\textthreesuperior 0x00B3 superscript three 000B4 acute 2323 2DO L\textasciiacute 0x00B4 spacing acute 000B5 mu 00B5 2 O N micro ISONUM C\textmu Micro 0x00B5 micro sign 000B6 paragraph 00B6 4FA N para ISONUM bfd P\P para Paragraph 0x00B6 pilcrow (paragraph sign) 000B7 periodcentered 00B7 2FR B middot ISONUM bo0 P\cdotp \cdotp CenterDot 0x00B7 /centerdot B: middle dot +000B7 E626 periodcentered 00B7 1FN middot ISONUM can L\textperiodcentered middle dot 000B8 cedilla 2DO 0x00B8 cedilla %000B9 onesuperior 00D1 2 O sup1 ISONUM C\textonesuperior 0x00B9 superscript one 000BA ordmasculine 00EB 4FA ordm ISONUM cfv L\textordmasculine 0x00BA ordinal indicator, masculine 000BB guillemotright 00BB 4FQ C raquo ISONUM cf8 L\guillemotright raquo RightGuillemet 0x00BB double angle quotation mark (guillemet), right %000BC onequarter 00BC 2DX frac14 ISONUM C\textonequarter 0x00BC fraction one-quarter 000BD onehalf 00BD 2DX frac12 ISONUM C\textonehalf 0x00BD fraction one-half %000BE threequarters 00BE 2DX frac34 ISONUM C\textthreequarters 0x00BE fraction three-quarters 000BF questiondown 00BF 4FQ P iquest ISONUM cgq L\textquestiondown iquest DownQuestion 0x00BF inverted question mark 000C0 Agrave 4 A A CapitalAGrave 0x00C0 Latin capital letter A with grave 000C1 Aacute 4 A A CapitalAAcute 0x00C1 Latin capital letter A with acute 000C2 Acircumflex 4 A A CapitalAHat 0x00C2 Latin capital letter A with circumflex 000C3 Atilde 4 A A CapitalATilde 0x00C3 Latin capital letter A with tilde 000C4 Adieresis 4 A A CapitalADoubleDot 0x00C4 Latin capital letter A with diaeresis 000C5 Aring 4 A A P\AA CapitalARing 0x00C5 Latin capital letter A with ring above 000C6 AE 00E1 4FA A AElig ISOlat1 cfb P\AE AElig CapitalAE 0x00C6 AE digraph, uppercase 000C7 Ccedilla 4 A A CapitalCCedilla 0x00C7 Latin capital letter C with cedilla 000C8 Egrave 4 A A CapitalEGrave 0x00C8 Latin capital letter E with grave 000C9 Eacute 4 A A CapitalEAcute 0x00C9 Latin capital letter E with acute 000CA Ecircumflex 4 A A CapitalEHat 0x00CA Latin capital letter E with circumflex 000CB Edieresis 4 A A CapitalEDoubleDot 0x00CB Latin capital letter E with diaeresis 000CC Igrave 4 A A CapitalIGrave 0x00CC Latin capital letter I with grave 000CD Iacute 4 A A CapitalIAcute 0x00CD Latin capital letter I with acute 000CE Icircumflex 4 A A CapitalIHat 0x00CE Latin capital letter I with circumflex 000CF Idieresis 4 A A CapitalIDoubleDot 0x00CF Latin capital letter I with diaeresis 000D0 00D0 Eth 00E2 4FA A ETH ISOlat1 pfd L\DH CapitalEth 0x00D0 D with stroke, uppercase; also, uppercase Eth (Icelandic) 000D1 Ntilde 4 A A CapitalNTilde 0x00D1 Latin capital letter N with tilde 000D2 Ograve 4 A A CapitalOGrave 0x00D2 Latin capital letter O with grave 000D3 Oacute 4 A A CapitalOAcute 0x00D3 Latin capital letter O with acute 000D4 Ocircumflex 4 A A CapitalOHat 0x00D4 Latin capital letter O with circumflex 000D5 Otilde 4 A A CapitalOTilde 0x00D5 Latin capital letter O with tilde 000D6 Odieresis 4 A A CapitalODoubleDot 0x00D6 Latin capital letter O with diaeresis 000D7 multiply 00B4 2FR B times ISONUM bsa P\times times times \times Times 0x00D7 1 33 xx78 multiply sign 000D8 Oslash 00E9 4FA A Oslash ISOlat1 cfp P\O CapitalOSlash 0x00D8 O with slash, uppercase 000D9 Ugrave 4 A A CapitalUGrave 0x00D9 Latin capital letter U with grave 000DA Uacute 4 A A CapitalUAcute 0x00DA Latin capital letter U with acute 000DB Ucircumflex 4 A A CapitalUHat 0x00DB Latin capital letter U with circumflex 000DC Udieresis 4 A A CapitalUDoubleDot 0x00DC Latin capital letter U with diaeresis 000DD Yacute 4 A A CapitalYAcute 0x00DD Latin capital letter Y with acute 000DE Thorn 00EC 4FA A THORN ISOlat1 pcp L\TH bthorn CapitalThorn 0x00DE Thorn, uppercase 000DF germandbls 00FB 4FA A szlig ISOlat1 cfs P\ss gbeta SZ 0x00DF s, double 000E0 agrave 4 A A AGrave 0x00E0 Latin small letter a with grave 000E1 aacute 4 A A AAcute 0x00E1 Latin small letter a with acute 000E2 acircumflex 4 A A AHat 0x00E2 Latin small letter a with circumflex 000E3 atilde 4 A A ATilde 0x00E3 Latin small letter a with tilde 000E4 adieresis 4 A A ADoubleDot 0x00E4 Latin small letter a with diaeresis 000E5 aring 4 A A P\aa ARing 0x00E5 Latin small letter a with ring above 000E6 ae 00F1 4FA A aelig ISOlat1 cfa P\ae aelig AE 0x00E6 ae digraph, lowercase +000E6 ae E25A 0f0 A pea P\ae AE low front unrounded vowel 000E7 ccedilla E2DA 4FA A ccedil ISOlat1 pcc cedilac CCedilla 0x00E7 voiceless palatal fricative 000E8 egrave 4 A A EGrave 0x00E8 Latin small letter e with grave 000E9 eacute 4 A A EAcute 0x00E9 Latin small letter e with acute 000EA ecircumflex 4 A A EHat 0x00EA Latin small letter e with circumflex 000EB edieresis 4 A A EDoubleDot 0x00EB Latin small letter e with diaeresis 000EC igrave 4 A A IGrave 0x00EC Latin small letter i with grave 000ED iacute 4 A A IAcute 0x00ED Latin small letter i with acute 000EE icircumflex 4 A A IHat 0x00EE Latin small letter i with circumflex 000EF idieresis 4 A A IDoubleDot 0x00EF Latin small letter i with diaeresis 000F0 eth 00F3 4FA A eth ISOlat1 bhj L\dh eth edh Eth 0x00F0 eth +000F0 eth E2B3 0f0 A ped Eth voiced dental fricative 000F1 ntilde F1CC 4FA A ntilde ISOlat1 pbn NTilde 0x00F1 Latin small letter n with tilde 000F2 ograve 4 A A OGrave 0x00F2 Latin small letter o with grave 000F3 oacute 4 A A OAcute 0x00F3 Latin small letter o with acute 000F4 ocircumflex 4 A A OHat 0x00F4 Latin small letter o with circumflex 000F5 otilde 4 A A OTilde 0x00F5 Latin small letter o with tilde 000F6 odieresis 4 A A ODoubleDot 0x00F6 Latin small letter o with diaeresis 000F7 divide 00B8 2FR B divide ISONUM bto P\div divide divide divide \div Divide 0x00F7 1 34 divide sign 000F8 oslash 00F9 4FA A oslash ISOlat1 cfo P\o slasho OSlash 0x00F8 o with slash, lowercase +000F8 oslash 00F9 0FA A oslash ISOlat1 pdo P\o slasho OSlash 0x00F8 o with slash, lowercase (phonetic symbol) 000F9 ugrave 4 A A UGrave 0x00F9 Latin small letter u with grave 000FA uacute 4 A A UAcute 0x00FA Latin small letter u with acute 000FB ucircumflex 4 A A UHat 0x00FB Latin small letter u with circumflex 000FC udieresis 4 A A UDoubleDot 0x00FC Latin small letter u with diaeresis 000FD yacute 4 A A YAcute 0x00FD Latin small letter y with acute 000FE thorn 00FC 4FA A thorn ISOlat1 pbp L\th abthorn Thorn 0x00FE thorn, lowercase 000FF ydieresis 4 A A YDoubleDot 0x00FF Latin small letter y with diaeresis 00100 uni0100 4 A A CapitalABar Latin capital letter A with macron 00101 uni0101 4 A A ABar Latin small letter a with macron 00102 uni0102 4 A A CapitalACup Latin capital letter A with breve 00103 uni0103 4 A A ACup Latin small letter a with breve 00104 uni0104 4 A A Latin capital letter A with ogonek 00105 uni0105 4 A A Latin small letter a with ogonek 00106 uni0106 4 A A CapitalCAcute Latin capital letter C with acute 00107 uni0107 4 A A CAcute Latin small letter c with acute 00108 uni0108 4 A A Latin capital letter C with circumflex 00109 uni0109 4 A A Latin small letter c with circumflex 0010A uni010A 4 A A Latin capital letter C with dot above 0010B uni010B 4 A A Latin small letter c with dot above 0010C uni010C 4 A A CapitalCHacek Latin capital letter C with caron 0010D uni010D F1AE 4FA A ccaron ISOlat2 pbc hacekc CHacek hachek c = caron c 0010E uni010E 4 A A Latin capital letter D with caron 0010F uni010F 4 A A Latin small letter d with caron =00110 uni0110 00E2 4FA A Dstrok ISOlat2 cfd L\DJ Latin capital letter D with stroke +00110 E68E uni0110 0f0 A phd Q\textcrD = pfd; crossed D (phonetic symbol) 00111 uni0111 00F2 4FA A dstrok ISOlat2 cfc L\dj Latin small letter d with stroke +00111 uni0111 00F2 0f0 A dstrok ISOlat2 pgd T\textcrd Latin small letter d with stroke 00112 uni0112 4 A A CapitalEBar Latin capital letter E with macron 00113 uni0113 4 A A EBar Latin small letter e with macron 00114 uni0114 4 A A CapitalECup Latin capital letter E with breve 00115 uni0115 4 A A ECup Latin small letter e with breve 00116 uni0116 4 A A Latin capital letter E with dot above 00117 uni0117 4 A A Latin small letter e with dot above 00118 uni0118 4 A A Latin capital letter E with ogonek 00119 uni0119 4 A A Latin small letter e with ogonek 0011A uni011A 4 A A Latin capital letter E with caron 0011B uni011B 4 A A Latin small letter e with caron 0011C uni011C 4 A A Latin capital letter G with circumflex 0011D uni011D 4 A A Latin small letter g with circumflex 0011E uni011E 4 A A Latin capital letter G with breve 0011F uni011F 4 A A Latin small letter g with breve 00120 uni0120 4 A A Latin capital letter G with dot above 00121 uni0121 4 A A Latin small letter g with dot above 00122 uni0122 4 A A Latin capital letter G with cedilla 00123 uni0123 4 A A Latin small letter g with cedilla 00124 uni0124 4 A A Latin capital letter H with circumflex 00125 uni0125 4 A A Latin small letter h with circumflex 00126 uni0126 4 A A Latin capital letter H with stroke 00127 uni0127 E2EB 4FA A hstrok ISOlat2 pbh T\textcrh barh voiceless pharyngeal fricative 00128 uni0128 4 A A Latin capital letter I with tilde 00129 uni0129 4 A A Latin small letter i with tilde 0012A uni012A 4 A A Latin capital letter I with macron 0012B uni012B 4 A A Latin small letter i with macron 0012C uni012C 4 A A CapitalICup Latin capital letter I with breve 0012D uni012D 4 A A ICup Latin small letter i with breve 0012E uni012E 4 A A Latin capital letter I with ogonek 0012F uni012F 4 A A Latin small letter i with ogonek 00130 uni0130 4 A A Latin capital letter I with dot above 00131 dotlessi 00F5 4FA A inodot ISOlat2 pei P\i inodot DotlessI 0x0131 latin small letter dotless i +00131 D6A4 u1D6A4 00F5 0f0 A imath ISOAMSO cfh P\imath inodot inodot \imath ScriptDotlessI small i, no dot 00132 uni0132 4 A A Latin capital ligature IJ 00133 uni0133 4 A A Latin small ligature ij 00134 uni0134 4 A A Latin capital letter J with circumflex 00135 uni0135 4 A A Latin small letter j with circumflex 00136 uni0136 4 A A Latin capital letter K with cedilla 00137 uni0137 4 A A Latin small letter k with cedilla 00138 uni0138 4 A A Latin small letter kra (Greenlandic) 00139 uni0139 4 A A Latin capital letter L with acute 0013A uni013A 4 A A Latin small letter l with acute 0013B uni013B 4 A A Latin capital letter L with cedilla 0013C uni013C 4 A A Latin small letter l with cedilla 0013D uni013D 4 A A Latin capital letter L with caron 0013E uni013E 4 A A Latin small letter l with caron 0013F uni013F 4 A A Latin capital letter L with middle dot 00140 uni0140 4 A A Latin small letter l with middle dot 00141 Lslash 00E8 4FA A Lstrok ISOlat2 cfm P\L Lstrok \L CapitalLSlash 0x0141 L with stroke, uppercase (polish) 00142 lslash 00F8 4FA A lstrok ISOlat2 cfl P\l lstrok \l LSlash 0x0142 l with stroke, lowercase (polish) 00143 uni0143 4 A A Latin capital letter N with acute 00144 uni0144 4 A A Latin small letter n with acute 00145 uni0145 4 A A Latin capital letter N with cedilla 00146 uni0146 4 A A Latin small letter n with cedilla 00147 uni0147 4 A A Latin capital letter N with caron 00148 uni0148 4 A A Latin small letter n with caron 00149 uni0149 4 A A Latin small letter n preceded by apostrophe 0014A uni014A 4 A A L\NG Latin capital letter ENG 0014B uni014B E2DD 4FA A eng ISOlat2 pdn L\ng rhookn velar nasal 0014C uni014C 4 A A Latin capital letter O with macron 0014D uni014D 4 A A Latin small letter o with macron 0014E uni014E 4 A A Latin capital letter O with breve 0014F uni014F 4 A A Latin small letter o with breve 00150 uni0150 4 A A CapitalODoubleAcute Latin capital letter O with double acute 00151 uni0151 4 A A ODoubleAcute Latin small letter o with double acute 00152 OE 00EA 4FA A OElig ISOlat2 cff P\OE Celig 0x0152 OE digraph, uppercase 00153 oe 00FA 4FA A oelig ISOlat2 cfe P\oe oelig 0x0153 oe digraph, lowercase +00153 oe E259 0f0 A peo P\oe oelig half-open front rounded vowel 00154 uni0154 4 A A Latin capital letter R with acute 00155 uni0155 4 A A Latin small letter r with acute 00156 uni0156 4 A A Latin capital letter R with cedilla 00157 uni0157 4 A A Latin small letter r with cedilla 00158 uni0158 4 A A Latin capital letter R with caron 00159 uni0159 4 A A Latin small letter r with caron 0015A uni015A 4 A A Latin capital letter S with acute 0015B uni015B 4 A A Latin small letter s with acute 0015C uni015C 4 A A Latin capital letter S with circumflex 0015D uni015D 4 A A Latin small letter s with circumflex 0015E uni015E 4 A A Latin capital letter S with cedilla 0015F uni015F 4 A A Latin small letter s with cedilla 00160 Scaron 4 A A CapitalSHacek 0x0160 Latin capital S with caron 00161 scaron F1DC 4FA A scaron ISOlat2 pbs SHacek 0x0161 hacek s = caron s 00162 uni0162 4 A A Latin capital letter T with cedilla 00163 uni0163 4 A A Latin small letter t with cedilla 00164 uni0164 4 A A Latin capital letter T with caron 00165 uni0165 4 A A Latin small letter t with caron 00166 uni0166 4 A A Latin capital letter T with stroke 00167 uni0167 4 A A Latin small letter t with stroke 00168 uni0168 4 A A Latin capital letter U with tilde 00169 uni0169 4 A A Latin small letter u with tilde 0016A uni016A 4 A A Latin capital letter U with macron 0016B uni016B 4 A A Latin small letter u with macron 0016C uni016C 4 A A Latin capital letter U with breve 0016D uni016D 4 A A Latin small letter u with breve 0016E uni016E 4 A A Latin capital letter U with ring above 0016F uni016F 4 A A Latin small letter u with ring above 00170 uni0170 4 A A CapitalUDoubleAcute Latin capital letter U with double acute 00171 uni0171 4 A A UDoubleAcute Latin small letter u with double acute 00172 uni0172 4 A A Latin capital letter U with ogonek 00173 uni0173 4 A A Latin small letter u with ogonek 00174 uni0174 4 A A Latin capital letter W with circumflex 00175 uni0175 4 A A Latin small letter w with circumflex 00176 uni0176 4 A A Latin capital letter Y with circumflex 00177 uni0177 4 A A Latin small letter y with circumflex 00178 Ydieresis 4 A A 0x0178 Latin capital letter Y with diaeresis 00179 uni0179 4 A A Latin capital letter Z with acute 0017A uni017A 4 A A Latin small letter z with acute 0017B uni017B 4 A A Latin capital letter Z with dot above 0017C uni017C 4 A A Latin small letter z with dot above 0017D Zcaron 4 A A Latin capital Z with caron 0017E zcaron 2FB A pbz Latin small letter z with caron 0017F uni017F 2FB A Latin small letter long s 00180 M00B uni0180 2FB A peb T\textcrb crossed b (phonetic symbol) %00188 M00C uni0188 2FB pfc T\texthtc c hooktop (phonetic symbol) %00190 uni0190 4 A 0x0190 Latin capital letter open E %00192 florin EFA2 2 O N C\textflorin Florin 0x0192 florin 00195 M00D uni0195 2FB phh T\texthvlig h-v ligature (phonetic symbol) 00199 uni0199 2FA A pbk T\texthtk k hooktop (phonetic symbol) 0019A uni019A 236A 4FA A pbl T\textbarl 0x019A lowercase l with horizontal bar 0019B uni019B FD7B 4FA A phl T\textcrlambda slgr 0x019B 1 C2 Latin small letter lambda with stroke =0019B uni019B FD7B 0FA A phl Q\lambdaslash slgr 0x019B 1 C2 Latin small letter lambda with stroke #0019B G105 uni019B.var 1DZ Q\lambdabar Greek small letter lambda with horizontal stroke (not slanted stroke) 0019E uni019E E2E5 2FB A pgn Japanese syllabic nasal 001A0 uni01A0 4 A A Q\Ohorn Latin capital letter O with horn (Ohorn) 001A1 uni01A1 4 A A L\ohorn Latin small letter o with horn (ohorn) 001A5 uni01A5 2378 4 A A pdp T\texthtp Latin small letter p with hook +001A5 E683 uni01A5 2378 0FB A pdp T\texthtp p with right-hooked ascender 001AA uni01AA E2D4 2FB A pfs T\textlooptoprevesh hookoh labialized voiceless palato-alveolar fricative 001AB uni01AB E2A0 2FB A pbt T\textlhookt lhookt Latin letter small t with palatal hook 001AD uni01AD 2379 2FB A pgt T\texthtt t with right-hooked ascender 001AF uni01AF 4 A A Q\Uhorn Latin capital letter U with horn (Uhorn) 001B0 uni01B0 4 A A L\uhorn Latin small letter u with horn (uhorn) 001B5 E37F uni01B5 EE39 1 N N imped ISOTECH Q\Zbar impedance (LATIN CAPITAL LETTER Z WITH STROKE) 001BA uni01BA E2D5 2FB A pgz T\textbenttailyogh hookyog labialized voiced palato-alveolar fricative 001BB uni01BB E2B5 2FB A pb4 T\textcrtwo voiced alveolar affricate (obsolete) 001BE uni01BE E2B4 2FB A pb0 T\textcrinvglotstop voiceless alveolar affricate (obsolete) 001C0 uni01C0 23A6 2FB A pe1 T\textpipe verline dental click 001C1 uni01C1 23A7 2FB A pi1 T\textdoublepipe dverline lateral click 001C2 01C2 uni01C2 23A4 2FB A pg1 T\textdoublebarpipe dblplus alveolar click 001C3 uni01C3 23A5 2FB A pd1 Q\textexclam retroflex click 001F0 uni01F0 E290 2FB A pbj Latin small letter j with hachek 001FA uni01FA Latin capital letter A with ring above and acute 001FB uni01FB Latin small letter a with ring above and acute 001FC uni01FC Latin capital letter AE with acute 001FD uni01FD Latin small letter ae with acute 001FE uni01FE Latin capital letter O with stroke and acute 001FF uni01FF Latin small letter o with stroke and acute B00221 E641 uni0221 E278 1FZ A pid T\textctd LATIN SMALL LETTER D WITH CURL B00234 uni0234 1 Z A Q\textctl LATIN SMALL LETTER L WITH CURL B00235 E63E uni0235 E274 1FZ A phn T\textctn LATIN SMALL LETTER N WITH CURL B00236 E63F uni0236 E279 1FZ A pht T\textctt LATIN SMALL LETTER T WITH CURL B00237 E68A uni0237 2FZ A pfj Q\textdotlessj DotlessJ LATIN SMALL LETTER DOTLESS J 00250 uni0250 E263 2FB A pba T\textturna inva lower-mid central unrounded vowel 00251 uni0251 E26C 2FB A pca T\textscripta opena open back unrounded vowel 00252 uni0252 E26D 2FB A pda T\textturnscripta iopena open back rounded vowel 00253 uni0253 E2A9 2FB A pbb T\texthtb bilabial implosive 00254 uni0254 E26B 4FA B pgo T\textopeno openo half-open back rounded vowel 00255 uni0255 E2CE 2FB A pdc T\textctc loopc voiceless alveolo-palatal fricative 00256 uni0256 E2C8 2FB A pcd T\textrtaild phookd voiced retroflex plosive 00257 uni0257 E2C2 2FB A pbd T\texthtd dental or alveolar implosive 00258 uni0258 E26E 2FB A pde T\textreve upper-mid central unrounded vowel 00259 uni0259 E25F 2FB A pbe T\textschwa schwa schwa 0025A uni025A E260 2FB A pce T\textrhookschwa hkschwa r-colored schwa 0025B uni025B E258 2FB A pfe T\textepsilon eh half-open front unrounded vowel 0025C uni025C E262 2FB A pge T\textrevepsilon backeh a variety of schwa 0025D uni025D E26F 2FB A phe T\textrhookrevepsilon hkbkeh rhotacized lower-mid central vowel 0025E uni025E E270 2FB A pie T\textcloserevepsilon lower-mid central rounded vowel 0025F uni025F E2D9 2FB A pcj T\textbardotlessj invf voiced palatal plosive 00260 uni0260 E27E 2FB A pbg T\texthtg implosive velar stop 00261? uni0261 E2DF 2FB A pag T\textscriptg openg voiced velar plosive 00262 uni0262 E2E7 2FB A pcg T\textscg smcapg 0x0262 voiced uvular plosive 00263 uni0263 E2E1 2FB A pdg T\textgamma swirlv voiced velar fricative 00264 uni0264 E268? 2FB A peg T\textramshorns pswirly half-close back unrounded vowel = rams horns =00264 uni0264.var 0 A T\textbabygamma half-close back unrounded vowel = baby gamma 00265 uni0265 E2A6 2FB A peh T\textturnh invh bilabial-palatal approximant 00266 uni0266 E2EF 2FB A pch T\texthth hokh voiced glottal fricative 00267 uni0267 E2D6 2FB A pdh T\texththeng voiceless fricative simultaneously palato-alveolar and velar 00268 uni0268 E25D 2FB A pbi T\textbari bari close central unrounded vowel 00269 uni0269 E253 2FB A pci T\textiota close-lowered front unrounded vowel 0026A uni026A E254 2FB A pdi T\textsci smcapi 0x026A close-lowered front unrounded vowel (old form) %0026B E3CD uni026B E27D 1 Z A T\textltilde velarized voiced alveolar lateral approximant 0026C uni026C E2BB 2FB A pcl T\textbeltl chookl voiceless lateral dental or alveolar fricative 0026D uni026D E2CC 2FB A pdl T\textrtaill rhookl retroflex lateral 0026E E63A uni026E E2BC 1FZ A pel T\textlyoghlig voiced lateral dental or alveolar fricative 0026F uni026F E264 2FB A pcm T\textturnm invm close back unrounded vowel 00270 uni0270 E2E2 2FB A pdm T\textturnmrleg velar approximant 00271 uni0271 E2AB 2FB A pbm T\textltailm hookm labiodental nasal 00272 uni0272 E2D7 2FB A pcn T\textltailn lhookn palatal nasal 00273 uni0273 E2C6 2FB A pen T\textrtailn hookn retroflex nasal 00274 uni0274 E2E4 2FB A pfn T\textscn smcapn 0x0274 uvular nasal 00275 uni0275 E261 2FB A pco T\textbaro baro rounded schwa 00276 uni0276 E25C 2FB A pfo T\textscoelig 0x0276 open front rounded vowel 00277 uni0277 E266 2FB A pio T\textcloseomega comega close-lowered back rounded vowel 00278 uni0278 E2A4 2FB A pep T\textphi pphi voiceless bilabial fricative 00279 uni0279 E2BA 2FB A per T\textturnr invr post-alveolar approximant 0027A uni027A E2BF 2FB A pgr T\textturnlonglegr lhookl alveolar lateral flap 0027B uni027B E2CB 2FB A pfr T\textturnrrtail retroflex approximant 0027C uni027C E2BE 2FB A pcr T\textlonglegr alveolar fricative trill 0027D uni027D E2CD 2FB A pdr T\textrtailr hookr retroflex tap or flap 0027E uni027E E2C1 2FB A pbr T\textfishhookr invscj alveolar tap or flap 0027F uni027F E271 2FB A pjr T\textlhti apical dental vowel 00280 uni0280 E2EA 2FB A phr T\textscr smcapr 0x0280 uvular trill, tap, or flap 00281 uni0281 E2E9 2FB A pir T\textinvscr invbkr voiced uvular fricative 00282 uni0282 E2C9 2FB A pcs T\textrtails rhooks voiceless retroflex fricative 00283 uni0283 E2D0 2FB A pds T\textesh sh voiceless palato-alveolar fricative 00284 uni0284 E27C 2FB A pdj T\texthtbardotlessjvar implosive palatal stop 00285? uni0285 E272 2FB A pkr T\textvibyi apical retroflex vowel 00286 uni0286 E2D2 2FB A pes T\textctesh palatalized voiceless palato-alveolar fricative 00287 uni0287 E2C3 2FB A pet T\textturnt invt dental or alveolar click 00288 uni0288 E2C7 2FB A pct T\textrtailt rhookt voiceless retroflex plosive 00289 uni0289 E25E 2FB A pbu T\textbaru baru close central rounded vowel 0028A uni028A E267 2FB A pcu T\textupsilon capomega close-lowered back rounded vowel (old form) 0028B uni028B E2AE 2FB A pbv T\textscriptv labiodental approximant 0028C uni028C E26A 2FB A pga T\textturnv invv half-open back unrounded vowel 0028D uni028D E2A7 2FB A pbw T\textturnw invw voiceless labial-velar fricative 0028E uni028E E2DC 2FB A pby T\textturny pinvy palatal lateral 0028F uni028F E255 2FB A pcy T\textscy smcapy 0x028F close-lowered front rounded vowel 00290 uni0290 E2CA 2FB A pdz T\textrtailz rhookz voiced retroflex fricative 00291 uni0291 E2CF 2FB A pcz T\textctz loopz voiced alveolo-palatal fricative 00292 uni0292 E2D1 2FB A pez T\textyogh yog voiced palato-alveolar fricative 00293 uni0293 E2D3 2FB A pfz T\textctyogh palatalized voiced palato-alveolar fricative 00294 uni0294 E2ED 2FB A pa1 T\textglotstop glottal glottal plosive 00295 uni0295 E2EC 2FB A pc1 T\textrevglotstop backglot voiced pharyngeal fricative 00296 uni0296 E2C5 2FB A pb1 T\textinvglotstop invglot alveolar lateral click 00297 uni0297 E2C4 2FB A pec T\textstretchcvar lghook alveolar median click 00298 uni0298 E2AA 2FB A pbo T\textbullseye beye bilabial click 00299 uni0299 E2F0 2FB A pcb T\textscb 0x0299 bilabial trill %0029A uni029A E273 2 B A T\textcloseepsilon lower-mid front rounded vowel 0029B uni029B E2F1 2FB A pfg T\texthtscg voiced uvular implosive 0029C E689 uni029C E2F2 2FB A pfh T\textsch 0x029C voiceless epiglotto-pharyngeal fricative 0029D uni029D E2F3 2FB A pej T\textctj voiced palatal fricative 0029E uni029E E2F4 2FB A pck T\textturnk invk velar click (proposed) %0029F uni029F E2F5 2 B A T\textscl 0x029F velar lateral approximant %002A0 uni02A0 E2F6 2 B A T\texthtq voiceless uvular implosive 002A1 uni02A1 E2F7 2FB A pa0 T\textbarglotstop voiced epiglottal-pharyngeal stop 002A2 uni02A2 E2F8 2FB A pc0 T\textbarrevglotstop voiced epiglottal-pharyngeal fricative %002A3 uni02A3 E2F9 2 B A T\textdzlig voiced dental affricate 002A4 uni02A4 E2FA 2FB A pdd T\textdyoghlig voiced postalveolar affricate %002A5 uni02A5 E2FB 2 B A T\textdctzlig voiced alveolo-palatal affricate %002A6 uni02A6 E2FC 2 B A T\texttslig voiceless dental affricate 002A7 uni02A7 E2FD 2FB A pdt T\textteshlig voiceless postalveolar affricate %002A8 uni02A8 E2FE 2 B A T\texttctctlig voiceless alveolo-palatal affricate B002AE uni02AE E21E 1 Z A T\textlongy LATIN SMALL LETTER TURNED H WITH FISHHOOK B002AF E63C uni02AF E21F 1FZ A pgh T\textvibyy LATIN SMALL LETTER TURNED H WITH FISHHOOK AND TAIL M002B0 uni02B0 2 B A Q\textsuph MODIFIER LETTER SMALL H %002B1 uni02B1 E280 2 B A Q\textsuphth modifier letter small h with hook, superscript M002B2 uni02B2 2 B A Q\textsupj modifier letter small j M002B3 uni02B3 2 B A Q\textsupr modifier letter small r %002B4 uni02B4 E281 2 B A Q\textsupturnr modifier letter small turned r, superscript %002B5 uni02B5 E282 2 B A Q\textsupturnrrtail modifier letter small turned r with hook, superscript %002B6 uni02B6 E283 2 B A Q\textsupinvscr modifier letter small capital inverted R, superscript M002B7 uni02B7 2 B A Q\textsupw modifier letter small w M002B8 uni02B8 2 B A Q\textsupy modifier letter small y %002B9 uni02B9 2 B A\cprime modifier letter prime 002BA uni02BA 23BE 2FB pa6 A\cdprime phonetic accent '' extra high 002BB uni02BB 23A2 4FQ O pl2 Q\textturncomma lsquot quote, single, left 002BC uni02BC E249 2FB pj2 A\rasp rsquot modifier letter apostrophe 002BD uni02BD E248 2FB pk2 A\lasp invlquot modifier letter reversed comma %002BE uni02BE E24A 2 D Q\texthamza 0x02BE half-ring, right superscript, spacing diacritic 002BF uni02BF 2 D Q\textain 0x02BF Modifier letter left half ring %002C0 uni02C0 E284 2 D T\textraiseglotstop modifier letter glottal stop, small, superscript %002C1 uni02C1 E285 2 D Q\textraiserevglotstop modifier letter reversed glottal stop, small, superscript %002C2 uni02C2 E286 2 D T\textlptr modifier letter left arrowhead, superscript, fronted articulation %002C3 uni02C3 E287 2 D T\textrptr modifier letter right arrowhead, superscript %002C4 uni02C4 E288 2 D Q\textuptr modifier letter up arrowhead, superscript %002C5 uni02C5 E289 2 D Q\textdptr modifier letter down arrowhead, superscript =002C6 circumflex E21D 2 D P\^ 0x02C6 modifier letter rise-fall contour tone bar +002C6 circumflex E246 2 D Q\textfall rise-fall pitch =002C7 caron E21E 2 D P\v 0x02C7 modifier letter fall-rise contour tone bar +002C7 caron E247 2 D Q\textrise fall-rise pitch 002C8 uni02C8 E23D 2FD pd2 T\textprimstress less rounded %002C9 uni02C9 E240 2 D Q\textmacron high level pitch %002CA uni02CA E242 2 D Q\textacute high rising pitch %002CB uni02CB E244 2 D Q\textgrave high falling pitch 002CC uni02CC E23E 2FD pe2 T\textsecstress secondary stress %002CD uni02CD E241 2 D Q\textlowmacron low level pitch %002CE uni02CE E245 2 D Q\textlowgrave low falling pitch %002CF uni02CF E243 2 D Q\textlowacute low rising pitch 002D0 uni02D0 E23A 2FD pi2 T\textlengthmark length long 002D1 uni02D1 E23B 2FD ph2 T\texthalflength plength half-long 002D2 uni02D2 E23C 2FD pn2 Q\textrhalfring lsemi more rounded 002D3 uni02D3 E23D 2FD pm2 Q\textlhalfring rsemi less rounded 002D4 uni02D4 E236 2FD D pb2 Q\textraised highmod raised (in-line diacritic) 002D5 uni02D5 E237 2FD D pc2 Q\textlowered lowmod lowered (in-line diacritic) %002D6 uni02D6 E238 2 D D Q\textadvanced advanced (in-line diacritic) M002D7 uni02D7 2 D D Q\textretracted MODIFIER LETTER MINUS SIGN 002D8 breve 2 D D Q\textbreve 0x02D8 Breve 002D9 dotaccent 2 D D Q\textdotaccent 0x02D9 Dot above 002DA ring 2 D D Q\textringaccent 0x02DA Ring above 002DB ogonek 2 D D Q\textogonek 0x02DB Ogonek 002DC smalltilde 2 D D Q\textsmalltilde 0x02DC Small tilde 002DD hungarumlaut 2 D D Q\textdoubleacute 0x02DD Double acute accent %002DE uni02DE E28A 2 D D T\textrhoticity modifier appendage rhotic hook M002DF uni02DF 2 D D T\ipacrossaccent MODIFIER LETTER CROSS ACCENT %002E0 uni02E0 E28B 2 D D Q\ipasupgamma modifier letter small gamma, superscript M002E1 uni02E1 2 B A Q\ipasupl MODIFIER LETTER SMALL L M002E2 uni02E2 2 B A Q\ipasups MODIFIER LETTER SMALL S M002E3 uni02E3 2 B A Q\ipasupx MODIFIER LETTER SMALL X %002E4 uni02E4 E28C 2 D D Q\ipasuprerglotstpp modifier letter reversed glottal stop, superscript 002E5 uni02E5 E28D 2FD D pa7 Q\tonebarextrahigh modifier letter extra-high level tone bar 002E6 uni02E6 E28E 2FD D pf7 Q\tonebarhigh modifier letter high level tone bar 002E7 uni02E7 E28F 2FD D pg7 Q\tonebarmid modifier letter mid-level tone bar 002E8 uni02E8 E29F 2FD D ph7 Q\tonebarlow modifier letter low level tone bar 002E9 uni02E9 E29E 2FD D pb7 Q\tonebarextralow modifier letter extra-low level tone bar M002EC uni02EC 2FD D Q\ipavoicing modifier letter voicing M002ED uni02ED 2FD D Q\ipaunaspirated modifier letter unaspirated 00300 uni0300 00C1 2FD D grave ISODIA cab P\grave d13 grave \grave 0x0300 grave accent 00301 uni0301 00C2 2FD D acute ISODIA caa P\acute d12 acute \acute 0x0301 acute accent 00302 uni0302 00C3 2FD D circ ISODIA cad P\hat d4 caret \hat 0x0302 circumflex accent #00302 EC03 uni0302.size1 23BA 1DW D wdhat P\widehat d14 dbgcaret \widehat hat accent (multiple characters and non-spacing) #00302 EC03 uni0302.size2 23BA 1DW D wdhat P\widehat d14 dbgcaret \widehat hat accent (multiple characters and non-spacing) #00302 EC03 uni0302.size3 23BA 1DW D wdhat P\widehat d14 dbgcaret \widehat hat accent (multiple characters and non-spacing) #00302 EC03 uni0302.size4 23BA 1DW D wdhat P\widehat d14 dbgcaret \widehat hat accent (multiple characters and non-spacing) #00302 EC03 uni0302.size5 23BA 1DW D wdhat P\widehat d14 dbgcaret \widehat hat accent (multiple characters and non-spacing) 00303 0303 uni0303 00C4 2FD D tilde ISODIA cai P\tilde d5 tilde \tilde 0x0303 tilde +00303 0303 uni0303 E222 0fD D P\tilde nasalized (non-spacing) #00303 E849 uni0303.size1 23BB 1DW D wdtilde P\widetilde d15 dbigwig \widetilde tilde accent (multiple characters and non-spacing) #00303 E849 uni0303.size2 23BB 1DW D wdtilde P\widetilde d15 dbigwig \widetilde tilde accent (multiple characters and non-spacing) #00303 E849 uni0303.size3 23BB 1DW D wdtilde P\widetilde d15 dbigwig \widetilde tilde accent (multiple characters and non-spacing) #00303 E849 uni0303.size4 23BB 1DW D wdtilde P\widetilde d15 dbigwig \widetilde tilde accent (multiple characters and non-spacing) #00303 E849 uni0303.size5 23BB 1DW D wdtilde P\widetilde d15 dbigwig \widetilde tilde accent (multiple characters and non-spacing) 00304 uni0304 00C5 2FD D macr ISODIA cam P\bar d1 macr \bar 0x0304 5 23 macron 00305 uni0305 2DD D Q\overbar 0x0305 3 B7 Overbar embellishment #00305 G001 uni0305.size1 1DW D Q\overbar 0x0305 3 B7 Overbar embellishment (multiple characters and non-spacing) #00305 G001 uni0305.size2 1DW D Q\overbar 0x0305 3 B7 Overbar embellishment (multiple characters and non-spacing) #00305 G001 uni0305.size3 1DW D Q\overbar 0x0305 3 B7 Overbar embellishment (multiple characters and non-spacing) #00305 G001 uni0305.size4 1DW D Q\overbar 0x0305 3 B7 Overbar embellishment (multiple characters and non-spacing) #00305 G001 uni0305.size5 1DW D Q\overbar 0x0305 3 B7 Overbar embellishment (multiple characters and non-spacing) 00306 uni0306 00C6 2FD D breve ISODIA caj P\breve d11 breve \breve Breve 0x0306 breve +00306 uni0306 E223 0fD D P\breve Breve non-syllabic (non-spacing) 00307 uni0307 00C7 2FD D dot ISODIA cao P\dot d2 dot \dot 0x0307 5 7E dot above +00307 uni0307 E224 0fD D P\dot palatalized (non-spacing) 00308 0308 uni0308 00C8 2FD D die ISODIA cae P\ddot d3 uml \ddot DoubleDot 0x0308 dieresis +00308 0308 uni0308 E221 0fD D P\ddot DoubleDot centralized (non-spacing) +00308 E3B6 uni0308 2322? 0 D D Dot ISOTECH P\ddot Dot dieresis or umlaut mark 00309 uni0309 2DD D Q\ovhook combining hook above 0030A uni030A 00CA 2FD D ring ISODIA cag A\ocirc ring 0x030A ring 0030B uni030B 00CD 2FD D dblac ISODIA cac P\H dblac 5 55 double acute accent 0030C uni030C 00CF 2FD D caron ISODIA cak P\check d9 hacek \check Hacek 0x030C caron #0030C EC04 uni030C.size1 1DW D wdcheck M\widecheck check accent (multiple characters and non-spacing) #0030C EC04 uni030C.size2 1DW D wdcheck M\widecheck check accent (multiple characters and non-spacing) #0030C EC04 uni030C.size3 1DW D wdcheck M\widecheck check accent (multiple characters and non-spacing) #0030C EC04 uni030C.size4 1DW D wdcheck M\widecheck check accent (multiple characters and non-spacing) #0030C EC04 uni030C.size5 1DW D wdcheck M\widecheck check accent (multiple characters and non-spacing) 0030D uni030D 2DD D T\textvbaraccent vlinea combining vertical line above 0030E uni030E 2DD D T\textdoublevbaraccent combining double vertical line above 0030F uni030F 23E2 2DD D dblgrav T\textdoublegrave double grave accent +0030F E680 uni030F 0FB A pb6 T\textdoublegrave phonetic accent `` extra low 00310 uni0310 23F1 2DD D Q\candra brevedot candrabindu (non-spacing) 00311 uni0311 23F2 2FD D pq2 T\textroundcap dBreve DownBreve 5 58 breve, inverted (non-spacing) 00312 uni0312 2DD D Q\oturnedcomma combining turned comma above %00313 uni0313 263E 2DD D Q\osmooth Greek psili (smooth breathing) (non-spacing) %00314 uni0314 263F 2DD D Q\orough Greek dasia (rough breathing) (non-spacing) 00315 uni0315 2DD D Q\ocommatopright combining comma above right 00316 uni0316 2DD D T\textsubgrave dugrave combining grave accent below 00317 uni0317 2DD D T\textsubacute duacute combining acute accent below 00318 uni0318 23F7 2FD D pf3 T\textadvancing left tack below (non-spacing) +00318 EA63 uni0318 0DN D T\textadvancing frntmod front modifier (cf. 0318) 00319 uni0319 23F8 2FD D pg3 T\textretracting right tack below (non-spacing) +00319 EA09 uni0319 0dN D T\textretracting backmod back modifier (cf. 0319) 0031A uni031A 23F9 2FD D pg2 p\droang droang left angle above (non-spacing) M0031B uni031B 23CE 2 D D Q\texthorn COMBINING HORN %0031C uni031C E232 2DD D T\textsublhalfring open (non-spacing) %0031D uni031D E22F 2DD D T\textraising raised (inferior diacritic) (non-spacing) %0031E uni031E E231 2DD D T\textlowering lowered (inferior diacritic) (non-spacing) %0031F uni031F E233 2DD D T\textsubplus advanced (inferior diacritic) (non-spacing) M00320 uni0320 E234 2 D D Q\textsubminus retracted (inferior diacritic) (non-spacing) 00321 uni0321 E227 2FD D po2 T\textpalhook palatalized (non-spacing) 00322 uni0322 E228 2FD D pp2 T\textrhook retroflex (non-spacing) 00323 uni0323 E230 2DD D udot T\textsubdot dundot &dotb; 0x0323 5 2A close (non-spacing), combining underdot =00323 uni0323 E230 0DD D udot P\d dundot &dotb; 0x0323 5 2A close (non-spacing), combining underdot 00324 uni0324 E22B 2DD D uddot T\textsubumlaut ddundot ¨b; 0x0324 breathy-voiced (inferior two dots) (non-spacing) 00325 uni0325 E229 2DD D uring T\textsubring uring voiceless (non-spacing) [combining ring below] 00326 E625 uni0326 23D3 2DD D ucomma cah Q\textsubcomma 5 28 combining comma below 00327 uni0327 00CB 2FD D cedil ISODIA cal P\c cedil Cedilla 0x0327 cedilla 00328 uni0328 00CE 2FD D ogon ISODIA cax T\textpolhk hook ogonek =00328 uni0328 00CE 0FD D ogon ISODIA cax A\k hook ogonek 00329? uni0329 E22E 2FD D pf2 T\textsyllabic vlineb syllabic (non-spacing) 0032A uni032A E22C 2FD D pa2 T\textsubbridge denart dental (non-spacing) 0032B uni032B E22D 2FD D pb3 T\textsubw labil labialized (non-spacing) 0032C uni032C E22A 2DD D ucaron T\textsubwedge voiced (non-spacing) 0032D uni032D 2DD D ucirc T\textsubcircum circumflex below (non-spacing) 0032E uni032E 23D5 2DD D ubreve Q\textsubbreve &breveb; breve below (non-spacing) 0032F uni032F 23FA 2FD D pr2 T\textsubarch breve below, inverted (non-spacing) 00330 0330 uni0330 23D7 2DD D utilde T\textsubtilde duntilde \undertilde 0x0330 combining tilde below #00330 EC05 uni0330.size1 1DW D wdutilde Q\wideutilde \wideundertilde under tilde accent (multiple characters and non-spacing) #00330 EC05 uni0330.size2 1DW D wdutilde Q\wideutilde \wideundertilde under tilde accent (multiple characters and non-spacing) #00330 EC05 uni0330.size3 1DW D wdutilde Q\wideutilde \wideundertilde under tilde accent (multiple characters and non-spacing) #00330 EC05 uni0330.size4 1DW D wdutilde Q\wideutilde \wideundertilde under tilde accent (multiple characters and non-spacing) #00330 EC05 uni0330.size5 1DW D wdutilde Q\wideutilde \wideundertilde under tilde accent (multiple characters and non-spacing) 00331 uni0331 23DC 2DD D T\textsubbar underbar \b &lineb; 0x0331 5 49 COMBINING MACRON BELOW =00331 uni0331 23DC 0DD D P\underbar underbar \b &lineb; 0x0331 5 49 COMBINING MACRON BELOW 00332 uni0332 00CC 2 D D Q\textsubline combining low line #00332 G000 uni0332.size1 1DW D Q\textsubline combining low line (multiple characters and non-spacing) #00332 G000 uni0332.size2 1DW D Q\textsubline combining low line (multiple characters and non-spacing) #00332 G000 uni0332.size3 1DW D Q\textsubline combining low line (multiple characters and non-spacing) #00332 G000 uni0332.size4 1DW D Q\textsubline combining low line (multiple characters and non-spacing) #00332 G000 uni0332.size5 1DW D Q\textsubline combining low line (multiple characters and non-spacing) 00333 uni0333 2DD D 2lowbar Q\textsubdoubleline d2lowbar combining double low line, double underbar %00334 uni0334 E226 2DD D T\textsuperimposetilde velarized or pharyngealized (non-spacing) 00335 uni0335 23CF 2FD D pc5 Q\textoverlayshortstroke short stroke overlay, horizontal mid-level (non-spacing) 00336 uni0336 23FB 2FD D pb5 Q\textoverlaylongstroke long stroke overlay, mid-level (non-spacing) 00337 uni0337 2FD D cay Q\textoverlayshortsolidus combining short solidus overlay 00338 uni0338 2FD D caz Q\textoverlaylongsolidus slash 0x0338 combining long solidus overlay =00338 uni0338 0FD D caz P\not slash 0x0338 combining long solidus overlay #00338 G0F0 uni0338.var1 1DN Q\textoverlaysolidusi slash to be combined with existing symbols to form slashed versions #00338 G0F1 uni0338.var2 1DN Q\textoverlaysolidusii slash to be combined with existing symbols to form slashed versions #00338 G0F2 uni0338.var3 1DN Q\textoverlaysolidusiii slash to be combined with existing symbols to form slashed versions #00338 G0F3 uni0338.var4 1DN Q\textoverlaysolidusiv slash to be combined with existing symbols to form slashed versions #00338 G0F4 uni0338.var5 1DN Q\textoverlaysolidusv slash to be combined with existing symbols to form slashed versions 00339 uni0339 2DD D T\textsubrhalfring combining right half ring below 0033A uni033A 23FD 2FD D pa5 T\textinvsubbridge bridge below, inverted (non-spacing) 0033B uni033B 23FE 2FD D pa3 T\textsubsquare square below (non-spacing) 0033C uni033C 2310 2FD D pe3 T\textseagull seagull below (non-spacing) %0033D uni033D 2311 2FD D pq3 T\textovercross pcross x above, non-spacing 0033E uni033E 2DD D Q\textvtilde combining vertical tilde 0033F uni033F 2DD D Q\textdoubleoverline combining double overline 00346 uni0346 2DF D Q\textoverbridge COMBINING BRIDGE ABOVE %0034C EA1F uni034C 7X03 2DD D Q\textdoubletilde d2tilde COMBINING ALMOST EQUAL TO ABOVE P00359 uni0359 0 Q\textunderasterisk COMBINING ASTERISK BELOW W0035C E64C uni035C E235 1fZ pt2 Q\texttieunderarc COMBINING DOUBLE BREVE BELOW 00360 uni0360 23BB 2dD D Q\texttietilde tilde accent (two characters only) 00361 uni0361 E225 2FD D ps2 P\t arcraise 5 43 superior ligature (two characters only) 00362 uni0362 2DD D T\texttieunderrightarrow combining rightwards arrow below (two characters only) 0037E uni037E 2 D Greek question mark 00384 uni0384 Greek tonos 00385 uni0385 Greek dialytika tonos 00386 uni0386 Greek capital letter Alpha with tonos 00387 uni0387 Greek ano teleia 00388 uni0388 Greek capital letter Epsilon with tonos 00389 uni0389 Greek capital letter Eta with tonos 0038A uni038A Greek capital letter Iota with tonos 0038C uni038C Greek capital letter Omicron with tonos 0038E uni038E Greek capital letter Upsilon with tonos 0038F uni038F Greek capital letter Omega with tonos 00390 uni0390 Greek small letter iota with dialytika and tonos 00391 uni0391 2641 4FA A Agr ISOGRK1 cea Q\upAlpha Agr CapitalAlpha 0x0391 1 41 capital Alpha, Greek 00392 uni0392 2642 4FA A Bgr ISOGRK1 ceb Q\upBeta Bgr CapitalBeta 0x0392 1 42 capital Beta, Greek 00393 uni0393 2644 4FA A Gamma ISOGRK3 ceg Q\upGamma Gamma Ggr \Gamma CapitalGamma 0x0393 1 47 capital Gamma, Greek 00394 uni0394 2645 4FA A Delta ISOGRK3 ced Q\upDelta Delta Dgr \Delta CapitalDelta 0x0394 1 44 capital Delta, Greek 00395 uni0395 2646 4FA A Egr ISOGRK1 cee Q\upEpsilon Egr CapitalEpsilon 0x0395 1 45 capital Epsilon, Greek 00396 uni0396 2649 4FA A Zgr ISOGRK1 cez Q\upZeta Zgr CapitalZeta 0x0396 1 5A capital Zeta, Greek 00397 uni0397 264A 4FA A EEgr ISOGRK1 ceh Q\upEta EEgr CapitalEta 0x0397 1 48 capital Eta, Greek 00398 uni0398 264B 4FA A Theta ISOGRK3 ceq Q\upTheta Theta THgr \Theta CapitalTheta 0x0398 1 51 capital Theta, Greek 00399 uni0399 264C 4FA A Igr ISOGRK1 cei Q\upIota Igr CapitalIota 0x0399 1 49 capital Iota, Greek 0039A uni039A 264D 4FA A Kgr ISOGRK1 cek Q\upKappa Kgr CapitalKappa 0x039A 1 4B capital Kappa, Greek 0039B uni039B 264E 4FA A Lambda ISOGRK3 cel Q\upLambda Lambda Lgr \Lambda CapitalLambda 0x039B 1 4C capital Lambda, Greek 0039C uni039C 264F 4FA A Mgr ISOGRK1 cem Q\upMu Mgr CapitalMu 0x039C 1 4D capital Mu, Greek 0039D uni039D 2650 4FA A Ngr ISOGRK1 cen Q\upNu Ngr CapitalNu 0x039D 1 4E capital Nu, Greek 0039E uni039E 2651 4FA A Xi ISOGRK3 cex Q\upXi Xi Ygr \Xi CapitalXi 0x039E 1 4A capital Xi, Greek 0039F uni039F 2652 4FA A Ogr ISOGRK1 ceo Q\upOmicron Ogr CapitalOmicron 0x039F 1 4F capital Omicron, Greek 003A0 uni03A0 2653 4FA A Pi ISOGRK3 cep Q\upPi Pi Pgr \Pi CapitalPi 0x03A0 1 50 capital Pi, Greek 003A1 uni03A1 2655 4FA A Rgr ISOGRK1 cer Q\upRho Rgr CapitalRho 0x03A1 1 52 capital Rho, Greek 003A3 uni03A3 2656 4FA A Sigma ISOGRK3 ces Q\upSigma Sigma Sgr \Sigma CapitalSigma 0x03A3 1 53 capital Sigma, Greek 003A4 uni03A4 2658 4FA A Tgr ISOGRK1 cet Q\upTau Tgr CapitalTau 0x03A4 1 54 capital Tau, Greek 003A5 uni03A5 4 A A Ugr ISOGRK1 Q\upUpsilon CapitalUpsilon 0x03A5 capital Upsilon, Greek 003A6 uni03A6 265A 4FA A Phi ISOGRK3 cef Q\upPhi Phi Fgr \Phi CapitalPhi 0x03A6 1 46 capital Phi, Greek 003A7 uni03A7 265B 4FA A KHgr ISOGRK1 cec Q\upChi KHgr CapitalChi 0x03A7 1 58 capital Chi, Greek 003A8 uni03A8 265C 4FA A Psi ISOGRK3 cey Q\upPsi Psi PSgr \Psi CapitalPsi 0x03A8 1 43 capital Psi, Greek 003A9 uni03A9 265D 4FA A Omega ISOGRK3 cew Q\upOmega Omega OHgr \Omega CapitalOmega 0x03A9 1 56 capital Omega, Greek 003AA uni03AA Greek capital letter Iota with dialytika 003AB uni03AB Greek capital letter Upsilon with dialytika 003AC uni03AC Greek small letter alpha with tonos 003AD uni03AD Greek small letter epsilon with tonos 003AE uni03AE Greek small letter eta with tonos 003AF uni03AF Greek small letter iota with tonos 003B0 uni03B0 Greek small letter upsilon with dialytika and tonos 003B1 uni03B1 2661 4FA A alpha ISOGRK3 cda Q\upalpha alpha agr \alpha Alpha 0x03B1 1 61 small alpha, Greek +003B1 E3CC uni03B1 E27A 0 Z A Q\textalpha Latin letter small alpha 003B2 uni03B2 2662 4FA A beta ISOGRK3 cdb Q\upbeta beta bgr \beta Beta 0x03B2 1 62 small beta, Greek +003B2 E682 uni03B2 E2A5 0FB A pdb T\textbeta voiced bilabial fricative 003B3 uni03B3 2664 4FA A gamma ISOGRK3 cdg Q\upgamma gamma ggr \gamma Gamma 0x03B3 1 67 small gamma, Greek 003B4 uni03B4 2665 4FA A delta ISOGRK3 cdd Q\updelta delta dgr \delta Delta 0x03B4 1 64 small delta, Greek 003B5 uni03B5 2666 4FA A epsiv ISOGRK3 cd3 Q\upvarepsilon epsiv Vegr \varepsilon CurlyEpsilon 0x03B5 1 AB rounded small epsilon, Greek 003B6 uni03B6 2669 4FA A zeta ISOGRK3 cdz Q\upzeta zeta zgr \zeta Zeta 0x03B6 1 7A small zeta, Greek 003B7 uni03B7 266A 4FA A eta ISOGRK3 cdh Q\upeta eta eegr \eta Eta 0x03B7 1 68 small eta, Greek 003B8 uni03B8 266B 4FA A theta ISOGRK3 cdq Q\uptheta thetas thgr \theta Theta 0x03B8 1 75 straight theta, small theta, Greek +003B8 E68B uni03B8 E2B2 0FB A pft T\texttheta ptheta voiceless dental fricative 003B9 uni03B9 266C 4FA A iota ISOGRK3 cdi Q\upiota iota igr \iota Iota 0x03B9 1 69 small iota, Greek 003BA uni03BA 266D 4FA A kappa ISOGRK3 cdk Q\upkappa kappa kgr \kappa Kappa 0x03BA 1 6B small kappa, Greek 003BB uni03BB 266E 4FA A lambda ISOGRK3 cdl Q\uplambda lambda lgr \lambda Lambda 0x03BB 1 6C small lambda, Greek +003BB E68C uni03BB 0fB A pgl Q\textlambda lambda (phonetic symbol) 003BC uni03BC 266F 4FA A mu ISOGRK3 cdm Q\upmu mu mgr \mu Mu 0x03BC 1 6D small mu, Greek 003BD uni03BD 2670 4FA A nu ISOGRK3 cdn Q\upnu nu ngr \nu Nu 0x03BD 1 6E small nu, Greek 003BE uni03BE 2671 4FA A xi ISOGRK3 cdx Q\upxi xi xgr \xi Xi 0x03BE 1 6A small xi, Greek 003BF uni03BF 2672 4FA A ogr ISOGRK1 cdo Q\upomicron ogr Omicron 0x03BF 1 6F small omicron, Greek 003C0 uni03C0 2673 4FA A pi ISOGRK3 cdp Q\uppi pi pgr \pi Pi 0x03C0 1 70 small pi, Greek 003C1 uni03C1 2675 4FA A rho ISOGRK3 cdr Q\uprho rho rgr \rho Rho 0x03C1 1 72 small rho, Greek 003C2 uni03C2 2677 4FA A sigmav ISOGRK3 cdv Q\upvarsigma sigmav sfgr \varsigma FinalSigma 0x03C2 1 A7 terminal sigma, Greek 003C3 uni03C3 2676 4FA A sigma ISOGRK3 cds Q\upsigma sigma sgr \sigma Sigma 0x03C3 1 73 small sigma, Greek +003C3 E3D0 uni03C3 E2B8 0 Z A Q\textsigma voiced labialized dental or alveolar fricative (obsolete) 003C4 uni03C4 2678 4FA A tau ISOGRK3 cdt Q\uptau tau tgr \tau Tau 0x03C4 1 74 small tau, Greek 003C5 uni03C5 2679 4FA A upsi ISOGRK3 cdu Q\upupsilon upsi ugr \upsilon Upsilon 0x03C5 1 79 small upsilon, Greek 003C6 uni03C6 FD5F 4FA A phiv ISOGRK3 cd4 Q\upvarphi phiv Jgr \varphi CurlyPhi 0x03D5 1 77 curly or open small phi, Greek 003C7 uni03C7 267B 4FA A chi ISOGRK3 cdc Q\upchi chi khgr \chi Chi 0x03C7 1 78 small chi, Greek +003C7 E681 uni03C7 E2E8 0FB A pbx T\textchi voiceless uvular fricative 003C8 uni03C8 267C 4FA A psi ISOGRK3 cdy Q\uppsi psi psgr \psi Psi 0x03C8 1 63 small psi, Greek 003C9 uni03C9 267D 4FA A omega ISOGRK3 cdw Q\upomega omega ohgr \omega Omega 0x03C9 1 76 small omega, Greek +003C9 E68F uni03C9 0FB A pho T\textomega lower-case omega (phonetic symbol) 003CA uni03CA Greek small letter iota with dialytika 003CB uni03CB Greek small letter upsilon with dialytika 003CC uni03CC Greek small letter omicron with tonos 003CD uni03CD Greek small letter upsilon with tonos 003CE uni03CE Greek small letter omega with tonos 003D0 uni03D0 2663 4FA A betav cd7 Q\upvarbeta Vbgr 0x03D0 1 57 rounded small beta, Greek 003D1 uni03D1 FD5D 4FA A thetav ISOGRK3 cdj Q\upvartheta thetav Vthgr \vartheta CurlyTheta 0x03D1 1 71 /vartheta - curly or open theta 003D2 E663 uni03D2 2659 4FA A Upsi ISOGRK3 ceu Q\upUpsilon Upsi Ugr \Upsilon CurlyCapitalUpsilon 0x03D2 1 59 GREEK UPSILON WITH HOOK SYMBOL 003D5 uni03D5 267A 4FA A phi ISOGRK3 cdf Q\upphi phis fgr \phi Phi 0x03C6 1 66 /straightphi - small phi, Greek 003D6 uni03D6 FD5C 4FA A piv ISOGRK3 cd2 Q\upvarpi piv Vpgr \varpi CurlyPi 0x03D6 1 C3 rounded small pi (pomega), Greek &003D8 E660 uni03D8 2654 AX04 4DA N Q\upoldKoppa GREEK LETTER ARCHAIC KOPPA &003D9 E661 uni03D9 AX05 4DA N Q\upoldkoppa GREEK SMALL LETTER ARCHAIC KOPPA 003DA uni03DA 2647 4DA A Stigma Q\upStigma CapitalStigma capital stigma 003DB uni03DB 2667 6X03 4DA A stigma Q\upstigma Stigma 0x03DB Greek small letter stigma 003DC uni03DC 2648 4DA A Gammad ISOGRK3 Q\upDigamma CapitalDigamma capital digamma 003DD uni03DD 2668 6X02 4FA A gammad ISOGRK3 cd5 Q\updigamma gammad diag Digamma 0x03DD old Greek small letter digamma 003DE uni03DE 2654 4 A A Koppa Q\upKoppa CapitalKoppa capital koppa 003DF uni03DF 2674 6X04 4 A A koppa Q\upkoppa Koppa Greek small letter koppa 003E0 uni03E0 265E 4DA A Q\upSampi CapitalSampi capital sampi 003E1 uni03E1 267E 6X05 4DA A sampi Q\upsampi Sampi 0x03E1 Greek small letter sampi 003F0 uni03F0 FD60 4FA A kappav ISOGRK3 cd8 Q\upvarkappa kappav Vkgr CurlyKappa 0x03F0 1 FB rounded small kappa, Greek 003F1 uni03F1 FD5E 4FA A rhov ISOGRK3 cd9 Q\upvarrho rhov Vrgr \varrho CurlyRho 0x03F1 rounded small rho, Greek &003F4 E664 uni03F4 6X01 AX00 4FA A Thetav cej Q\upvarTheta Thgr 1 55 GREEK CAPITAL THETA SYMBOL &003F5 E629 uni03F5 FD5B 6X00 AX02 4FA A epsi ISOGRK3 cde Q\upepsilon epsi egr \epsilon Epsilon r219 0x220A 1 65 GREEK LUNATE EPSILON SYMBOL +003F5 G106 uni03F5 0DB A Q\upepsilon lowercase straight epsilon &003F6 uni03F6 22B9 2X0C AX03 2dZ N bepsi ISOAMSR Q\upbackepsilon backeps egrb 0x220D 5 7B GREEK REVERSED LUNATE EPSILON SYMBOL +003F6 G107 uni03F6 0DB N Q\upbackepsilon reversed lowercase straight epsilon 00401 uni0401 2727 4 A A IOcy ISOCYR1 Cyrillic capital letter IO 00402 uni0402 2743 4 A A DJcy ISOCYR2 Cyrillic capital letter DJE 00403 uni0403 2744 4 A A GJcy ISOCYR2 Cyrillic capital letter GJE 00404 uni0404 2745 4 A A Jukcy ISOCYR2 Cyrillic capital letter Ukrainian IE 00405 uni0405 2746 4 A A DScy ISOCYR2 Cyrillic capital letter DZE 00406 uni0406 2747 4DA A Iukcy ISOCYR2 cc2 Cyrillic capital letter Byelorussian-Ukrainian I 00407 uni0407 2748 4 A A YIcy ISOCYR2 Cyrillic capital letter YI 00408 uni0408 2749 4 A A Jsercy ISOCYR2 Cyrillic capital letter JE 00409 uni0409 274A 4 A A LJcy ISOCYR2 Cyrillic capital letter LJE 0040A uni040A 274B 4 A A NJcy ISOCYR2 Cyrillic capital letter NJE 0040B uni040B 274C 4 A A TSHcy ISOCYR2 Cyrillic capital letter TSHE 0040C uni040C 274D 4 A A KJcy ISOCYR2 Cyrillic capital letter KJE 0040E uni040E 274E 4 A A Ubrcy ISOCYR2 Cyrillic capital letter short U 0040F uni040F 274F 4 A A DZcy ISOCYR2 Cyrillic capital letter DZHE 00410 uni0410 2721 4DA A Acy ISOCYR1 cca Cyrillic capital letter A 00411 uni0411 2722 4DA A Bcy ISOCYR1 ccb Cyrillic capital letter BE 00412 uni0412 2723 4DA A Vcy ISOCYR1 ccv Cyrillic capital letter VE 00413 uni0413 2724 4DA A Gcy ISOCYR1 ccg Cyrillic capital letter GHE 00414 uni0414 2725 4DA A Dcy ISOCYR1 ccd Cyrillic capital letter DE 00415 uni0415 2726 4DA A IEcy ISOCYR1 cce Cyrillic capital letter IE 00416 uni0416 2728 4DA A ZHcy ISOCYR1 cc7 Cyrillic capital letter ZHE 00417 uni0417 2729 4DA A Zcy ISOCYR1 ccz Cyrillic capital letter ZE 00418 uni0418 272A 4DA A Icy ISOCYR1 cci Cyrillic capital letter I 00419 uni0419 272B 4DA A Jcy ISOCYR1 cc3 Cyrillic capital letter SHORT I 0041A uni041A 272C 4DA A Kcy ISOCYR1 cck Cyrillic capital letter KA 0041B uni041B 272D 4DA A Lcy ISOCYR1 ccl Cyrillic capital letter EL 0041C uni041C 272E 4DA A Mcy ISOCYR1 ccm Cyrillic capital letter EM 0041D uni041D 272F 4DA A Ncy ISOCYR1 ccn Cyrillic capital letter EN 0041E uni041E 2730 4DA A Ocy ISOCYR1 cco Cyrillic capital letter O 0041F uni041F 2731 4DA A Pcy ISOCYR1 ccp Cyrillic capital letter PE 00420 uni0420 2732 4DA A Rcy ISOCYR1 ccr Cyrillic capital letter ER 00421 uni0421 2733 4DA A Scy ISOCYR1 ccs Cyrillic capital letter ES 00422 uni0422 2734 4DA A Tcy ISOCYR1 cct Cyrillic capital letter TE 00423 uni0423 2735 4DA A Ucy ISOCYR1 ccu Cyrillic capital letter U 00424 uni0424 2736 4DA A Fcy ISOCYR1 ccf Cyrillic capital letter EF 00425 uni0425 2737 4DA A KHcy ISOCYR1 cch Cyrillic capital letter HA 00426 uni0426 2738 4DA A TScy ISOCYR1 ccc Cyrillic capital letter TSE 00427 uni0427 2739 4DA A CHcy ISOCYR1 ccq Cyrillic capital letter CHE 00428 uni0428 273A 4DA A SHcy ISOCYR1 ccx Cyrillic capital letter SHA 00429 uni0429 273B 4DA A SHCHcy ISOCYR1 ccw Cyrillic capital letter SHCHA 0042A uni042A 273C 4DA A HARDcy ISOCYR1 cc6 Cyrillic capital letter HARD SIGN 0042B uni042B 273D 4DA A Ycy ISOCYR1 ccy Cyrillic capital letter YERU 0042C uni042C 273E 4DA A SOFTcy ISOCYR1 cc4 Cyrillic capital letter SOFT SIGN 0042D uni042D 273F 4DA A Ecy ISOCYR1 cc1 Cyrillic capital letter E 0042E uni042E 2740 4DA A YUcy ISOCYR1 cc5 Cyrillic capital letter YU 0042F uni042F 2741 4DA A YAcy ISOCYR1 ccj Cyrillic capital letter YA 00430 uni0430 2751 4DA A acy ISOCYR1 cba Cyrillic small letter a 00431 uni0431 2752 4DA A bcy ISOCYR1 cbb Cyrillic small letter be 00432 uni0432 2753 4DA A vcy ISOCYR1 cbv Cyrillic small letter ve 00433 uni0433 2754 4DA A gcy ISOCYR1 cbg Cyrillic small letter ghe 00434 uni0434 2755 4DA A dcy ISOCYR1 cbd Cyrillic small letter de 00435 uni0435 2756 4DA A iecy ISOCYR1 cbe Cyrillic small letter ie 00436 uni0436 2758 4DA A zhcy ISOCYR1 cb7 Cyrillic small letter zhe 00437 uni0437 2759 4DA A zcy ISOCYR1 cbz Cyrillic small letter ze 00438 uni0438 275A 4DA A icy ISOCYR1 cbi Cyrillic small letter i 00439 uni0439 275B 4DA A jcy ISOCYR1 cb3 Cyrillic small letter short i 0043A uni043A 275C 4DA A kcy ISOCYR1 cbk Cyrillic small letter ka 0043B uni043B 275D 4DA A lcy ISOCYR1 cbl Cyrillic small letter el 0043C uni043C 275E 4DA A mcy ISOCYR1 cbm Cyrillic small letter em 0043D uni043D 275F 4DA A ncy ISOCYR1 cbn Cyrillic small letter en 0043E uni043E 2760 4DA A ocy ISOCYR1 cbo Cyrillic small letter o 0043F uni043F 2761 4DA A pcy ISOCYR1 cbp Cyrillic small letter pe 00440 uni0440 2762 4DA A rcy ISOCYR1 cbr Cyrillic small letter er 00441 uni0441 2763 4DA A scy ISOCYR1 cbs Cyrillic small letter es 00442 uni0442 2764 4DA A tcy ISOCYR1 cbt Cyrillic small letter te 00443 uni0443 2765 4DA A ucy ISOCYR1 cbu Cyrillic small letter u 00444 uni0444 2766 4DA A fcy ISOCYR1 cbf Cyrillic small letter ef 00445 uni0445 2767 4DA A khcy ISOCYR1 cbh Cyrillic small letter ha 00446 uni0446 2768 4DA A tscy ISOCYR1 cbc Cyrillic small letter tse 00447 uni0447 2769 4DA A chcy ISOCYR1 cbq Cyrillic small letter che 00448 uni0448 276A 4DA A shcy ISOCYR1 cbx Cyrillic small letter sha 00449 uni0449 276B 4DA A shchcy ISOCYR1 cbw Cyrillic small letter shcha 0044A uni044A 276C 4DA A hardcy ISOCYR1 cb6 Cyrillic small letter hard sign 0044B uni044B 276D 4DA A ycy ISOCYR1 cby Cyrillic small letter yeru 0044C uni044C 276E 4DA A softcy ISOCYR1 cb4 Cyrillic small letter soft sign 0044D uni044D 276F 4DA A ecy ISOCYR1 cb1 Cyrillic small letter e 0044E uni044E 2770 4DA A yucy ISOCYR1 cb5 Cyrillic small letter yu 0044F uni044F 2771 4DA A yacy ISOCYR1 cbj Cyrillic small letter ya 00451 uni0451 2757 4DA A iocy ISOCYR1 Cyrillic small letter io 00452 uni0452 2773 4 A A djcy ISOCYR2 Cyrillic small letter dje 00453 uni0453 2774 4 A A gjcy ISOCYR2 Cyrillic small letter gje 00454 uni0454 2775 4 A A jukcy ISOCYR2 Cyrillic small letter Ukrainian ie 00455 uni0455 2776 4 A A dscy ISOCYR2 Cyrillic small letter dze 00456 uni0456 2777 4DA A iukcy ISOCYR2 cb2 Cyrillic small letter Byelorussian-Ukrainian i 00457 uni0457 2778 4 A A yicy ISOCYR2 Cyrillic small letter yi 00458 uni0458 2779 4 A A jsercy ISOCYR2 Cyrillic small letter je 00459 uni0459 277A 4 A A ljcy ISOCYR2 Cyrillic small letter lje 0045A uni045A 277B 4 A A njcy ISOCYR2 Cyrillic small letter nje 0045B uni045B 277C 4 A A tshcy ISOCYR2 Cyrillic small letter tshe 0045C uni045C 277D 4 A A kjcy ISOCYR2 Cyrillic small letter kje 0045E uni045E 277E 4 A A ubrcy ISOCYR2 Cyrillic small letter short u 0045F uni045F 277F 4 A A dzcy ISOCYR2 Cyrillic small letter dzhe 00462 uni0462 27A2 4 A A Cyrillic capital letter YAT 00463 uni0463 27D2 4 A A Cyrillic small letter yat 0046A uni046A 27A5 4 A A Cyrillic capital letter BIG YUS 0046B uni046B 27D5 4 A A Cyrillic small letter big yus 00472 uni0472 27A3 4 A A Cyrillic capital letter FITA 00473 uni0473 27D3 4 A A Cyrillic small letter fita 00474 uni0474 27A4 4 A A Cyrillic capital letter IZHITSA 00475 uni0475 27D4 4 A A Cyrillic small letter izhitsa M00490 uni0490 4 A A CYRILLIC CAPITAL LETTER GHE WITH UPTURN M00491 uni0491 4 A A CYRILLIC SMALL LETTER GHE WITH UPTURN B01D00 E688 uni1D00 2FB A pfa T\textsca LATIN LETTER SMALL CAPITAL A B01D07 E685 uni1D07 2FB A pee T\textsce LATIN LETTER SMALL CAPITAL E B01D1C E684 uni1D1C E275 2FB A pdu T\textscu smcapu LATIN LETTER SMALL CAPITAL U P01D81 EA38 uni1D81 1DN A Q\textlhookd hookd LATIN SMALL LETTER D WITH PALATAL HOOK P01D84 EA3A uni1D84 1DN A Q\textlhookk hookk LATIN SMALL LETTER K WITH PALATAL HOOK P01D85 EA0D uni1D85 1DN A Q\textpalhookl bhookl LATIN SMALL LETTER L WITH PALATAL HOOK P01D8A EA41 uni1D8A 1DN A Q\textlhooks lhooks LATIN SMALL LETTER S WITH PALATAL HOOK P01D8D EA3B uni1D8D 1DN A Q\textlhookx hookx LATIN SMALL LETTER X WITH PALATAL HOOK P01D8E EA42 uni1D8E 1DN A Q\textlhookz lhookz LATIN SMALL LETTER Z WITH PALATAL HOOK %01E80 uni1E80 2 A A LATIN CAPITAL LETTER W WITH GRAVE %01E81 uni1E81 2 A A LATIN SMALL LETTER W WITH GRAVE %01E82 uni1E82 2 A A LATIN CAPITAL LETTER W WITH ACUTE %01E83 uni1E83 2 A A LATIN SMALL LETTER W WITH ACUTE %01E84 uni1E84 2 A A LATIN CAPITAL LETTER W WITH DIAERESIS %01E85 uni1E85 2 A A LATIN SMALL LETTER W WITH DIAERESIS %01EF2 uni1EF2 2 A A LATIN CAPITAL LETTER Y WITH GRAVE %01EF3 uni1EF3 2 A A LATIN SMALL LETTER Y WITH GRAVE 02002 uni2002 EF1C 0 ensp ISOPUB P\enspace ensp en space (half an em) 02003 uni2003 EF1D 0 emsp ISOPUB P\quad emsp em space 02004 uni2004 EE21 0 emsp13 ISOPUB Q\thirdemspace emsp13 third of an em space 02005 uni2005 EE22 0 emsp14 ISOPUB P\thickspace emsp14 ThickSpace quarter of an em space 02007 uni2007 EF2E 0 numsp ISOPUB Q\digitspace numsp digit space (width of a number) 02008 uni2008 EE24 0 puncsp ISOPUB ba9 Q\punctspace puncsp punctuation space (width of comma) 02009 uni2009 EF2F 0 thinsp ISOPUB P\thinspace thinsp ThinSpace thin space (sixth of an em) 0200A uni200A EE23 0 hairsp ISOPUB A\hspace hairsp VeryThinSpace hair space 0200B uni200B 0 Q\zwspace zero width space 0200C uni200C F0E0 0 Q\zwnonjoin zero width non-joiner 0200D uni200D E0FE 0 Q\zwjoin zero width joiner 0200E uni200E E0FC 0 Q\LtoRmark left-to-right mark 0200F uni200F E0FD 0 Q\RtoLmark right-to-left mark 02010 uni2010 213E 7X00 4dQ P hyphen ISONUM Q\texthyphen 0x2010 1 7B hyphen (true graphic) 02011 uni2011 EF22 0 Q\nobreakhyphen hyphen (nonbreaking) 02012 figuredash EF26 4DQ P dash ISOPUB Q\figdash dash figure dash 02013 endash EF24 4FQ P ndash ISOPUB btq A\endash ndash ndash Dash 0x2013 1 5D en dash 02014 emdash EF25 4FQ P mdash ISOPUB btr A\emdash mdash mdash LongDash 0x2014 1 7D em dash 02015 uni2015 00D0 1 horbar ISONUM Q\horizbar horizontal bar 02016 uni2016 2142?4X12 1FF F Verbar ISOTECH bdl P\Vert Verbar Verbar \Vert 0x2016 double vertical bar 02017 uni2017 Q\twolowline double low line (spacing) 02018 quoteleft 00A9 4FA O lsquo ISONUM ce9 P\lq lsquo OpenCurlyQuote 0x2018 single quotation mark, left 02019 quoteright 00B9 4FA C rsquo ISONUM cf9 P\rq rsquo CloseCurlyQuote 0x2019 single quotation mark, right %0201A quotesinglbase 4DA O lsquor ISOPUB L\quotsinglbase lsquor 0x201A rising single quote, left (low) %0201B uni201B 4DA C rsquor ISOPUB Q\quotsinglright rsquor rising single quote, right (high) 0201C quotedblleft 00AA 4FA O ldquo ISONUM ce0 L\textquotedblleft ldquo OpenCurlyDoubleQuote 0x201C double quotation mark, left 0201D quotedblright 00BA 4FA C rdquo ISONUM cf0 L\textquotedblright rdquo CloseCurlyDoubleQuote 0x201D double quotation mark, right %0201E quotedblbase EF28 4DA O ldquor ISOPUB L\quotdblbase ldquor 0x201E rising double quote, left (low) %0201F uni201F EF29 4DA C rdquor ISOPUB Q\quotdblright rdquor rising double quote, right (high) 02020 dagger EF30 2FO B dagger ISOAMSB bfa P\dagger dagger dagger \dagger Dagger 0x2020 dagger relation +02020 dagger EF30 0f0 N dagger ISOPUB bfa P\dagger dagger dagger \dagger Dagger dagger 02021 daggerdbl EF31 2FO B Dagger ISOAMSB bga P\ddagger Dagger Dagger \ddagger DoubleDagger 0x2021 double dagger relation +02021 daggerdbl EF31 0f0 N Dagger ISOPUB bga P\ddagger Dagger Dagger \ddagger DoubleDagger double dagger 02022 bullet EB6E 1DN B bull ISOPUB buq Q\smblkcircle bull bbull Bullet 0x2022 /bullet B: round bullet, filled +02022 bullet EB6E 0DN B bull ISOPUB buq L\textbullet bull bbull Bullet 0x2022 /bullet B: round bullet, filled %02024 onedotenleader 0 Q\enleaderonedot one dot leader 02025 twodotenleader EEA3 2DP nldr ISOPUB Q\enleadertwodots nldr double baseline dot (en leader) 02026 ellipsis 2144 2FP hellip ISOPUB bm9 P\dots hellip ellip \ldots Ellipsis 0x2026 ellipsis (horizontal) #02026 E3B4 uni2026.em 2145 7X12 AX1F 2DP P mldr ISOPUB Q\emleader mldr em leader %02027 uni2027 Q\hyphenpoint HYPHENATION POINT 02030 perthousand EF41 2FO N permil ISOTECH bhm C\textperthousand permil perthou 0x2030 per thousand 02031 uni2031 223E 2FO N pertenk ISOTECH bhn C\textpertenthousand per 10 thousand 02032 uni2032 216C 2FO N prime ISOTECH bm5 Q\textprime prime prime \prime Prime \arcmin 0x2032 1 39 prime or minute #02032 G100 uni2032.notsup 2DP N P\prime prime or minute, not superscripted 02033 uni2033 216D 2FO N Prime ISOTECH bm6 Q\textdprime Prime Prime DoublePrime \arcsec 0x2033 1 30 double prime or second #02033 G101 uni2033.notsup 2DP N Q\dprime double prime or second, not superscripted 02034 uni2034 216B 2FO N tprime ISOTECH bm7 Q\texttrprime tprime 0x2034 1 2D triple prime *02034 EA4B uni2034.notsup 2 O N Q\trprime prime3 triple prime (not superscripted) 02035 uni2035 222B 2FN N bprime ISOAMSO bl5 Q\textbackprime bprime ReversePrime 0x2035 5 29 reverse prime #02035 G103 uni2035.notsup 2DP N A\backprime reverse prime, not superscripted 02036 uni2036 222C 2FN N bPrime Q\textbackdprime ReverseDoublePrime 0x2036 5 5F double reverse prime #02036 G104 uni2036.notsup 2DP N Q\backdprime double reverse prime, not superscripted 02037 uni2037 D980 1 N N btprime Q\textbacktrprime triple reverse prime #02037 G108 uni2037.notsup 1 N N Q\backtrprime triple reverse prime, not superscripted 02038 uni2038 EE47 2DP caret ISOPUB Q\caretinsert caret caret (insertion mark) 02039 guilsinglleft EF2A 4FQ O lsaquo ce7 L\guilsinglleft 0x2039 single angle quotation mark (guillemet), left 0203A guilsinglright EF2B 4FQ C rsaquo cf7 L\guilsinglright 0x203A single angle quotation mark (guillemet), right 0203B uni203B 2228 1DN N C\textreferencemark presa reference mark = Japanese kome 0203C uni203C Q\Exclam double exclamation mark 0203E uni203E 1 Q\overline 0x203E Overline 02040 EAA8 uni2040 EFC0 CX5B 2DR B Q\tieconcat 0x2040 xx5E Character tie, Z NOTATION SEQUENCE CONCATENATION 02043 uni2043 EB3C 1DN hybull ISOPUB Q\hyphenbullet hybull 0x2043 rectangle, filled (hyphen bullet) 02044 fraction 1 N B Q\fracslash 0x2044 Fraction slash 02047 uni2047 1 Q\Question DOUBLE QUESTION MARK &0204E E36A uni204E EB5D 7X00 AX1B 1DN lowast ISOTECH Q\textasterisklow lowast LOW ASTERISK %0204F E2ED uni204F DBAE 7X11 AX1E 2 P bsemi ISOAMSO Q\textsemicolonreversed REVERSED SEMICOLON &02050 EA1A uni2050 5X4F DXE5 1DS R closur H\closure closure r208 CLOSE UP &02051 EA08 uni2051 7X13 AX20 1DN N Ast Q\textAsterisks Ast TWO ASTERISKS ALIGNED VERTICALLY &02052 uni2052 1 N C\textdiscount COMMERCIAL MINUS SIGN &02057 E371 uni2057 DB74 7X01 AX1C 2FP N qprime ISOTECH bm8 Q\textqprime 5 2B QUADRUPLE PRIME #02057 G109 uni2057.notsup DB74 7X01 AX1C 2FP N qprime ISOTECH bm8 E\qprime 5 2B QUADRUPLE PRIME, not superscripted &0205F F364 uni205F AX2B 1 N N Q\medmathspace MediumSpace MEDIUM MATHEMATICAL SPACE 02060 uni2060 0 Q\wordjoin WORD JOINER &02061 F3B7 uni2061 AX2D 0 Q\functionapply FunctionApply FUNCTION APPLICATION &02062 F3B6 uni2062 AX2E 0 Q\invisibletimes InvisibleTimes INVISIBLE TIMES &02063 uni2063 0 Q\invisiblesep INVISIBLE SEPARATOR %02070 zerosuperior 0 Q\supzero superscript zero %02074 foursuperior 0 Q\supfour superscript four %02075 fivesuperior 0 Q\supfive superscript five %02076 sixsuperior 0 Q\supsix superscript six %02077 sevensuperior 0 Q\supseven superscript seven %02078 eightsuperior 0 Q\supeight superscript eight %02079 ninesuperior 0 Q\supnine superscript nine %0207D parenleftsuperior 0 Q\suplparen superscript left parenthesis %0207E parenrightsuperior 0 Q\suprparen superscript right parenthesis %0207F nsuperior 0 Q\supn superscript latin small letter n %02080 zeroinferior 0 Q\subzero subscript zero %02081 oneinferior 0 Q\subone subscript one %02082 twoinferior 0 Q\subtwo subscript two %02083 threeinferior 0 Q\subthree subscript three %02084 fourinferior 0 Q\subfour subscript four %02085 fiveinferior 0 Q\subfive subscript five %02086 sixinferior 0 Q\subsix subscript six %02087 seveninferior 0 Q\subseven subscript seven %02088 eightinferior 0 Q\subeight subscript eight %02089 nineinferior 0 Q\subnine subscript nine %0208D parenleftinferior 0 Q\sublparen subscript left parenthesis %0208E parenrightinferior 0 Q\subrparen subscript right parenthesis %020A1 colonmonetary 0 Q\textcolonmonetary colon sign 020A3 uni20A3 Q\textfranc French franc sign 020A4 uni20A4 Q\textlira lira sign 020A7? uni20A7 FDFB 4FA N bhg Q\textpesetas pesetas 020AC uni20AC 4 bhh L\euro 0x20AC Euro sign 020D0 uni20D0 2DD D H\leftharpoonaccent dlhook h050 0x20D0 5 54 combining left harpoon above #020D0 G005 uni20D0.size1 1DW D Q\wideleftharpoonaccent combining left harpoon above (multiple characters and non-spacing) #020D0 G005 uni20D0.size2 1DW D Q\wideleftharpoonaccent combining left harpoon above (multiple characters and non-spacing) #020D0 G005 uni20D0.size3 1DW D Q\wideleftharpoonaccent combining left harpoon above (multiple characters and non-spacing) #020D0 G005 uni20D0.size4 1DW D Q\wideleftharpoonaccent combining left harpoon above (multiple characters and non-spacing) #020D0 G005 uni20D0.size5 1DW D Q\wideleftharpoonaccent combining left harpoon above (multiple characters and non-spacing) 020D1 uni20D1 2DD D H\rightharpoonaccent drhook \harp h051 0x20D1 5 59 combining right harpoon above #020D1 G004 uni20D1.size1 1DW D Q\widerightharpoonaccent combining right harpoon above (multiple characters and non-spacing) #020D1 G004 uni20D1.size2 1DW D Q\widerightharpoonaccent combining right harpoon above (multiple characters and non-spacing) #020D1 G004 uni20D1.size3 1DW D Q\widerightharpoonaccent combining right harpoon above (multiple characters and non-spacing) #020D1 G004 uni20D1.size4 1DW D Q\widerightharpoonaccent combining right harpoon above (multiple characters and non-spacing) #020D1 G004 uni20D1.size5 1DW D Q\widerightharpoonaccent combining right harpoon above (multiple characters and non-spacing) 020D2 uni20D2 2DD D Q\vertoverlay combining long vertical line overlay 020D6 uni20D6 2DD D P\overleftarrow a180 0x20D6 5 40 combining left arrow above #020D6 G002 uni20D6.size1 1DW D Q\wideoverleftarrow combining left arrow above (multiple characters and non-spacing) #020D6 G002 uni20D6.size2 1DW D Q\wideoverleftarrow combining left arrow above (multiple characters and non-spacing) #020D6 G002 uni20D6.size3 1DW D Q\wideoverleftarrow combining left arrow above (multiple characters and non-spacing) #020D6 G002 uni20D6.size4 1DW D Q\wideoverleftarrow combining left arrow above (multiple characters and non-spacing) #020D6 G002 uni20D6.size5 1DW D Q\wideoverleftarrow combining left arrow above (multiple characters and non-spacing) 020D7 uni20D7 2DD D P\vec ar vec \vec a181 0x20D7 5 24 combining right arrow above #020D7 G003 uni20D7.size1 1DW D Q\wideoverrightarrow combining right arrow above (multiple characters and non-spacing) #020D7 G003 uni20D7.size2 1DW D Q\wideoverrightarrow combining right arrow above (multiple characters and non-spacing) #020D7 G003 uni20D7.size3 1DW D Q\wideoverrightarrow combining right arrow above (multiple characters and non-spacing) #020D7 G003 uni20D7.size4 1DW D Q\wideoverrightarrow combining right arrow above (multiple characters and non-spacing) #020D7 G003 uni20D7.size5 1DW D Q\wideoverrightarrow combining right arrow above (multiple characters and non-spacing) 020DB uni20DB D8A7 2FD D tdot ISOTECH cap A\dddot tdot d3dot TripleDot 0x20DB 5 26 combining three dots above 020DC uni20DC D8A8 2FD D DotDot ISOTECH caq A\ddddot DotDot combining four dots above 020DD uni20DD D8A9 2 Q\enclosecircle COMBINING ENCLOSING CIRCLE \020DE uni20DE D8AA Q\enclosesquare COMBINING ENCLOSING SQUARE \020DF uni20DF D8AB Q\enclosediamond COMBINING ENCLOSING DIAMOND 020E1 uni20E1 2DD D P\overleftrightarrow ddarr \lrvec a182 0x20E1 combining left right arrow above 020E4 uni20E4 2 Q\enclosetriangle COMBINING ENCLOSING UPWARD POINTING TRIANGLE &020E5 uni20E5 AX0E 2 D Q\textoverlaybackslash COMBINING REVERSE SOLIDUS OVERLAY &020E6 EAAE uni20E6 AX0F 2 D D Q\textoverlaydoublevert COMBINING DOUBLE VERTICAL STROKE OVERLAY &020E7 EC06 uni20E7 7X0C AX10 1DF D actuary Q\annuity COMBINING ANNUITY SYMBOL &020E8 EA58 uni20E8 7X07 AX16 2DD D Q\threeunderdot tdundot COMBINING TRIPLE UNDERDOT &020E9 uni20E9 2 D Q\widebridgeabove COMBINING WIDE BRIDGE ABOVE &020EA uni20EA 2 D Q\textoverlayleftarrow COMBINING LEFTWARDS ARROW OVERLAY B020EB G0F5 uni20EB 1dN Q\textoverlaytwosolidus COMBINING LONG DOUBLE SOLIDUS OVERLAY W020EC uni20EC 2DD D Q\overrightharpoondown COMBINING RIGHTWARDS HARPOON WITH BARB DOWNWARDS #020EC G006 uni20EC.size1 1DW D Q\overrightharpoondown COMBINING RIGHTWARDS HARPOON WITH BARB DOWNWARDS (multiple characters and non-spacing) #020EC G006 uni20EC.size2 1DW D Q\overrightharpoondown COMBINING RIGHTWARDS HARPOON WITH BARB DOWNWARDS (multiple characters and non-spacing) #020EC G006 uni20EC.size3 1DW D Q\overrightharpoondown COMBINING RIGHTWARDS HARPOON WITH BARB DOWNWARDS (multiple characters and non-spacing) #020EC G006 uni20EC.size4 1DW D Q\overrightharpoondown COMBINING RIGHTWARDS HARPOON WITH BARB DOWNWARDS (multiple characters and non-spacing) #020EC G006 uni20EC.size5 1DW D Q\overrightharpoondown COMBINING RIGHTWARDS HARPOON WITH BARB DOWNWARDS (multiple characters and non-spacing) W020ED uni20ED 2DD D Q\overleftharpoondown COMBINING LEFTWARDS HARPOON WITH BARB DOWNWARDS #020ED G007 uni20ED.size1 1DW D Q\overleftharpoondown COMBINING LEFTWARDS HARPOON WITH BARB DOWNWARDS (multiple characters and non-spacing) #020ED G007 uni20ED.size2 1DW D Q\overleftharpoondown COMBINING LEFTWARDS HARPOON WITH BARB DOWNWARDS (multiple characters and non-spacing) #020ED G007 uni20ED.size3 1DW D Q\overleftharpoondown COMBINING LEFTWARDS HARPOON WITH BARB DOWNWARDS (multiple characters and non-spacing) #020ED G007 uni20ED.size4 1DW D Q\overleftharpoondown COMBINING LEFTWARDS HARPOON WITH BARB DOWNWARDS (multiple characters and non-spacing) #020ED G007 uni20ED.size5 1DW D Q\overleftharpoondown COMBINING LEFTWARDS HARPOON WITH BARB DOWNWARDS (multiple characters and non-spacing) W020EE uni20EE 2DD D Q\underleftarrow COMBINING LEFT ARROW BELOW #020EE G008 uni20EE.size1 1DW D Q\underleftarrow COMBINING LEFT ARROW BELOW (multiple characters and non-spacing) #020EE G008 uni20EE.size2 1DW D Q\underleftarrow COMBINING LEFT ARROW BELOW (multiple characters and non-spacing) #020EE G008 uni20EE.size3 1DW D Q\underleftarrow COMBINING LEFT ARROW BELOW (multiple characters and non-spacing) #020EE G008 uni20EE.size4 1DW D Q\underleftarrow COMBINING LEFT ARROW BELOW (multiple characters and non-spacing) #020EE G008 uni20EE.size5 1DW D Q\underleftarrow COMBINING LEFT ARROW BELOW (multiple characters and non-spacing) W020EF uni20EF 2DD D Q\underrightarrow COMBINING RIGHT ARROW BELOW #020EF G009 uni20EF.size1 1DW D Q\underrightarrow COMBINING RIGHT ARROW BELOW (multiple characters and non-spacing) #020EF G009 uni20EF.size2 1DW D Q\underrightarrow COMBINING RIGHT ARROW BELOW (multiple characters and non-spacing) #020EF G009 uni20EF.size3 1DW D Q\underrightarrow COMBINING RIGHT ARROW BELOW (multiple characters and non-spacing) #020EF G009 uni20EF.size4 1DW D Q\underrightarrow COMBINING RIGHT ARROW BELOW (multiple characters and non-spacing) #020EF G009 uni20EF.size5 1DW D Q\underrightarrow COMBINING RIGHT ARROW BELOW (multiple characters and non-spacing) 02102 E502 uni2102 EFAC 1DZ A Copf ISOMOPF Q\BbbC \complex DoubleStruckCapitalC \bbbc 0x2102 6 43 xx43 /Bbb C, open face C +02102 E502 uni2102 EFAC 0DZ A Copf ISOMOPF Q\BbbC \BBC DoubleStruckCapitalC \bbbc 0x2102 6 43 xx43 /Bbb C, open face C %02105 uni2105 EF40 4DA N incare ISOPUB Q\incare incare in-care-of symbol 02107 uni2107 1dZ Q\Eulerconst 0x2107 5 6C Euler constant 0210A E546 uni210A ____ 1DZ A gscr ISOMSCR Q\scrg ScriptG 0x210A 2 3B /scr g, script letter g 0210B uni210B EB22 1FZ A hamilt ISOTECH cjh Q\scrH hamilt ScriptCapitalH 0x210B 2 2A Hamiltonian (script capital H) +0210B E527 uni210B EB22 0fZ A Hscr ISOMSCR cjh Q\scrH ScriptCapitalH 0x210B 2 2A /scr H, script letter H 0210C E567 uni210C EB2B 1dZ A Hfr ISOMFRK Q\frakH GothicCapitalH 0x210C 2 48 /frak H, upper case H 0210D E507 uni210D 22E8 1DZ A Hopf ISOMOPF Q\BbbH \hilbert DoubleStruckCapitalH \bbbh 0x210D 6 48 /Bbb H, open face H +0210D E507 uni210D 22E8 0DZ A Hopf ISOMOPF Q\BbbH \BBH DoubleStruckCapitalH \bbbh 0x210D 6 48 xx48 /Bbb H, open face H 0210E uni210E 1 Z Q\Planckconst 0x210E Planck constant #0210F 210F uni210F EF68 1FZ A plankv ISOAMSO bug A\hslash hslash planck \hbar HBar 0x210F 1 22 /hslash - variant Planck's over 2pi #0210F E2D5 uni210F.var EE2F 0FN A plank ISOAMSO buh A\hbar /hbar - Planck's over 2pi 02110 E528 uni2110 EB23 1DZ A Iscr ISOMSCR Q\scrI ScriptCapitalI 0x2110 2 28 /scr I, script letter I 02111 uni2111 22A9 1dZ A image ISOAMSO P\Im Im \Im GothicCapitalI 0x2111 2 49 imaginary part +02111 uni2111 ____ 0dZ A Ifr ISOMFRK Q\frakI GothicCapitalI /frak I, upper case I 02112 uni2112 EE44 1fZ A lagran ISOTECH cjl Q\scrL lagran ScriptCapitalL 0x2112 2 2B Lagrangian (script capital L) +02112 E52B uni2112 EE44 0fZ A Lscr ISOMSCR cjl Q\scrL ScriptCapitalL 0x2112 2 2B /scr L, script letter L 02113 E54B uni2113 EF69 1FZ A ell ISOAMSO buk P\ell ell \ell ScriptL 0x2113 2 2C cursive small l 02115 uni2115 EFAD 1dZ A Nopf ISOMOPF Q\BbbN \posinteger DoubleStruckCapitalN \bbbn 0x2115 6 4E xx4E /Bbb N, open face N +02115 E50D uni2115 EFAD 0DZ A Nopf ISOMOPF Q\BbbN \BBN DoubleStruckCapitalN \bbbn 0x2115 6 4E xx4E /Bbb N, open face N %02116 uni2116 4DA N numero ISOCYR1 L\textnumero numero sign %02117 uni2117 23AE 2DO N copysr ISOPUB C\textcircledP copysr sound recording copyright sign 02118 uni2118 22A6 1FZ A weierp ISOAMSO bjo P\wp weierp weierp \wp WeierstrassP 0x2118 5 60 Weierstrass p 02119 uni2119 EB21 1dZ A Popf ISOMOPF Q\BbbP \REALP DoubleStruckCapitalP \bbbp 0x2119 6 50 xx50 /Bbb P, open face P +02119 E50F uni2119 EB21 0DZ A Popf ISOMOPF Q\BbbP \BBP DoubleStruckCapitalP \bbbp 0x2119 6 50 xx50 /Bbb P, open face P 0211A E510 uni211A 22E7 1DZ A Qopf ISOMOPF Q\BbbQ \BBQ DoubleStruckCapitalQ 0x211A 6 51 xx51 /Bbb Q, open face Q 0211B E531 uni211B EE43 1DZ A Rscr ISOMSCR Q\scrR ScriptCapitalR 0x211B 2 35 /scr R, script letter R 0211C uni211C 22A8 1dZ A real ISOAMSO P\Re Re \Re GothicCapitalR 0x211C 2 52 real part +0211C E571 uni211C ____ 6XC1 0dZ A Rfr ISOMFRK Q\frakR GothicCapitalR 2 52 /frak R, upper case R 0211D uni211D EFAE 1dZ A Ropf ISOMOPF Q\BbbR \REALR DoubleStruckCapitalR \bbbr 0x211D 6 52 xx52 /Bbb R, open face R +0211D E511 uni211D EFAE 0DZ A Ropf ISOMOPF Q\BbbR \BBR DoubleStruckCapitalR \bbbr 0x211D 6 52 xx52 /Bbb R, open face R 0211E uni211E EFA9 1FZ N rx ISOPUB bjh C\textrecipe rx recipe pharmaceutical prescription (Rx) 02122 trademark 00D4 2FB trade ISONUM bht L\texttrademark trade Trademark 0x2122 trade mark sign 02124 uni2124 EFAF 1dZ A Zopf ISOMOPF Q\BbbZ \ZED DoubleStruckCapitalZ \bbbz 0x2124 6 5A xx5A /Bbb Z, open face Z +02124 E519 uni2124 EFAF 0DZ A Zopf ISOMOPF Q\BbbZ \BBZ DoubleStruckCapitalZ \bbbz 0x2124 6 5A xx5A /Bbb Z, open face Z 02125 uni2125 2 Q\textoz 0x2125 Ounce sign 02126 uni2126 00E0 2 N ohm ISONUM C\textohm 0x2126 ohm sign 02127 uni2127 227C 2FO N mho ISOAMSO ce2 A\mho mho Mho 0x2127 conductance 02128 E579 uni2128 EB7C 1dZ A Zfr ISOMFRK Q\frakZ GothicCapitalZ 0x2128 2 5A /frak Z, upper case Z 02129 uni2129 EBD0 2FB A iiota ISOAMSO cd0 Q\turnediota turned iota 0212B uni212B F128 2FB A angst ISOTECH buw Q\Angstrom angst Aring angst Angstrom 0x212B Angstrom capital A, ring 0212C uni212C DB43 1f0 A bernou ISOTECH cjb Q\scrB bernou ScriptCapitalB 0x212C 2 40 Bernoulli function (script capital B) +0212C E521 uni212C DB43 0FZ A Bscr ISOMSCR cjb Q\scrB ScriptCapitalB 0x212C 2 40 /scr B, script letter B 0212D uni212D 1dZ A Cfr ISOMFRK Q\frakC GothicCapitalC 0x212D 2 43 black-letter capital C 0212E uni212E 1dZ A C\textestimated estimated symbol 0212F E544 uni212F ____ 1DZ A escr ISOMSCR Q\scre ScriptE 0x212F /scr e, script letter e 02130 E524 uni2130 D856 1DZ A Escr ISOMSCR Q\scrE ScriptCapitalE 0x2130 2 25 /scr E, script letter E 02131 E525 uni2131 D857 1DZ A Fscr ISOMSCR Q\scrF ScriptCapitalF 0x2131 2 5E /scr F, script letter F 02132 uni2132 D8B4 2DO N A\Finv 0x2132 turned capital F 02133 uni2133 EB5E 1fZ A phmmat ISOTECH cjm Q\scrM phmmat ScriptCapitalM 0x2133 2 7D physics M-matrix (script capital M) +02133 E52C uni2133 EB5E 0fZ A Mscr ISOMSCR cjm Q\scrM ScriptCapitalM 0x2133 2 7D /scr M, script letter M 02134 uni2134 DB6E 1dZ A order ISOTECH Q\scro order ScriptO 0x2134 order of (script small o) +02134 E54E uni2134 DB6E 0dZ A oscr ISOMSCR Q\scro ScriptO 0x2134 /scr o, script letter o 02135 uni2135 E140 1FZ A aleph ISOTECH cha P\aleph aleph aleph \aleph Aleph 0x2135 1 3A aleph, Hebrew 02136 uni2136 E141 1FZ A beth ISOAMSO chb A\beth beth Bet 0x2136 beth, Hebrew 02137 uni2137 E142 1FZ A gimel ISOAMSO chd A\gimel gimel Gimel 0x2137 gimel, Hebrew 02138 uni2138 E143 1FZ A daleth ISOAMSO chc A\daleth daleth Dalet 0x2138 daleth, Hebrew &0213C F749 uni213C 1dZ N opfpi Q\Bbbpi DoubledPi DOUBLE-STRUCK SMALL PI &0213D F74A uni213D 6X27 AX0A 1DZ A opfgamma Q\Bbbgamma DoubledGamma DOUBLE-STRUCK SMALL GAMMA &0213E ED9F uni213E AX0B 1DZ A opfGam Q\BbbGamma DOUBLE-STRUCK CAPITAL GAMMA &0213F E801 uni213F 6X28 AX0C 1dZ A opfPi A\BbbPi DOUBLE-STRUCK CAPITAL PI +0213F E51A uni213F AX0C 1DZ A opfPi A\BbbPi open face capital Pi &02140 EC0A uni2140 6X29 AX0D 1DL L opfsum Q\Bbbsum DOUBLE-STRUCK N-ARY SUMMATION #02140 EC0A uni2140.lgdisplay 6X29 AX0D 1DL L opfsum Q\Bbbsum DOUBLE-STRUCK N-ARY SUMMATION M02140 EC0A uni2140.small 6X29 AX0D 1DL L opfsum Q\Bbbsum DOUBLE-STRUCK N-ARY SUMMATION &02141 E81C uni2141 6X12 AX06 1DZ N Game A\Game TURNED SANS-SERIF CAPITAL G &02142 EA3C uni2142 6X14 AX07 1DZ N Q\sansLmirrored isfL TURNED SANS-SERIF CAPITAL L &02143 EA51 uni2143 6X15 AX08 1DZ N Q\sansLinverted rsfL REVERSED SANS-SERIF CAPITAL L &02144 EA5E uni2144 6X17 AX09 1DZ N S\Yup yinvert TURNED SANS-SERIF CAPITAL Y &02145 F74B uni2145 6X22 AX11 1DZ N Q\itBbbD CapitalDifferentialD DOUBLE-STRUCK ITALIC CAPITAL D &02146 F74C uni2146 6X23 AX12 1DZ N Q\itBbbd DifferentialD DOUBLE-STRUCK ITALIC SMALL D &02147 F74D uni2147 6X24 AX13 1DZ N Q\itBbbe ExponentialE DOUBLE-STRUCK ITALIC SMALL E &02148 F74E uni2148 6X25 AX14 1DZ N Q\itBbbi ImaginaryI DOUBLE-STRUCK ITALIC SMALL I &02149 F74F uni2149 6X26 AX15 1DZ N Q\itBbbj ImaginaryJ DOUBLE-STRUCK ITALIC SMALL J 0214A uni214A 1 Q\PropertyLine PROPERTY LINE &0214B E846 uni214B 7X1D AX28 2DO B turnamp A\upand TURNED AMPERSAND %02153 onethird EFFD 2DX frac13 ISOPUB Q\fraconethird frac13 fraction one-third %02154 twothirds EFFE 2DX frac23 ISOPUB Q\fractwothirds frac23 fraction two-thirds %02155 uni2155 EB50 2DX frac15 ISOPUB Q\fraconefifth frac15 fraction one-fifth %02156 uni2156 EB51 2DX frac25 ISOPUB Q\fractwofifths frac25 fraction two-fifths %02157 uni2157 EB52 2DX frac35 ISOPUB Q\fracthreefifths frac35 fraction three-fifths %02158 uni2158 EB53 2DX frac45 ISOPUB Q\fracfourfifths frac45 fraction four-fifths %02159 uni2159 EB54 2DX frac16 ISOPUB Q\fraconesixth frac16 fraction one-sixth %0215A uni215A EB55 2DX frac56 ISOPUB Q\fracfivesixths frac56 fraction five-sixths %0215B oneeighth 00DC 2 X frac18 ISONUM Q\fraconeeighth fraction one-eighth %0215C threeeighths 00DD 2 X frac38 ISONUM Q\fracthreeeighths fraction three-eighths %0215D fiveeighths 00DE 2 X frac58 ISONUM Q\fracfiveeighths fraction five-eighths %0215E seveneighths 00DF 2 X frac78 ISONUM Q\fracseveneights fraction seven-eighths 02190 2190 uni2190 EEAC 1FS R larr ISONUM bag P\leftarrow larr \leftarrow LeftArrow a000 0x2190 /leftarrow /gets A: leftward arrow #02190 E233 uni2190.short D9DE 1DS slarr ISOAMSA H\shortleftarrow ShortLeftArrow a013 short left arrow 02191 2191 uni2191 EEAD 1FS R uarr ISONUM bce P\uparrow uarr uarr \uparrow UpArrow a001 0x2191 upward arrow #02191 F52A uni2191.short 1DS suarr H\shortuparrow ShortUpArrow a012 short up arrow 02192 2192 uni2192 EEAE 1FS R rarr ISONUM bam P\rightarrow rarr rarr \rightarrow RightArrow a002 0x2192 xx20 /rightarrow /to A: rightward arrow #02192 E232 uni2192.short D9DF 1DS srarr ISOAMSA H\shortrightarrow ShortRightArrow a011 short right arrow 02193 2193 uni2193 EEAF 1FS R darr ISONUM bcc P\downarrow darr darr \downarrow DownArrow a003 0x2193 downward arrow #02193 F52B uni2193.short 1DS sdarr H\shortdownarrow ShortDownArrow a014 short down arrow 02194 uni2194 EF52 1FS R harr ISOAMSA bar P\leftrightarrow harr harr \leftrightarrow LeftRightArrow a004 0x2194 xx10 left and right arrow 02195 uni2195 EEB5 1FS R varr ISOAMSA bcr P\updownarrow varr varr \updownarrow UpDownArrow a005 0x2195 up and down arrow 02196 uni2196 EF3C 1FS R nwarr ISOAMSA bci P\nwarrow nwarr nwarr \nwarrow UpperLeftArrow a079 0x2196 NW pointing arrow 02197 uni2197 EF3E 1FS R nearr ISOAMSA bck P\nearrow nearr nearr \nearrow UpperRightArrow a080 0x2197 NE pointing arrow 02198 uni2198 EF3D 1FS R searr ISOAMSA bcj P\searrow drarr rarrd \searrow LowerRightArrow a081 0x2198 SE pointing arrow 02199 uni2199 EF3F 1FS R swarr ISOAMSA bcl P\swarrow dlarr dlarr \swarrow LowerLeftArrow a082 0x2199 SW pointing arrow 0219A uni219A EEF7 1FS R nlarr ISOAMSA bbg A\nleftarrow nlarr larln a006 0x219A not left arrow 0219B uni219B EEF8 1FS R nrarr ISOAMSA bbm A\nrightarrow nrarr rarln a007 0x219B not right arrow *0219C uni219C D8B6 1DS R larrw A\leftsquigarrow a165 0x219C left arrow-wavy #0219C uni219C D8B6 1dS R larrw H\leftwavyarrow a165 left arrow-wavy *0219D uni219D EF53 1DS R rarrw ISOAMSA A\rightsquigarrow rarrw a164 0x219D right arrow-wavy #0219D uni219D EF53 1d0 R rarrw ISOAMSA H\rightwavyarrow rarrw a164 right arrow-wavy 0219E uni219E 2246 1FS R Larr ISOAMSA bav A\twoheadleftarrow Larr a015 0x219E left two-headed arrow 0219F uni219F D9E3 1DS R Uarr ISOAMSA H\twoheaduparrow a016 0x219F up two-headed arrow 021A0 uni21A0 2247 1FS R Rarr ISOAMSA baw A\twoheadrightarrow Rarr a017 0x21A0 xx23 right two-headed arrow 021A1 uni21A1 D9A2 1DS R Darr ISOAMSA H\twoheaddownarrow a018 0x21A1 down two-headed arrow 021A2 uni21A2 224C 1FS R larrtl ISOAMSA bay A\leftarrowtail larrtl a009 0x21A2 left arrow-tailed 021A3 uni21A3 224D 1FS R rarrtl ISOAMSA baz A\rightarrowtail rarrtl a010 0x21A3 xx30 right arrow-tailed 021A4 21A4 uni21A4 D8B7 1DS R mapstoleft S\mapsfrom mapl LeftTeeArrow a021 0x21A4 maps to, leftward 021A5 uni21A5 D8B8 1DS R mapstoup H\mapsup UpTeeArrow a020 0x21A5 maps to, upward 021A6 21A6 uni21A6 226B 1FS R map ISOAMSA bao P\mapsto map mapr \mapsto RightTeeArrow a019 0x21A6 2 B0 xx13 maps to, rightward 021A7 uni21A7 D8B9 1DS R mapstodown H\mapsdown DownTeeArrow a022 0x21A7 maps to, downward 021A8 uni21A8 EEB6 1DS H\updownarrowbar a166 0x21A8 up down arrow with base (perpendicular) *021A8 uni21A8 EBA9 0d0 R varrb H\updownarrowbar up and down arrow, bar under 021A9 uni21A9 225B 1FS R larrhk ISOAMSA bae A\hookleftarrow larrhk larrhk \hookleftarrow a063 0x21A9 left arrow-hooked 021AA uni21AA 225A 1FS R rarrhk ISOAMSA bak P\hookrightarrow rarrhk rarrhk \hookrightarrow a064 0x21AA right arrow-hooked 021AB uni21AB 224E 1FS R larrlp ISOAMSA bbe A\looparrowleft larrlp a065 0x21AB left arrow-looped 021AC uni21AC 224F 1FS R rarrlp ISOAMSA bbk A\looparrowright rarrlp a066 0x21AC right arrow-looped *021AD uni21AD 2252 1FS R harrw ISOAMSA bai A\leftrightsquigarrow harrw a171 0x21AD left and right arr-wavy #021AD uni21AD 2252 0f0 R harrw ISOAMSA bai H\leftrightwavyarrow harrw a171 left and right arr-wavy 021AE 21AE uni21AE EEF9 1DS R nharr ISOAMSA A\nleftrightarrow nharr harrl a008 0x21AE not left and right arrow 021AF uni21AF D8BA 1DS R zigdarr H\downzigzagarrow a217 0x21AF downwards zigzag arrow 021B0 uni21B0 2250 1FS R lsh ISOAMSA bbw P\Lsh lsh a123 0x21B0 /Lsh A: 021B1 uni21B1 2251 1FS R rsh ISOAMSA bcw P\Rsh rsh a124 0x21B1 /Rsh A: 021B2 uni21B2 22EE 1DS R ldsh ISOAMSA H\Ldsh a125 0x21B2 left down angled arrow 021B3 uni21B3 22EF 1FS R rdsh ISOAMSA bcx H\Rdsh a126 0x21B3 right down angled arrow 021B4 uni21B4 1 S Q\linefeed 0x21B4 rightwards arrow with corner downwards 021B5 uni21B5 F0BD 1DS H\carriagereturn ReturnIndicator a220 0x21B5 downwards arrow with corner leftward = carriage return 021B6 uni21B6 EEF2 1FS R cularr ISOAMSA bcp A\curvearrowleft cularr larrcurt a130 0x21B6 2 5B left curved arrow 021B7 uni21B7 EEF3 1FS R curarr ISOAMSA bcq A\curvearrowright curarr rarrcurt a129 0x21B7 2 7B right curved arrow 021B8 uni21B8 1 S Q\barovernorthwestarrow 0x21B8 North west arrow to long bar 021B9 uni21B9 1 S Q\barleftarrowrightarrowbar 0x21B9 Leftwards arrow to bar over rightwards arrow to bar 021BA 21BA uni21BA EEF4 1DS H\acwopencirclearrow a139 0x21BA anticlockwise open circle arrow 021BB 21BB uni21BB EEF5 1DS H\cwopencirclearrow a140 0x21BB clockwise open circle arrow 021BC uni21BC 2256 1FS R lharu ISOAMSA baf P\leftharpoonup lharu lharu \leftharpoonup LeftVector h002 0x21BC left harpoon-up 021BD uni21BD 2257 1FS R lhard ISOAMSA bbf P\leftharpoondown lhard lbharr \leftharpoondown DownLeftVector h003 0x21BD left harpoon-down 021BE uni21BE 224A 1FS R uharr ISOAMSA bch A\upharpoonright uharr uharr RightUpVector h030 0x21BE /upharpoonright /restriction A: up harpoon-right 021BF uni21BF 2248 1FS R uharl ISOAMSA bcg A\upharpoonleft uharl uharl LeftUpVector h031 0x21BF up harpoon-left 021C0 uni21C0 2258 1FS R rharu ISOAMSA bal P\rightharpoonup rharu rharu \rightharpoonup RightVector h004 0x21C0 right harpoon-up 021C1 uni21C1 2259 1FS R rhard ISOAMSA bbj P\rightharpoondown rhard rbharr \rightharpoondown DownRightVector h005 0x21C1 right harpoon-down 021C2 uni21C2 224B 1FS R dharr ISOAMSA bcb A\downharpoonright dharr dharr RightDownVector h032 0x21C2 down harpoon-right 021C3 uni21C3 2249 1FS R dharl ISOAMSA bca A\downharpoonleft dharl dharl LeftDownVector h033 0x21C3 down harpoon-left 021C4 uni21C4 EE50 1FS R rlarr ISOAMSA bad A\rightleftarrows rlarr2 rlarr2 RightArrowLeftArrow a030 0x21C4 right arrow over left arrow 021C5 uni21C5 EB2E 1FS R udarr ISOAMSA bcm H\updownarrows UpArrowDownArrow a027 0x21C5 up arrow, down arrow 021C6 uni21C6 EF51 1FS R lrarr ISOAMSA bac A\leftrightarrows lrarr2 lrarr2 LeftArrowRightArrow \getsto a028 0x21C6 left arrow over right arrow 021C7 uni21C7 2240 1FS R llarr ISOAMSA bau A\leftleftarrows larr2 a023 0x21C7 two left arrows 021C8 uni21C8 2242 1FS R uuarr ISOAMSA bct A\upuparrows uarr2 a024 0x21C8 two up arrows 021C9 uni21C9 2241 1FS R rrarr ISOAMSA bat A\rightrightarrows rarr2 rarr2 a025 0x21C9 two right arrows 021CA uni21CA 2243 1FS R ddarr ISOAMSA bcu A\downdownarrows darr2 ddarr a026 0x21CA two down arrows 021CB uni21CB EEF6 1FS R lrhar ISOAMSA baa A\leftrightharpoons lrhar2 lrhar2 ReverseEquilibrium h006 0x21CB left harpoon over right 021CC uni21CC EF50 1FS R rlhar ISOAMSA bab A\rightleftharpoons rlhar2 rlhar2 \rightleftharpoons Equilibrium h007 0x21CC right harpoon over left 021CD 21CD uni21CD EEFA 1FS R nlArr ISOAMSA bbh A\nLeftarrow nlArr a037 0x21CD not implied by 021CE 21CE uni21CE EEFC 1FS R nhArr ISOAMSA bbs A\nLeftrightarrow nhArr a039 0x21CE not left and right double arrows 021CF 21CF uni21CF EEFB 1FS R nrArr ISOAMSA bbn A\nRightarrow nrArr a038 0x21CF not implies 021D0 uni21D0 EF4D 1FS R lArr ISOTECH bah P\Leftarrow lArr lArr \Leftarrow DoubleLeftArrow a031 0x21D0 is implied by 021D1 uni21D1 2260 1FS R uArr ISOAMSA bcf P\Uparrow uArr uArr \Uparrow DoubleUpArrow a032 0x21D1 up double arrow #021D1 G10A uni21D1.short 1 S Q\Uparrowhead double vertical arrow top piece 021D2 uni21D2 EF4F 1FS R rArr ISOTECH ban P\Rightarrow rArr rArr \Rightarrow DoubleRightArrow a033 0x21D2 implies 021D3 uni21D3 2261 1FS R dArr ISOAMSA bcd P\Downarrow dArr dArr \Downarrow DoubleDownArrow a034 0x21D3 down double arrow #021D3 G10B uni21D3.short 1 S Q\Downarrowhead double vertical arrow bottom piece 021D4 uni21D4 EF4E 1X05 1FS R hArr ISOAMSA bas P\Leftrightarrow hArr iff \Leftrightarrow DoubleLeftRightArrow a035 0x21D4 left and right double arrow +021D4 E365 uni21D4 2268 1X05 0 S R iff ISOTECH P\iff iff \iff a056 if and only if 021D5 uni21D5 EE51 1FS R vArr ISOAMSA bcs P\Updownarrow vArr vArr \Updownarrow DoubleUpDownArrow a036 0x21D5 up and down double arrow 021D6 uni21D6 D9C6 1DS R nwArr ISOAMSA H\Nwarrow a071 0x21D6 NW pointing double arrow 021D7 uni21D7 D9BE 1DS R neArr ISOAMSA H\Nearrow a072 0x21D7 NE pointing double arrow 021D8 uni21D8 D9DC 1DS R seArr ISOAMSA H\Searrow a073 0x21D8 SE pointing double arrow 021D9 uni21D9 D9E1 1DS R swArr ISOAMSA H\Swarrow a074 0x21D9 SW pointing double arrow 021DA uni21DA 2244 1FS R lAarr ISOAMSA baq A\Lleftarrow lAarr a059 0x21DA left triple arrow 021DB uni21DB 2245 1FS R rAarr ISOAMSA bap A\Rrightarrow rAarr a061 0x21DB right triple arrow *021DC G10E uni21DC EBCC 1DS R ziglarr Q\leftzigzagarrow a178 0x21DC left zig-zag arrow *021DC 21DC uni21DC.long EBCC 1DS R xziglarr H\longleftzigzagarrow a178 0x21DC left long zig-zag arrow 021DD E244 uni21DD D9E9 1DS R zigrarr ISOAMSA H\rightzigzagarrow \leadsto a177 0x21DD right zig-zag arrow 021DE uni21DE 1 S Q\nHuparrow 0x21DE Upwards arrow with double stroke 021DF uni21DF 1 S Q\nHdownarrow 0x21DF Downwards arrow with double stroke 021E0 G114 uni21E0 1DS Q\leftdasharrow 0x21E0 Leftwards dashed arrow #021E0 G10C uni21E0.short 1 S Q\leftdasharrowhead arrowhead for leftwards dashed arrow 021E1 G112 uni21E1 1DS Q\updasharrow 0x21E1 Upwards dashed arrow 021E2 G115 uni21E2 1DS Q\rightdasharrow 0x21E2 Rightwards dashed arrow #021E2 G10D uni21E2.short 1 S Q\rightdasharrowhead arrowhead for rightwards dashed arrow 021E3 G113 uni21E3 1DS Q\downdasharrow 0x21E3 Downwards dashed arrow 021E4 uni21E4 F0D6 1DS R larrb H\barleftarrow LeftArrowBar a110 0x21E4 leftwards arrow to bar 021E5 uni21E5 F0D7 1DS R rarrb H\rightarrowbar RightArrowBar a112 0x21E5 rightwards arrow to bar 021E6 uni21E6 1 S Q\leftwhitearrow 0x21E6 Leftwards white arrow 021E7 uni21E7 1 S Q\upwhitearrow 0x21E7 Upwards white arrow 021E8 uni21E8 1 S Q\rightwhitearrow 0x21E8 Rightwards white arrow 021E9 uni21E9 1 S Q\downwhitearrow 0x21E9 Downwards white arrow 021EA uni21EA F0D8 1 S Q\whitearrowupfrombar 0x21EA Upwards white arrow from bar &021F4 G030 uni21F4 1 S R Q\circleonrightarrow \arrowoncirc RIGHT ARROW WITH SMALL CIRCLE &021F5 E216 uni21F5 EB2F 1X00 BX00 1FS R duarr ISOAMSA bcn H\downuparrows DownArrowUpArrow a029 0xEB12 DOWNWARDS ARROW LEFTWARDS OF UPWARDS ARROW &021F6 EA4C uni21F6 1X01 BX01 1DS R rarr3 H\rightthreearrows rarr3 a158 THREE RIGHTWARDS ARROWS &021F7 ED0A uni21F7 BX02 1DS R nvlarr H\nvleftarrow LEFTWARDS ARROW WITH VERTICAL STROKE &021F8 ED0B uni21F8 BX03 1DS R nvrarr H\nvrightarrow xx21 RIGHTWARDS ARROW WITH VERTICAL STROKE &021F9 E650 uni21F9 BX04 1FS R nvharr bbr H\nvleftrightarrow a204 xx11 LEFT RIGHT ARROW WITH VERTICAL STROKE &021FA ED0C uni21FA BX05 1DS R Q\nVleftarrow LEFTWARDS ARROW WITH DOUBLE VERTICAL STROKE &021FB ED0E uni21FB BX06 1DS R Q\nVrightarrow xx22 RIGHTWARDS ARROW WITH DOUBLE VERTICAL STROKE &021FC ED0F uni21FC BX07 1DS R Q\nVleftrightarrow xx12 LEFT RIGHT ARROW WITH DOUBLE VERTICAL STROKE &021FD E242 uni21FD D9B8 1X02 BX09 1DS R loarr ISOAMSA S\leftarrowtriangle a115 LEFTWARDS OPEN-HEADED ARROW &021FE E241 uni21FE D9D9 1X03 BX0A 1DS R roarr ISOAMSA S\rightarrowtriangle a114 RIGHTWARDS OPEN-HEADED ARROW &021FF E243 uni21FF D9A9 1X04 BX0B 1DS R hoarr ISOAMSA S\leftrightarrowtriangle a116 LEFT RIGHT OPEN-HEADED ARROW 02200 uni2200 EFB5 2FO N forall ISOTECH bia P\forall forall forall forall \forall ForAll 0x2200 1 3B for all 02201 uni2201 EE69 1FN N comp ISOAMSO bid A\complement comp 0x2201 2 AD complement sign 02202 uni2202 EFBA 2FO N part ISOTECH cd6 P\partial part part \partial PartialD 0x2202 1 AD partial differential 02203 uni2203 EFB4 2FO N exist ISOTECH bib P\exists exist exist exist \exists Exists 0x2203 1 27 at least one exists 02204 uni2204 EE71 2FO N nexist ISOAMSO bic A\nexists nexist NotExists 0x2204 negated exists 02205 2205 uni2205 EF61 2FO N emptyv ISOAMSO bs1 A\varnothing Empty nullset \oslash EmptySet 0x2205 1 5B circle, slash #02205 E623 uni2205.var 22A7 DXA8 0FR N empty ISOAMSO bu0 P\emptyset empty \emptyset empty set - zero, slash 02206 uni2206 EE45 1 N N Q\increment 0x2206 Laplacian (Delta; nabla^2) 02207 uni2207 EFB9 4FA N nabla ISOTECH ce1 P\nabla nabla nabla \nabla Del 0x2207 1 3D nabla, del, Hamilton operator 02208 uni2208 DB5A 2FR R isinv ISOTECH boa P\in isin isin isin \in Element r218 0x2208 4 5B set membership, variant *02208 EDF3 uni2208.narrow EF4A 1 S Q\varin 4 7B narrow member sign 02209 uni2209 DB49 2FR R notin ISOTECH bpa P\notin notin notin notin \notin NotElement n219 0x2209 4 D3 negated set membership 0220A uni220A EF4A 2DR R isin ISOTECH Q\smallin 5 50 set membership (SMALL SET MEMBERSHIP) 0220B uni220B DB5F 2FR R niv ISOTECH bqa P\ni ni ni \ni ReverseElement r220 0x220B 4 5D contains, variant *0220B EDF4 uni220B.narrow EF4C 1 S Q\varni 4 7D narrow contains sign 0220C 220C uni220C 21F8 2FR R notni ISOTECH bra Q\nni NotReverseElement n218 0x220C 4 D5 negated contains, variant 0220D uni220D EF4C 2DR R ni ISOTECH Q\smallni SuchThat r221 5 7B /ni /owns R: contains (SMALL CONTAINS AS MEMBER) 0220E uni220E 1 N N qed Q\QED 0x220E end of proof 0220F uni220F EB67 1FL L prod ISOAMSB bjb P\prod prod prod prod \prod Product 0x220F 3 70 product operator #0220F uni220F.lgdisplay EB67 1FL L prod ISOAMSB bjb P\prod prod prod prod \prod Product 0x220F 3 70 product operator #0220F uni220F.small EB67 1FL L prod ISOAMSB bjb P\prod prod prod prod \prod Product 0x220F 3 70 product operator 02210 uni2210 22B7 1FL L coprod ISOAMSB bjc P\coprod coprod \coprod Coproduct 0x2210 coproduct operator #02210 uni2210.lgdisplay 22B7 1FL L coprod ISOAMSB bjc P\coprod coprod \coprod Coproduct 0x2210 coproduct operator #02210 uni2210.small 22B7 1FL L coprod ISOAMSB bjc P\coprod coprod \coprod Coproduct 0x2210 coproduct operator 02211 uni2211 EB66 1FL L sum ISOAMSB bja P\sum sum sum sum \sum Sum 0x2211 3 6F summation operator #02211 uni2211.lgdisplay EB66 1FL L sum ISOAMSB bja P\sum sum sum sum \sum Sum 0x2211 3 6F summation operator #02211 uni2211.small EB66 1FL L sum ISOAMSB bja P\sum sum sum sum \sum Sum 0x2211 3 6F summation operator 02212 minus EE2D 2FR B minus ISOTECH btl A\minus minus minus 0x2212 1 32 minus sign 02213 uni2213 EF7D 2FR B mnplus ISOTECH btd P\mp mnplus mnplus mnplus \mp MinusPlus 0x2213 1 37 minus-or-plus sign 02214 uni2214 EE2B 2FR B plusdo ISOAMSB btb A\dotplus plusdo plusdot 0x2214 plus sign, dot above 02215 uni2215 2DR B A\slash sol 0x2215 division slash 02216 2216 uni2216 EE3C 1DS B ssetmn ISOAMSB A\smallsetminus smallsetminus 0x2216 small set minus (cf. reverse solidus) *02216 E844 uni2216.var 005C 2X5A 2DR B setmn ISOAMSB P\setminus setmn \setminus Backslash reverse solidus; backward division 02217 uni2217 EE7D 1FS B midast ISOAMSB bk8 P\ast ast \ast 0x2217 6 70 centered asterisk +02218 2218 uni2218 EB5A 2FR B compfn ISOTECH bk9 Q\vysmwhtcircle compfn convolu bulop \circ SmallCircle 0x2218 6 2B composite function (small circle) +02218 E361 uni2218 EF67 0 S circle ISOPUB P\circ circle, white [small circle] +02218 E3B1 uni2218 EF67 0DN cir ISOPUB* P\circ cir /circ B: circle, open 02219 uni2219 1DS B Q\vysmblkcircle bull \bullet 0x2219 1 3F bullet operator +02219 uni2219 0DS B P\bullet bull \bullet 0x2219 1 3F bullet operator 0221A uni221A EF7C 1FF O radic ISOTECH bje P\sqrt radic sqrt radic \surd Sqrt 0x221A 3 CF radical #0221A uni221A.lgdisplay1 EF7C 1FF O radic ISOTECH bje P\sqrt radic sqrt radic \surd Sqrt 0x221A 3 CF radical #0221A uni221A.lgdisplay2 EF7C 1FF O radic ISOTECH bje P\sqrt radic sqrt radic \surd Sqrt 0x221A 3 CF radical #0221A uni221A.lgdisplay3 EF7C 1FF O radic ISOTECH bje P\sqrt radic sqrt radic \surd Sqrt 0x221A 3 CF radical #0221A uni221A.lgdisplay4 EF7C 1FF O radic ISOTECH bje P\sqrt radic sqrt radic \surd Sqrt 0x221A 3 CF radical #0221A uni221A.small EF7C 1FF O radic ISOTECH bje P\surd radic sqrt radic \surd Sqrt 0x221A 3 CF radical 0221B uni221B 1 Q\cuberoot 0x221B Cube root #0221B uni221B.lgdisplay1 1 Q\cuberoot 0x221B Cube root #0221B uni221B.lgdisplay2 1 Q\cuberoot 0x221B Cube root #0221B uni221B.lgdisplay3 1 Q\cuberoot 0x221B Cube root #0221B uni221B.lgdisplay4 1 Q\cuberoot 0x221B Cube root #0221B uni221B.small 1 Q\cuberoot 0x221B Cube root 0221C uni221C 1 Q\fourthroot 0x221C Fourth root #0221C uni221C.lgdisplay1 1 Q\fourthroot 0x221C Fourth root #0221C uni221C.lgdisplay2 1 Q\fourthroot 0x221C Fourth root #0221C uni221C.lgdisplay3 1 Q\fourthroot 0x221C Fourth root #0221C uni221C.lgdisplay4 1 Q\fourthroot 0x221C Fourth root #0221C uni221C.small 1 Q\fourthroot 0x221C Fourth root 0221D 221D uni221D 2279 2FR R prop ISOTECH bmz P\propto prop prop prop \propto Proportional r207 0x221D 1 7E is proportional to *0221D E847 uni221D.var EF71 5X44 DXDA 1DN R vprop ISOAMSR A\varpropto vprop r132 proportional, variant 0221E uni221E 2167 2FO N infin ISOTECH blz P\infty infin infin infin \infty Infinity 0x221E 1 60 infinity 0221F uni221F EEDD 1DS N angrt ISOTECH Q\rightangle ang90 RightAngle 0x221F 6 7A right (90 degree) angle 02220 uni2220 EF6C 1FN N ang ISOAMSO bk1 P\angle ang angupr ang \angle Angle 0x2220 6 2F angle 02221 uni2221 EF6D 1FN N angmsd ISOAMSO bk2 A\measuredangle angmsd angsph MeasuredAngle 0x2221 6 5D angle-measured 02222 2222 uni2222 EBDB 4X29 1FN N angsph ISOTECH bk3 A\sphericalangle angsph arcl SphericalAngle 0x2222 6 5C angle-spherical +02222 E5BF uni2222 4X29 1FN ltrpar bi8 H\ltrpar r212 less than, right arc 02223 2223 uni2223 EF46 2FR R mid ISOAMSR bdi P\mid mid verbar Verbar \mid VerticalBar r002 0x2223 3 75 /mid R: #02223 E301 uni2223.short 21A7 0FS R smid ISOAMSR bd6 A\shortmid smid r080 0xE92E /shortmid R: 02224 2224 uni2224 EF47 2FR R nmid ISOAMSN bei A\nmid nmid NotVerticalBar n002 0x2224 5 42 negated mid #02224 E2AA uni2224.short 21B5 0FS R nsmid ISOAMSN be6 A\nshortmid nsmid n080 0xEA2E negated short mid 02225 2225 uni2225 2142 2FR R par ISOTECH bdj P\parallel par par \parallel DoubleVerticalBar r005 0x2225 3 69 parallel #02225 E302 uni2225.short 2176 0FS R spar ISOAMSR bd7 A\shortparallel spar r119 0xE92F short parallel 02226 2226 uni2226 EF49 2FR R npar ISOAMSN bej A\nparallel npar NotDoubleVerticalBar n005 0x2226 not parallel #02226 E2AB uni2226.short 21B6 0FS R nspar ISOAMSN be7 A\nshortparallel nspar n119 0xEA2F not short parallel 02227 uni2227 22B2 2FR B and ISOTECH bin P\wedge and and \wedge And 0x2227 /wedge /land B: logical and 02228 uni2228 22B3 2FR B or ISOTECH bim P\vee or or or \vee Or 0x2228 /vee /lor B: logical or 02229 uni2229 EF56 2FR B cap ISOTECH big P\cap cap cap cap \cap 0x2229 4 3E intersection 0222A uni222A EF57 2FR B cup ISOTECH bif P\cup cup cup \cup 0x222A 4 3C union or logical sum 0222B uni222B EF75 1FL L int ISOTECH bjp P\int int int int \int Integral 0x222B 3 65 integral operator #0222B uni222B.small EF75 1FL L int ISOTECH bjp P\smallint int int int \int Integral 0x222B 3 65 integral operator #0222B uni222B.lgdisplay EF75 1FL L int ISOTECH bjp P\int int int int \int Integral 0x222B 3 65 integral operator #0222B uni222B.up EF75 1FL L int ISOTECH bjp P\int int int int \int Integral 0x222B 3 65 integral operator #0222B uni222B.upsmall EF75 1FL L int ISOTECH bjp P\smallint int int int \int Integral 0x222B 3 65 integral operator #0222B uni222B.uplgdisplay EF75 1FL L int ISOTECH bjp P\int int int int \int Integral 0x222B 3 65 integral operator 0222C uni222C 226A 1DL L Int ISOTECH A\iint intpath \doubleint 0x222C double integral operator #0222C uni222C.lgdisplay 226A 1DL L Int ISOTECH A\iint intpath \doubleint 0x222C double integral operator #0222C uni222C.small 226A 1DL L Int ISOTECH A\iint intpath \doubleint 0x222C double integral operator #0222C uni222C.up 226A 1DL L Int ISOTECH A\iint intpath \doubleint 0x222C double integral operator #0222C uni222C.uplgdisplay 226A 1DL L Int ISOTECH A\iint intpath \doubleint 0x222C double integral operator 0222D uni222D EB59 1DL L tint ISOTECH A\iiint 0x222D triple integral operator #0222D uni222D.lgdisplay EB59 1DL L tint ISOTECH A\iiint 0x222D triple integral operator #0222D uni222D.small EB59 1DL L tint ISOTECH A\iiint 0x222D triple integral operator #0222D uni222D.up EB59 1DL L tint ISOTECH A\iiint 0x222D triple integral operator #0222D uni222D.uplgdisplay EB59 1DL L tint ISOTECH A\iiint 0x222D triple integral operator 0222E uni222E EF76 1FL L conint ISOTECH bjv P\oint conint conint conint \oint ContourIntegral 0x222E 3 72 contour integral operator #0222E uni222E.lgdisplay EF76 1FL L conint ISOTECH bjv P\oint conint conint conint \oint ContourIntegral 0x222E 3 72 contour integral operator #0222E uni222E.small EF76 1FL L conint ISOTECH bjv P\oint conint conint conint \oint ContourIntegral 0x222E 3 72 contour integral operator #0222E uni222E.up EF76 1FL L conint ISOTECH bjv P\oint conint conint conint \oint ContourIntegral 0x222E 3 72 contour integral operator #0222E uni222E.uplgdisplay EF76 1FL L conint ISOTECH bjv P\oint conint conint conint \oint ContourIntegral 0x222E 3 72 contour integral operator 0222F uni222F EB36 1FL L Conint ISOTECH bjw X\oiint conint2 \csi DoubleContourIntegral 0x222F 3 74 double contour integral operator #0222F uni222F.lgdisplay EB36 1FL L Conint ISOTECH bjw X\oiint conint2 \csi DoubleContourIntegral 0x222F 3 74 double contour integral operator #0222F uni222F.small EB36 1FL L Conint ISOTECH bjw X\oiint conint2 \csi DoubleContourIntegral 0x222F 3 74 double contour integral operator #0222F uni222F.up EB36 1FL L Conint ISOTECH bjw X\oiint conint2 \csi DoubleContourIntegral 0x222F 3 74 double contour integral operator #0222F uni222F.uplgdisplay EB36 1FL L Conint ISOTECH bjw X\oiint conint2 \csi DoubleContourIntegral 0x222F 3 74 double contour integral operator 02230 uni2230 EB37 1FL L Cconint ISOTECH bjx X\oiiint 0x2230 triple contour integral operator #02230 uni2230.lgdisplay EB37 1FL L Cconint ISOTECH bjx X\oiiint 0x2230 triple contour integral operator #02230 uni2230.small EB37 1FL L Cconint ISOTECH bjx X\oiiint 0x2230 triple contour integral operator #02230 uni2230.up EB37 1FL L Cconint ISOTECH bjx X\oiiint 0x2230 triple contour integral operator #02230 uni2230.uplgdisplay EB37 1FL L Cconint ISOTECH bjx X\oiiint 0x2230 triple contour integral operator 02231 uni2231 EBC3 1FL L cwint ISOTECH bj3 Q\intclockwise 0x2231 clockwise integral #02231 uni2231.lgdisplay EBC3 1FL L cwint ISOTECH bj3 Q\intclockwise 0x2231 clockwise integral #02231 uni2231.small EBC3 1FL L cwint ISOTECH bj3 Q\intclockwise 0x2231 clockwise integral #02231 uni2231.up EBC3 1FL L cwint ISOTECH bj3 Q\intclockwise 0x2231 clockwise integral #02231 uni2231.uplgdisplay EBC3 1FL L cwint ISOTECH bj3 Q\intclockwise 0x2231 clockwise integral 02232 uni2232 EBC1 1FL L cwconint ISOTECH bj2 X\varointclockwise conintr ClockwiseContourIntegral 0x2232 contour integral, clockwise #02232 uni2232.lgdisplay EBC1 1FL L cwconint ISOTECH bj2 X\varointclockwise conintr ClockwiseContourIntegral 0x2232 contour integral, clockwise #02232 uni2232.small EBC1 1FL L cwconint ISOTECH bj2 X\varointclockwise conintr ClockwiseContourIntegral 0x2232 contour integral, clockwise #02232 uni2232.up EBC1 1FL L cwconint ISOTECH bj2 X\varointclockwise conintr ClockwiseContourIntegral 0x2232 contour integral, clockwise #02232 uni2232.uplgdisplay EBC1 1FL L cwconint ISOTECH bj2 X\varointclockwise conintr ClockwiseContourIntegral 0x2232 contour integral, clockwise 02233 uni2233 EBC2 1FL L awconint ISOTECH bj1 X\ointctrclockwise conintl CounterClockwiseContourIntegral 0x2233 contour integral, anticlockwise #02233 uni2233.lgdisplay EBC2 1FL L awconint ISOTECH bj1 X\ointctrclockwise conintl CounterClockwiseContourIntegral 0x2233 contour integral, anticlockwise #02233 uni2233.small EBC2 1FL L awconint ISOTECH bj1 X\ointctrclockwise conintl CounterClockwiseContourIntegral 0x2233 contour integral, anticlockwise #02233 uni2233.up EBC2 1FL L awconint ISOTECH bj1 X\ointctrclockwise conintl CounterClockwiseContourIntegral 0x2233 contour integral, anticlockwise #02233 uni2233.uplgdisplay EBC2 1FL L awconint ISOTECH bj1 X\ointctrclockwise conintl CounterClockwiseContourIntegral 0x2233 contour integral, anticlockwise 02234 uni2234 2168 1FN N there4 ISOTECH bru A\therefore there4 there4 there4 Therefore 0x2234 6 5B therefore 02235 uni2235 EF6F 1FN N becaus ISOTECH brt A\because becaus becaus Because 0x2235 6 7B because 02236 uni2236 EE34 2DR ratio ISOAMSR P\colon Colon r000 0x2236 6 3B ratio 02237 uni2237 EF6E 2FR Colon ISOAMSR btt A\Colon as Proportion r001 0x2237 6 3C two colons 02238 uni2238 EE3B 2FR B minusd ISOAMSB btn A\dotminus 0x2238 6 31 minus sign, dot above 02239 uni2239 D8C6 2 R excess Q\dashcolon 0x2239 excess (-:) 0223A uni223A EE64 2FR mDDot ISOAMSR btp Q\dotsminusdots mDDot 0x223A 6 34 minus with four dots, geometric properties 0223B uni223B EBC7 2FR homtht ISOAMSR bq0 A\kernelcontraction r003 0x223B homothetic 0223C 223C uni223C EE7E 2FR R sim ISOTECH bq1 P\sim sim sim \sim Tilde r162 0x223C 3 2C similar *0223C E662 uni223C.bold 2277 0FS R thksim ISOAMSR bp1?A\thicksim thicksim r129 thick similar +0223C EA25 uni223C 0DS R H\difference differ r144 difference (looks like similar, 223C?) 0223D uni223D 22BE 2FR R bsim ISOAMSR bq7 A\backsim bsim r004 0x223D reverse similar 0223E uni223E ECB6 2DR ac ISOAMSB H\ac 0x223E most positive [inverted lazy S] 0223F uni223F 1 N Q\sinewave 0x223F 5 7A Sine wave 02240 uni2240 227D 1FS B wreath ISOAMSB bsi A\wr wreath \wr VerticalTilde 0x2240 wreath product 02241 2241 uni2241 21B0 2FR R nsim ISOAMSN br1 A\nsim nsim \not\sim NotTilde 0x2241 3 EF not similar 02242 uni2242 EE68 2FR R esim ISOAMSR bkp A\eqsim eqsim bartil EqualTilde r006 0x2242 5 67 equals, similar 02243 uni2243 EF77 2FR R sime ISOTECH bq2 P\simeq sime sime sime \simeq TildeEqual r163 0x2243 3 2E similar, equals 02244 uni2244 21BF 2FR R nsime ISOAMSN br2 A\nsime nsime \not\simeq NotTildeEqual n163 0x2244 3 F1 not similar, equals 02245 uni2245 EF78 2FR R cong ISOTECH bq3 P\cong cong cong \cong TildeFullEqual r164 0x2245 3 3E congruent with 02246 uni2246 EBB7 2FR R simne ISOAMSN brz Q\simneqq n164 0x2246 similar, not equals [vert only for 9573 entity] 02247 uni2247 21CC 2FR R ncong ISOAMSN br3 A\ncong ncong \not\cong NotTildeFullEqual n166 0x2247 3 C0 not congruent with 02248 2248 uni2248 EF79 2FR R ap ISOTECH bq4 P\approx ap ap ap \approx TildeTilde r165 0x2248 3 3C approximate #02248 E306 uni2248.bold 2278 0FR R thkap ISOAMSR bp4?A\thickapprox thickapprox r069 thick approximate 02249 2249 uni2249 21C0 2FR R nap ISOAMSN br4 A\napprox napprox \not\approx NotTildeTilde n165 0x2249 3 F7 not approximate 0224A uni224A EE78 2FR R ape ISOAMSR bq5 A\approxeq ape r007 0x224A approximate, equals 0224B uni224B EB24 2FR R apid ISOAMSR bq6 H\approxident r008 0x224B approximately identical to 0224C E60C uni224C 21CB 3X09 CXA0 2fR R bcong ISOAMSR bq9 A\backcong bcong r128 ALL EQUAL TO #0224C E60D uni224C.var D9F8 1 S Q\varbackcong 0x224C all equal to (lazy S over equals) (formerly 224C; that shape changed) 0224D uni224D 2264 2FR R asymp ISOAMSR brs P\asymp asymp \asymp CupCap r009 0x224D 5 7D asymptotically equal to 0224E uni224E EE42 1FS R bump ISOAMSR brr A\Bumpeq bump bump HumpDownHump r010 0x224E 6 A4 bumpy equals 0224F uni224F EE79 1FS R bumpe ISOAMSR brp A\bumpeq bumpe bumpe HumpEqual r011 0x224F 6 B0 bumpy equals, equals 02250 uni2250 EF73 2FR R esdot ISOAMSR bqo A\doteq esdot esdot esdot \doteq DotEqual r012 0x2250 6 38 equals, single dot above 02251 uni2251 21A8 2FR R eDot ISOAMSR bqp A\Doteq eDot eDot r013 0x2251 6 37 /doteqdot /Doteq R: equals, even dots 02252 uni2252 2262 2FR R efDot ISOAMSR bqz A\fallingdotseq efDot efDot r014 0x2252 6 36 equals, falling dots 02253 uni2253 2263 2FR R erDot ISOAMSR bqy A\risingdotseq erDot erDot r015 0x2253 6 35 equals, rising dots 02254 uni2254 2254 1FS R colone ISOAMSR bqt A\coloneq colone r016 0x2254 colon, equals 02255 uni2255 2255 1FS R ecolon ISOAMSR bqu A\eqcolon ecolon r017 0x2255 equals, colon 02256 uni2256 21AA 1FS R ecir ISOAMSR bqs A\eqcirc ecir r018 0x2256 circle on equals sign 02257 uni2257 21A9 1FS R cire ISOAMSR bqn A\circeq circe r019 0x2257 circle, equals 02258 uni2258 D8C8 2DR R arceq H\arceq r133 0x2258 arc, equals; corresponds to 02259 uni2259 EE3D 2FR R wedgeq ISOTECH bqq A\wedgeq wedgeq wedgeq \cor r166 0x2259 corresponds to (wedge, equals) 0225A 225A uni225A EE3E 2FR R veeeq ISOTECH brq H\veeeq r167 0x225A logical or, equals 0225B uni225B 2DR R H\stareq r020 0x225B 6 2D STAR EQUALS 0225C uni225C 21AB 2FR R trie ISOAMSR bqr A\triangleq trie trie apprch \de r021 0x225C triangle, equals 0225D uni225D D8C9 2DR R eqdef H\eqdef r134 0x225D equals by definition 0225E uni225E D8CA 2DR R measeq H\measeq r135 0x225E measured by (m over equals) 0225F uni225F EF74 2FR R equest ISOAMSR bqm A\questeq r022 0x225F 6 30 equal with questionmark 02260 uni2260 2162 2FR R ne ISOTECH brv P\ne ne ne ne \ne NotEqual n149 0x2260 1 DE /ne /neq R: not equal +02260 E68D uni2260 2FB A ph1 T\textdoublebarslash double-barred slash (phonetic symbol) 02261 uni2261 EF72 2FR R equiv ISOTECH bqx P\equiv equiv equiv cong \equiv Congruent r168 0x2261 3 3B identical with 02262 uni2262 EE72 2FR R nequiv ISOAMSN brx A\nequiv nequiv ne3 \not\equiv NotCongruent n168 0x2262 3 F2 not identical with 02263 uni2263 EB31 2DR R Equiv H\Equiv r136 0x2263 3 3A strict equivalence (4 lines) 02264 2264 uni2264 2165 2FR R le ISOTECH bkd P\leq le lE \le LessEqual r169 0x2264 1 23 /leq /le R: less-than-or-equal 02265 2265 uni2265 2166 2FR R ge ISOTECH bmd P\geq ge gE \ge GreaterEqual r170 0x2265 1 24 /geq /ge R: greater-than-or-equal 02266 uni2266 2170 2FR R lE ISOAMSR bke A\leqq lE LessFullEqual \lid r023 0x2266 1 25 less, double equals 02267 uni2267 2171 2FR R gE ISOAMSR bme A\geqq gE GreaterFullEqual \gid r024 0x2267 1 5E greater, double equals 02268 2268 uni2268 21F2 2FR R lnE ISOAMSN ble A\lneqq lnE n019 0x2268 less, not double equals 02269 2269 uni2269 21F3 2FR R gnE ISOAMSN bne A\gneqq gnE n020 0x2269 greater, not double equals 0226A 226A uni226A 2271 1FS R bkm P\ll Lt Lt Lt \ll LessLess r137 0x226A much less than, type 2 0226B 226B uni226B 2272 1FS R bmm P\gg Gt Gt Gt \gg GreaterGreater r138 0x226B much greater than, type 2 0226C uni226C EE30 1FS R twixt ISOAMSR bln A\between twixt r025 0x226C 5 5D between 0226D uni226D 2234 1FS R nasymp brw X\nasymp \not\asymp NotCupCap n009 0x226D 5 D5 not asymptotically equal to 0226E 226E uni226E 21C9 2FR R nlt ISOAMSN bla A\nless nlt nlt NotLess n148 0x226E 1 F1 not less-than 0226F 226F uni226F 21CA 2FR R ngt ISOAMSN bna A\ngtr ngt ngt NotGreater n150 0x226F 1 F2 not greater-than 02270 2270 uni2270 21E6 3X26 2FR R nle ISOAMSN blj A\nleq nle \not\le NotLessEqual n153 0x2270 1 DC not less-than-or-equal 02271 2271 uni2271 21E7 3X27 2FR R nge ISOAMSN bnj A\ngeq nge \not\ge NotGreaterEqual n154 0x2271 1 E0 not greater-than-or-equal 02272 2272 uni2272 EE6E 2FR R lsim ISOAMSR bkf A\lesssim lsim lsim LessTilde \la r026 0x2272 1 26 less, similar 02273 2273 uni2273 EE6F 2FR R gsim ISOAMSR bmf A\gtrsim gsim gsim gsim GreaterTilde \ga r027 0x2273 1 2A greater, similar 02274 uni2274 21D9 2FR R nlsim ISOAMSN blh X\nlesssim NotLessTilde n026 0x2274 not less, similar 02275 uni2275 21DA 2FR R ngsim ISOAMSN bnh X\ngtrsim NotGreaterTilde n027 0x2275 not greater, similar 02276 uni2276 EE6C 1FS R lg ISOAMSR bki A\lessgtr lg lg LessGreater \leogr r028 0x2276 1 2B less, greater 02277 uni2277 EE6D 1FS R gl ISOAMSR bmi A\gtrless gl gl GreaterLess \grole r029 0x2277 1 5F greater, less 02278 2278 uni2278 21E8 1FS R ntlg ISOAMSN bli X\nlessgtr NotLessGreater 0x2278 not less, greater 02279 2279 uni2279 21E9 1FS R ntgl ISOAMSN bni X\ngtrless NotGreaterLess 0x2279 not greater, less 0227A uni227A 2150 1FS R pr ISOAMSR bkq P\prec pr pr \prec Precedes r030 0x227A 5 61 precedes 0227B uni227B 2151 1FS R sc ISOAMSR bmq P\succ sc sc \succ Succeeds r031 0x227B 5 73 succeeds 0227C 227C uni227C 2152 1FS R prcue ISOAMSR bku A\preccurlyeq preccurlyeq PrecedesSlantEqual r032 0x227C 5 64 precedes, curly equals 0227D 227D uni227D 2153 1FS R sccue ISOAMSR bmu A\succcurlyeq sccue SucceedsSlantEqual r033 0x227D 5 66 succeeds, curly equals 0227E 227E uni227E 21A1 1FS R prsim ISOAMSR bkr A\precsim prsim PrecedesTilde r034 0x227E precedes, similar 0227F 227F uni227F 21A2 1FS R scsim ISOAMSR bmr A\succsim scsim SucceedsTilde r035 0x227F succeeds, similar 02280 uni2280 21D0 1FS R npr ISOAMSN blq A\nprec npr \not\prec NotPrecedes n030 0x2280 5 81 not precedes 02281 uni2281 21D1 1FS R nsc ISOAMSN bnq A\nsucc nsc \not\succ NotSucceeds n031 0x2281 5 EA not succeeds 02282 uni2282 EF5B 2FR R sub ISOTECH boc P\subset sub sub sub \subset Subset r180 0x2282 4 2C subset or is implied by 02283 uni2283 EF5A 2FR R sup ISOTECH bqc P\supset sup sup sup \supset Superset r181 0x2283 4 2E superset or implies 02284 2284 uni2284 EF5F 1FS R nsub ISOAMSN bpc A\nsubset nsub sublineh \not\subset NotSubset n180 0x2284 4 F7 not subset, variant [slash negation] 02285 2285 uni2285 EF5E 1FS R nsup ISOAMSN brc A\nsupset nsup suplineh \not\supset NotSuperset n181 0x2285 4 C0 not superset, variant [slash negation] 02286 2286 uni2286 EF59 2FR R sube ISOTECH bod P\subseteq sube subuline \subseteq SubsetEqual r182 0x2286 4 23 subset, equals 02287 2287 uni2287 EF58 2FR R supe ISOTECH bqd P\supseteq supe supuline \supseteq SupersetEqual r183 0x2287 4 24 superset, equals 02288 2288 uni2288 EF5D 2FR R nsube ISOAMSN bpf A\nsubseteq nsube subNe \not\subseteq NotSubsetEqual n182 0x2288 4 DC not subset, equals 02289 2289 uni2289 EF5C 2FR R nsupe ISOAMSN brf A\nsupseteq nsupe supNe \not\supseteq NotSupersetEqual n183 0x2289 4 DD not superset, equals 0228A 228A uni228A 21C5 1FS R subne ISOAMSN bpd A\subsetneq subne n193 0x228A subset, not equals 0228B 228B uni228B 21C6 1FS R supne ISOAMSN brd A\supsetneq supne n194 0x228B superset, not equals 0228C uni228C 1 S Q\cupleftarrow 0x228C Multiset 0228D uni228D EB32 2FR B cupdot ISOAMSB A\cupdot \cupdot 0x228D union, with dot 0228E 228E uni228E 22AB 2FR B uplus ISOAMSB bil P\uplus uplus \uplus UnionPlus 0x228E xx0C plus sign in union 0228F uni228F EE52 2FR R sqsub ISOAMSR bok A\sqsubset sqsub SquareSubset r171 0x228F square subset 02290 uni2290 EE53 2FR R sqsup ISOAMSR bqk A\sqsupset sqsup SquareSuperset r172 0x2290 square superset 02291 uni2291 22B0 2FR R sqsube ISOAMSR bol P\sqsubseteq sqsube \sqsubseteq SquareSubsetEqual r173 0x2291 square subset, equals 02292 uni2292 22B1 2FR R sqsupe ISOAMSR bql P\sqsupseteq sqsupe \sqsupseteq SquareSupersetEqual r174 0x2292 square superset, equals 02293 2293 uni2293 22AE 2FR B sqcap ISOAMSB bik P\sqcap sqcap sqcap \sqcap SquareIntersection 0x2293 square intersection 02294 2294 uni2294 22AD 2FR B sqcup ISOAMSB bij P\sqcup sqcup sqcup \sqcup SquareUnion 0x2294 square union 02295 2295 uni2295 2273 2FR B oplus ISOAMSB bsr P\oplus oplus oplus oplus \oplus CirclePlus 0x2295 6 25 plus sign in circle 02296 uni2296 2274 2FR B ominus ISOAMSB bsp P\ominus ominus ominus crclbar \ominus CircleMinus 0x2296 6 2A minus sign in circle 02297 2297 uni2297 2275 2FR B otimes ISOAMSB bss P\otimes otimes otimes \otimes CircleTimes 0x2297 6 5E multiply sign in circle 02298 uni2298 2276 2FR B osol ISOAMSB bsm A\oslash osol \oslash 0x2298 solidus in circle 02299 2299 uni2299 22BD 2FR B odot ISOAMSB bso P\odot odot crcldt \odot CircleDot 0x2299 6 28 middle dot in circle 0229A uni229A 22F5 2FR B ocir ISOAMSB bsn A\circledcirc ocirc ocirc 0x229A small circle in circle 0229B uni229B 2178 1FS B oast ISOAMSB bs2 A\circledast oast oast \circast 0x229B asterisk in circle 0229C uni229C EB25 2 R oeq Q\circledequal 0x229C 6 24 equal in circle 0229D uni229D 2177 2FR B odash ISOAMSB bsl A\circleddash odash 0x229D 6 40 hyphen in circle 0229E uni229E 222F 2FR B plusb ISOAMSB bs7 A\boxplus plusb 0x229E plus sign in box 0229F uni229F 2230 2FR B minusb ISOAMSB bs6 A\boxminus minusb 0x229F minus sign in box 022A0 uni22A0 2231 2FR B timesb ISOAMSB bs8 A\boxtimes timesb timesb 0x22A0 multiply sign in box 022A1 uni22A1 2232 2DR B sdotb ISOAMSB A\boxdot sdotb sdotb sqdott \squaredot 0x22A1 6 29 /dotsquare /boxdot B: small dot in box 022A2 22A2 uni22A2 EF36 2FR R vdash ISOAMSR bds P\vdash vdash \vdash RightTee r235 0x22A2 vertical, dash 022A3 uni22A3 EF37 2FR R dashv ISOAMSR bdt P\dashv dashv \dashv LeftTee r236 0x22A3 dash, vertical 022A4 uni22A4 EE70 2FR N top ISOTECH bdq P\top top \top DownTee r214 0x22A4 6 C1 top 022A5 E363 uni22A5 22AA 0DO N bottom ISOTECH bdp P\bot bottom bottom UpTee r217 0x22A5 6 27 bottom 022A6 uni22A6 EE36 2DR R Q\assert vdash r245 0x22A6 6 A3 assertion (vertical, short dash) 022A7 uni22A7 22AC 2DR R models ISOAMSR P\models models r237 0x22A7 models (vertical, short double dash) 022A8 uni22A8 EF38 2FR R vDash ISOAMSR bdx A\vDash vDash vDash \models DoubleRightTee r238 0x22A8 vertical, double dash 022A9 uni22A9 2143 2FR R Vdash ISOAMSR bdu A\Vdash Vdash r239 0x22A9 double vertical, dash 022AA uni22AA 216F 2FR R Vvdash ISOAMSR bdw A\Vvdash Vvdash r240 0x22AA triple vertical, dash 022AB uni22AB D967 2FR R VDash ISOAMSR bdv Q\VDash r241 0x22AB double vert, double dash 022AC uni22AC 21B7 2FR R nvdash ISOAMSN bes A\nvdash nvdash n235 0x22AC not vertical, dash 022AD uni22AD 21B8 2FR R nvDash ISOAMSN bex A\nvDash nvDash n238 0x22AD not vertical, double dash 022AE uni22AE 21B9 2FR R nVdash ISOAMSN beu A\nVdash nVdash n239 0x22AE not double vertical, dash 022AF uni22AF 21BA 2FR R nVDash ISOAMSN bev A\nVDash nVDash n241 0x22AF not double vert, double dash 022B0 22B0 uni22B0 D8CC 1DS R prurel ISOAMSR H\prurel r036 0x22B0 element precedes under relation 022B1 22B1 uni22B1 D8CD 1DS R scurel H\scurel r139 0x22B1 succeeds under relation 022B2 uni22B2 EEB3 1FS R vltri ISOAMSR bi1 A\vartriangleleft vltri LeftTriangle r037 0x22B2 left triangle, open, variant 022B3 uni22B3 EEB2 1FS R vrtri ISOAMSR bi3 A\vartriangleright vrtri RightTriangle r038 0x22B3 right triangle, open, variant 022B4 uni22B4 EEEB 1FS R ltrie ISOAMSR btu A\trianglelefteq ltrie LeftTriangleEqual r039 0x22B4 left triangle, equals 022B5 uni22B5 EEEC 1FS R rtrie ISOAMSR btv A\trianglerighteq rtrie RightTriangleEqual r040 0x22B5 right triangle, equals 022B6 uni22B6 EBC5 1FS R origof ISOAMSA bpp H\origof n014 0x22B6 original of 022B7 uni22B7 EBC4 1FS R imof ISOAMSA bop H\imageof n015 0x22B7 image of 022B8 uni22B8 2253 1FS R mumap ISOAMSA boo A\multimap mumap n016 0x22B8 /multimap A: 022B9 uni22B9 DBCB 1FS hercon ISOAMSB bte Q\hermitmatrix 0x22B9 hermitian conjugate matrix 022BA uni22BA EEA1 1DS B intcal ISOAMSB P\intercal intcal 0x22BA intercal 022BB 22BB uni22BB EB7A 1FS B biw A\veebar veebar 0x22BB 3 A2 logical or, bar below (large vee); exclusive disjunction 022BC 22BC uni22BC EBB8 1FS B barwed ISOAMSB bix A\barwedge 0x22BC 3 A3 bar, wedge (large wedge) 022BD 22BD uni22BD EBB9? 1DS B barvee ISOAMSB E\barvee 0x22BD 5 39 bar, vee (large vee) +022BD E3D4 uni22BD EBB9 0 S B barvee ISOAMSB E\barvee not or (bar over small vee) 022BE 22BE uni22BE DBAA 1DS angrtvb ISOAMSO Q\measuredrightangle 0x22BE right angle-measured [with arc] 022BF uni22BF D84D 1 S Q\varlrtriangle 0x22BF RIGHT TRIANGLE 022C0 uni22C0 EFB6 1FL L xwedge ISOAMSB bjn P\bigwedge bigand \bigwedge Wedge 0x22C0 3 60 logical or operator #022C0 uni22C0.lgdisplay EFB6 1FL L xwedge ISOAMSB bjn P\bigwedge bigand \bigwedge Wedge 0x22C0 3 60 logical or operator 022C1 uni22C1 EFB7 1FL L xvee ISOAMSB bjm P\bigvee bigor \bigvee Vee 0x22C1 3 7E logical and operator #022C1 uni22C1.lgdisplay EFB7 1FL L xvee ISOAMSB bjm P\bigvee bigor \bigvee Vee 0x22C1 3 7E logical and operator 022C2 uni22C2 EE56 1FL L xcap ISOAMSB bjg P\bigcap bigcap \bigcap Intersection 0x22C2 xx2B intersection operator #022C2 uni22C2.lgdisplay EE56 1FL L xcap ISOAMSB bjg P\bigcap bigcap \bigcap Intersection 0x22C2 xx2B intersection operator 022C3 uni22C3 EE57 1FL L xcup ISOAMSB bjf P\bigcup bigcup \bigcup Union 0x22C3 xx2A union operator #022C3 uni22C3.lgdisplay EE57 1FL L xcup ISOAMSB bjf P\bigcup bigcup \bigcup Union 0x22C3 xx2A union operator 022C4 uni22C4 21AF 1DS B diam ISOAMSB Q\smwhtdiamond diam Diamond 0x22C4 white diamond =022C4 uni22C4 21AF 0DS B diam ISOAMSB A\diamond diam Diamond 0x22C4 white diamond 022C5 uni22C5 EEB4 1FS B sdot ISOAMSB bsc P\cdot sdot sdot \cdot 0x22C5 small middle dot 022C5 uni22C5 EEB4 1FS B sdot ISOAMSB bsc Q\tnyblkcircle sdot sdot \cdot 0x22C5 small middle dot +022C6 uni22C6 226D 0FS B sstarf ISOAMSB bl0 P\star sstarf sstarf \star Star 0x22C6 small star, filled, low 022C7 uni22C7 EE3F 1FS B divonx ISOAMSB btf A\divideontimes divonx 0x22C7 division on times 022C8 uni22C8 226C 1FS R bowtie ISOAMSR bsf A\bowtie bowtie bowtie \bowtie r041 0x22C8 bowtie 022C9 uni22C9 EED6 1FS B ltimes ISOAMSB bsd A\ltimes ltimes ltimes 0x22C9 times sign, left closed 022CA uni22CA EED7 1FS B rtimes ISOAMSB bse A\rtimes rtimes rtimes 0x22CA times sign, right closed 022CB uni22CB EED8 1FS B lthree ISOAMSB bsh A\leftthreetimes lthree 0x22CB left semidirect product 022CC uni22CC EED9 1FS B rthree ISOAMSB bsg A\rightthreetimes rthree 0x22CC right semidirect product 022CD uni22CD EEFD 1FS R bsime ISOAMSR bq8 A\backsimeq bsime r042 0x22CD reverse similar, equals 022CE uni22CE EEEA 1FS B cuvee ISOAMSB biv A\curlyvee cuvee 0x22CE curly logical or 022CF uni22CF EEE9 1FS B cuwed ISOAMSB biu A\curlywedge cuwed 0x22CF curly logical and 022D0 uni22D0 215E 1FS R Sub ISOAMSR boj A\Subset Sub r178 0x22D0 4 21 double subset 022D1 uni22D1 215F 1FS R Sup ISOAMSR bqj A\Supset Sup r179 0x22D1 4 40 double superset 022D2 uni22D2 EE62 1FS B Cap ISOAMSB bii A\Cap Cap 0x22D2 /Cap /doublecap B: double intersection 022D3 uni22D3 EE63 1FS B Cup ISOAMSB bih A\Cup Cup 0x22D3 /Cup /doublecup B: double union 022D4 uni22D4 21AC 1FS R fork ISOAMSR bm3 A\pitchfork fork r043 0x22D4 pitchfork 022D5 uni22D5 DB4F 1 S epar ISOTECH Q\equalparallel r151 0x22D5 3 27 parallel, equal; equal or parallel 022D6 uni22D6 2140 2FR R ltdot ISOAMSR bko A\lessdot ldot r044 0x22D6 5 41 less than, with dot 022D7 uni22D7 2141 2FR R gtdot ISOAMSR bmo A\gtrdot gdot r045 0x22D7 5 53 greater than, with dot 022D8 uni22D8 2146 1FS R Ll ISOAMSR bkn A\lll Ll r046 0x22D8 /Ll /lll /llless R: triple less-than 022D9 uni22D9 2147 1FS R Gg ISOAMSR bmn A\ggg Gg r047 0x22D9 /ggg /Gg /gggtr R: triple greater-than 022DA 22DA uni22DA 214E 1FS R leg ISOAMSR bkj A\lesseqgtr leg LessEqualGreater r048 0x22DA 5 63 less, equals, greater 022DB 22DB uni22DB 214F 1FS R gel ISOAMSR bmj A\gtreqless gel GreaterEqualLess r049 0x22DB 5 78 greater, equals, less 022DC 22DC uni22DC D922 2DR R el ISOAMSR H\eqless r050 0x22DC equal-or-less 022DD 22DD uni22DD DBFE 2DR R eg ISOAMSR H\eqgtr r051 0x22DD equal-or-greater 022DE uni22DE 2154 1FS R cuepr ISOAMSR bkv A\curlyeqprec cuepr r052 0x22DE curly equals, precedes 022DF uni22DF 2155 1FS R cuesc ISOAMSR bmv A\curlyeqsucc cuesc r053 0x22DF curly equals, succeeds 022E0 uni22E0 21D6 1DS R nprcue ISOAMSN Q\npreccurlyeq NotPrecedesSlantEqual n032 0x22E0 5 EB not precedes, curly equals 022E1 uni22E1 D972 1DS R nsccue ISOAMSN Q\nsucccurlyeq NotSucceedsSlantEqual n033 0x22E1 5 EC not succeeds, curly equals 022E2 uni22E2 21EE 1FS R nsqsube ISOAMSN bpl Q\nsqsubseteq \not\sqsubseteq NotSquareSubsetEqual n173 0x22E2 not, square subset, equals 022E3 uni22E3 21EF 1FS R nsqsupe ISOAMSN brl Q\nsqsupseteq \not\sqsupseteq NotSquareSupersetEqual n174 0x22E3 not, square superset, equals 022E4 uni22E4 D8D0 1FS R sqsubne bpm Q\sqsubsetneq n195 0x22E4 square subset, not equals 022E5 uni22E5 D8D1 1FS R sqsupne brm Q\sqsupsetneq n196 0x22E5 square superset, not equals 022E6 uni22E6 21E4 1FS R lnsim ISOAMSN blf A\lnsim lnsim n017 0x22E6 less, not similar 022E7 uni22E7 21E5 1FS R gnsim ISOAMSN bnf A\gnsim gnsim n018 0x22E7 greater, not similar 022E8 22E8 uni22E8 21B1 1FS R prnsim ISOAMSN blr A\precnsim prnsim n034 0x22E8 precedes, not similar 022E9 22E9 uni22E9 21B2 1FS R scnsim ISOAMSN bnr A\succnsim scnsim n035 0x22E9 succeeds, not similar 022EA uni22EA 21BB 1FS R nltri ISOAMSN bi4 A\ntriangleleft nltri NotLeftTriangle n146 0x22EA not left triangle 022EB uni22EB 21BC 1FS R nrtri ISOAMSN bi2 A\ntriangleright nrtri NotRightTriangle n147 0x22EB not right triangle 022EC 22EC uni22EC 21BD 1FS R nltrie ISOAMSN btw A\ntrianglelefteq nltrie NotLeftTriangleEqual n038 0x22EC not left triangle, equals 022ED 22ED uni22ED 21BE 1FS R nrtrie ISOAMSN btx A\ntrianglerighteq nrtrie NotRightTriangleEqual n040 0x22ED not right triangle, equals 022EE uni22EE 2F2B 2FO vellip ISOPUB bel P\vdots vellip elipd \vdots VerticalEllipsis 0x22EE 6 3A vertical ellipsis 022EF uni22EF DB48 2FO ctdot ISOTECH bn9 P\cdots cdots cellip \cdots CenterEllipsis 0x22EF three dots, centered 022F0 uni22F0 DB7B 2FO utdot ISOTECH bo9 Y\adots soldotl AscendingEllipsis 0x22F0 three dots, ascending 022F1 uni22F1 DB4C 2FO dtdot ISOTECH bp9 P\ddots ddots soldotr \ddots Continuation 0x22F1 three dots, descending &022F2 E3A0 uni22F2 DB4A 2X00 CX00 1DS R disin ISOTECH H\disin r228 ELEMENT OF WITH LONG HORIZONTAL STROKE &022F3 E3A2 uni22F3 DB59 2X02 CX01 1 S R isinsv ISOTECH Q\varisins r222 ELEMENT OF WITH VERTICAL BAR AT END OF HORIZONTAL STROKE &022F4 E3A4 uni22F4 DB58 2X01 CX02 1DS R isins ISOTECH H\isins r224 SMALL ELEMENT OF WITH VERTICAL BAR AT END OF HORIZONTAL STROKE &022F5 E39C uni22F5 DB56 2X03 CX03 1DS R isindot ISOTECH H\isindot r226 ELEMENT OF WITH DOT ABOVE &022F6 E37C uni22F6 DB64 2X08 CX04 1 S R notinvc ISOTECH Q\varisinobar n212 ELEMENT OF WITH OVERBAR &022F7 E37B uni22F7 22BA 2X07 CX05 1 S R notinvb ISOTECH Q\isinobar n230 0xE912 5 35 SMALL ELEMENT OF WITH OVERBAR &022F8 E3B8 uni22F8 DB37 2X04 CX06 1DS R isinvb H\isinvb r130 ELEMENT OF WITH UNDERBAR &022F9 E39E uni22F9 DB57 2X0A CX0C 1DS R isinE ISOTECH H\isinE r227 ELEMENT OF WITH TWO HORIZONTAL STROKES &022FA E3A1 uni22FA DB5E 2X0D CX0E 1DS R nisd ISOTECH H\nisd r229 CONTAINS WITH LONG HORIZONTAL STROKE &022FB E3A3 uni22FB DB7E 2X0F CX0F 1 S R xnis ISOTECH Q\varnis r223 CONTAINS WITH VERTICAL BAR AT END OF HORIZONTAL STROKE &022FC E3A5 uni22FC DB5D 2X0E CX10 1DS R nis ISOTECH H\nis r225 SMALL CONTAINS WITH VERTICAL BAR AT END OF HORIZONTAL STROKE &022FD E37E uni22FD DB66 2X12 CX11 1 S R notnivc ISOTECH Q\varniobar n231 CONTAINS WITH OVERBAR &022FE E37D uni22FE DB65 2X11 CX12 1 S R notnivb ISOTECH Q\niobar 0xE90A 5 36 SMALL CONTAINS WITH OVERBAR &022FF EAAC uni22FF CX17 1DS R Q\bagmember xx0A Z NOTATION BAG MEMBERSHIP +02300 2205 uni2300 EF61 1DS diameter W\diameter diameter Diameter \diameter diameter sign 02302 uni2302 2 Q\house 0x2302 House 02305 22BC uni2305 EECA 1DS B Q\varbarwedge barwed 0x2305 /barwedge B: logical and, bar above [projective (bar over small wedge)] 02306 2306 uni2306 EEDA 1DS B Q\vardoublebarwedge Barwed 0x2306 /doublebarwedge B: logical and, double bar above [perspective (double bar over small wedge)] 02308 uni2308 EFB0 1FF O lceil ISOAMSC bd2 P\lceil lceil ceill \lceil LeftCeiling 0x2308 left ceiling #02308 uni2308.lgdisplay1 EFB0 1FF O lceil ISOAMSC bd2 P\lceil lceil ceill \lceil LeftCeiling 0x2308 left ceiling #02308 uni2308.lgdisplay2 EFB0 1FF O lceil ISOAMSC bd2 P\lceil lceil ceill \lceil LeftCeiling 0x2308 left ceiling #02308 uni2308.lgdisplay3 EFB0 1FF O lceil ISOAMSC bd2 P\lceil lceil ceill \lceil LeftCeiling 0x2308 left ceiling #02308 uni2308.lgdisplay4 EFB0 1FF O lceil ISOAMSC bd2 P\lceil lceil ceill \lceil LeftCeiling 0x2308 left ceiling 02309 uni2309 EFB1 1FF C rceil ISOAMSC be2 P\rceil rceil ceilr \rceil RightCeiling 0x2309 right ceiling #02309 uni2309.lgdisplay1 EFB1 1FF C rceil ISOAMSC be2 P\rceil rceil ceilr \rceil RightCeiling 0x2309 right ceiling #02309 uni2309.lgdisplay2 EFB1 1FF C rceil ISOAMSC be2 P\rceil rceil ceilr \rceil RightCeiling 0x2309 right ceiling #02309 uni2309.lgdisplay3 EFB1 1FF C rceil ISOAMSC be2 P\rceil rceil ceilr \rceil RightCeiling 0x2309 right ceiling #02309 uni2309.lgdisplay4 EFB1 1FF C rceil ISOAMSC be2 P\rceil rceil ceilr \rceil RightCeiling 0x2309 right ceiling 0230A uni230A EFB2 1FF O lfloor ISOAMSC bd1 P\lfloor lfloor floorl \lfloor LeftFloor 0x230A left floor #0230A uni230A.lgdisplay1 EFB2 1FF O lfloor ISOAMSC bd1 P\lfloor lfloor floorl \lfloor LeftFloor 0x230A left floor #0230A uni230A.lgdisplay2 EFB2 1FF O lfloor ISOAMSC bd1 P\lfloor lfloor floorl \lfloor LeftFloor 0x230A left floor #0230A uni230A.lgdisplay3 EFB2 1FF O lfloor ISOAMSC bd1 P\lfloor lfloor floorl \lfloor LeftFloor 0x230A left floor #0230A uni230A.lgdisplay4 EFB2 1FF O lfloor ISOAMSC bd1 P\lfloor lfloor floorl \lfloor LeftFloor 0x230A left floor 0230B uni230B EFB3 1FF C rfloor ISOAMSC be1 P\rfloor rfloor floorr \rfloor RightFloor 0x230B right floor #0230B uni230B.lgdisplay1 EFB3 1FF C rfloor ISOAMSC be1 P\rfloor rfloor floorr \rfloor RightFloor 0x230B right floor #0230B uni230B.lgdisplay2 EFB3 1FF C rfloor ISOAMSC be1 P\rfloor rfloor floorr \rfloor RightFloor 0x230B right floor #0230B uni230B.lgdisplay3 EFB3 1FF C rfloor ISOAMSC be1 P\rfloor rfloor floorr \rfloor RightFloor 0x230B right floor #0230B uni230B.lgdisplay4 EFB3 1FF C rfloor ISOAMSC be1 P\rfloor rfloor floorr \rfloor RightFloor 0x230B right floor %0230C uni230C EE28 1D1 F drcrop ISOPUB E\drcrop drcrop downward right crop mark %0230D uni230D EE29 1D1 F dlcrop ISOPUB E\dlcrop dlcrop downward left crop mark %0230E uni230E EE26 1D1 F urcrop ISOPUB E\urcrop urcrop upward right crop mark %0230F uni230F EE27 1D1 F ulcrop ISOPUB E\ulcrop ulcrop upward left crop mark 02310 uni2310 EE6A 2DO bnot ISOTECH H\invnot 0x2310 reverse not 02311 uni2311 EE46 1DS Q\sqlozenge loz square lozenge 02312 uni2312 EE4C 1 N profline ISOTECH E\profline profile of a line 02313 uni2313 EE4D 1 N profsurf ISOTECH E\profsurf profile of a surface %02315 uni2315 EB5F 1DN telrec ISOPUB W\recorder telrec telephone recorder symbol %02316 uni2316 EE4F 1FN target ISOPUB bs4 Q\target target 0x2316 register mark or target; position 02317 uni2317 D8D4 1 Q\viewdata VIEWDATA SQUARE %02318 uni2318 EB29 1DN Q\cloverleaf CloverLeaf cloverleaf [command key] 02319 2319 uni2319 F0C9 2DO H\turnednot turned not sign %0231A uni231A 1DN Q\watchicon WatchIcon watch icon 0231C uni231C 22F1 1FF O ulcorn ISOAMSC bd4 A\ulcorner ulcorn 0x231C upper left corner 0231D uni231D 22F2 1FF C urcorn ISOAMSC be4 A\urcorner urcorn 0x231D upper right corner 0231E uni231E 22F3 1FF O dlcorn ISOAMSC bd3 A\llcorner dlcorn 0x231E lower left corner 0231F uni231F 22F4 1FF C drcorn ISOAMSC be3 A\lrcorner drcorn 0x231F lower right corner 02320 uni2320 0 Q\inttop 0x2320 Top half integral 02321 uni2321 0 Q\intbottom 0x2321 Bottom half integral 02322 2322 uni2322 223F 1FS R frown ISOAMSR bm2 P\frown frown frown \frown Cap r054 0x2322 down curve #02322 E843 uni2322.small 21A6 2DR R sfrown ISOAMSR A\smallfrown sfrown r131 small down curve 02323 2323 uni2323 226F 1FS R smile ISOAMSR bm1 P\smile smile smile \smile Cup r055 0x2323 up curve #02323 E303 uni2323.small 21A5 2DR R ssmile ISOAMSR A\smallsmile ssmile r068 small up curve =02329 27E8 uni2329 0 Q\clangle left angle bracket =0232A 27E9 uni232A 0 Q\crangle right angle bracket \0232C G054 uni232C 1 N benzeno ISOCHEM Q\varhexagonlrbonds six carbon ring, corner down, double bonds lower right etc %0232D uni232D EE4B 1 N cylcty ISOTECH E\cylcty cylindricity %0232E uni232E EE4E 1 N profalar ISOTECH E\profalar all-around profile 02332 uni2332 D878 1 N Q\conictaper conical taper 02336 uni2336 EED3 2DR topbot ISOTECH Q\topbot r216 0x2336 top and bottom 0233D uni233D EEC3 5X07 2DR B ovbar ISOAMSB S\obar cirbarv vbarcir circle with vertical bar 0233F uni233F EEC8 2DR R solbar ISOAMSN Q\APLnotslash solidus, bar through (APL FUNCTIONAL SYMBOL SLASH BAR) \02340 uni2340 1 Q\APLnotbackslash APL FUNCTIONAL SYMBOL BACKSLASH BAR 02353 uni2353 1 N Q\APLboxupcaret 0x2353 Boxed up caret 02370 uni2370 1 N Q\APLboxquestion 0x2370 Boxed question mark &0237C E248 uni237C D97C 1X45 BX56 1DN angzarr ISOAMSA H\rangledownzigzagarrow a209 RIGHT ANGLE WITH DOWNWARDS ZIGZAG ARROW %02393 uni2393 1FN Q\dircurrent line over dashed line (direct current symbol form 2) 02394 G053 uni2394 1FN N hbenzen ISOCHEM bo2 W\hexagon hexa horizontal benzene ring [hexagon flat open] &0239B uni239B 0DF Q\lparenuend LEFT PARENTHESIS UPPER HOOK &0239C uni239C 0DF Q\lparenextender LEFT PARENTHESIS EXTENSION &0239D uni239D 0DF Q\lparenlend LEFT PARENTHESIS LOWER HOOK &0239E uni239E 0DF Q\rparenuend RIGHT PARENTHESIS UPPER HOOK &0239F uni239F 0DF Q\rparenextender RIGHT PARENTHESIS EXTENSION &023A0 uni23A0 0DF Q\rparenlend RIGHT PARENTHESIS LOWER HOOK &023A1 uni23A1 0DF Q\lbrackuend LEFT SQUARE BRACKET UPPER CORNER &023A2 uni23A2 0DF Q\lbrackextender LEFT SQUARE BRACKET EXTENSION &023A3 uni23A3 0DF Q\lbracklend LEFT SQUARE BRACKET LOWER CORNER &023A4 uni23A4 0DF Q\rbrackuend RIGHT SQUARE BRACKET UPPER CORNER &023A5 uni23A5 0DF Q\rbrackextender RIGHT SQUARE BRACKET EXTENSION &023A6 uni23A6 0DF Q\rbracklend RIGHT SQUARE BRACKET LOWER CORNER &023A7 uni23A7 0DF Q\lbraceuend LEFT CURLY BRACKET UPPER HOOK &023A8 uni23A8 0DF Q\lbracemid LEFT CURLY BRACKET MIDDLE PIECE &023A9 uni23A9 0DF Q\lbracelend LEFT CURLY BRACKET LOWER HOOK &023AA uni23AA 0DF Q\vbraceextender CURLY BRACKET EXTENSION &023AB uni23AB 0DF Q\rbraceuend RIGHT CURLY BRACKET UPPER HOOK &023AC uni23AC 0DF Q\rbracemid RIGHT CURLY BRACKET MIDDLE PIECE &023AD uni23AD 0DF Q\rbracelend RIGHT CURLY BRACKET LOWER HOOK &023AE uni23AE 0 F Q\intextender INTEGRAL EXTENSION &023AF uni23AF 0 F Q\hlineextender HORIZONTAL LINE EXTENSION &023B0 E294 uni23B0 EEE7 4X2C DX80 1DF lmoust ISOAMSC P\lmoustache \lmoustache UPPER LEFT OR LOWER RIGHT CURLY BRACKET SECTION &023B1 E293 uni23B1 EEE8 4X2B DX7F 1DF rmoust ISOAMSC P\rmoustache \rmoustache UPPER RIGHT OR LOWER LEFT CURLY BRACKET SECTION &023B2 uni23B2 0 F Q\sumtop SUMMATION TOP &023B3 uni23B3 0 F Q\sumbottom SUMMATION BOTTOM &023B4 E2EF uni23B4 2F31 7X1A AX25 2 D tbrk ISOAMSO M\overbracket OverBracket TOP SQUARE BRACKET #023B4 F614 uni23B4.size1 4X32 DX81 1DF ovrbrk M\overbracket OverBracket over bracket #023B4 F614 uni23B4.size2 4X32 DX81 1DF ovrbrk M\overbracket OverBracket over bracket #023B4 F614 uni23B4.size3 4X32 DX81 1DF ovrbrk M\overbracket OverBracket over bracket #023B4 F614 uni23B4.size4 4X32 DX81 1DF ovrbrk M\overbracket OverBracket over bracket #023B4 F614 uni23B4.size5 4X32 DX81 1DF ovrbrk M\overbracket OverBracket over bracket &023B5 E2EE uni23B5 2F32 7X1B AX26 2 D bbrk ISOAMSO M\underbracket UnderBracket BOTTOM SQUARE BRACKET #023B5 F615 uni23B5.size1 4X33 DX82 1DF udrbrk M\underbracket UnderBracket under bracket #023B5 F615 uni23B5.size2 4X33 DX82 1DF udrbrk M\underbracket UnderBracket under bracket #023B5 F615 uni23B5.size3 4X33 DX82 1DF udrbrk M\underbracket UnderBracket under bracket #023B5 F615 uni23B5.size4 4X33 DX82 1DF udrbrk M\underbracket UnderBracket under bracket #023B5 F615 uni23B5.size5 4X33 DX82 1DF udrbrk M\underbracket UnderBracket under bracket &023B6 E2F0 uni23B6 DBAC 7X1C AX27 2 O bbrktbrk ISOAMSO E\bbrktbrk BOTTOM SQUARE BRACKET OVER TOP SQUARE BRACKET &023B7 uni23B7 0 Q\sqrtbottom RADICAL SYMBOL BOTTOM &023B8 uni23B8 0 Q\lvboxline LEFT VERTICAL BOX LINE &023B9 uni23B9 0 Q\rvboxline RIGHT VERTICAL BOX LINE &023CE uni23CE 1 S Q\varcarriagereturn RETURN SYMBOL X023DC uni23DC 4X30 1DF ovrpar Q\overparen OverParenthesis TOP PARENTHESIS (mathematical use) #023DC uni23DC.size1 4X30 1DF ovrpar Q\overparen OverParenthesis TOP PARENTHESIS (mathematical use) #023DC uni23DC.size2 4X30 1DF ovrpar Q\overparen OverParenthesis TOP PARENTHESIS (mathematical use) #023DC uni23DC.size3 4X30 1DF ovrpar Q\overparen OverParenthesis TOP PARENTHESIS (mathematical use) #023DC uni23DC.size4 4X30 1DF ovrpar Q\overparen OverParenthesis TOP PARENTHESIS (mathematical use) #023DC uni23DC.size5 4X30 1DF ovrpar Q\overparen OverParenthesis TOP PARENTHESIS (mathematical use) X023DD uni23DD 4X31 1DF udrpar Q\underparen UnderParenthesis BOTTOM PARENTHESIS (mathematical use) #023DD uni23DD.size1 4X31 1DF udrpar Q\underparen UnderParenthesis BOTTOM PARENTHESIS (mathematical use) #023DD uni23DD.size2 4X31 1DF udrpar Q\underparen UnderParenthesis BOTTOM PARENTHESIS (mathematical use) #023DD uni23DD.size3 4X31 1DF udrpar Q\underparen UnderParenthesis BOTTOM PARENTHESIS (mathematical use) #023DD uni23DD.size4 4X31 1DF udrpar Q\underparen UnderParenthesis BOTTOM PARENTHESIS (mathematical use) #023DD uni23DD.size5 4X31 1DF udrpar Q\underparen UnderParenthesis BOTTOM PARENTHESIS (mathematical use) X023DE uni23DE 4X34 1DF ovrcub P\overbrace \overbrace OverBrace TOP CURLY BRACKET (mathematical use) #023DE uni23DE.size1 4X34 1DF ovrcub P\overbrace \overbrace OverBrace TOP CURLY BRACKET (mathematical use) #023DE uni23DE.size2 4X34 1DF ovrcub P\overbrace \overbrace OverBrace TOP CURLY BRACKET (mathematical use) #023DE uni23DE.size3 4X34 1DF ovrcub P\overbrace \overbrace OverBrace TOP CURLY BRACKET (mathematical use) #023DE uni23DE.size4 4X34 1DF ovrcub P\overbrace \overbrace OverBrace TOP CURLY BRACKET (mathematical use) #023DE uni23DE.size5 4X34 1DF ovrcub P\overbrace \overbrace OverBrace TOP CURLY BRACKET (mathematical use) X023DF uni23DF 4X35 1DF udrcub P\underbrace \underbrace UnderBrace BOTTOM CURLY BRACKET (mathematical use) #023DF uni23DF.size1 4X35 1DF udrcub P\underbrace \underbrace UnderBrace BOTTOM CURLY BRACKET (mathematical use) #023DF uni23DF.size2 4X35 1DF udrcub P\underbrace \underbrace UnderBrace BOTTOM CURLY BRACKET (mathematical use) #023DF uni23DF.size3 4X35 1DF udrcub P\underbrace \underbrace UnderBrace BOTTOM CURLY BRACKET (mathematical use) #023DF uni23DF.size4 4X35 1DF udrcub P\underbrace \underbrace UnderBrace BOTTOM CURLY BRACKET (mathematical use) #023DF uni23DF.size5 4X35 1DF udrcub P\underbrace \underbrace UnderBrace BOTTOM CURLY BRACKET (mathematical use) X023E0 uni23E0 1DF Q\obrbrak TOP TORTOISE SHELL BRACKET (mathematical use) #023E0 uni23E0.size1 1DF Q\obrbrak TOP TORTOISE SHELL BRACKET (mathematical use) #023E0 uni23E0.size2 1DF Q\obrbrak TOP TORTOISE SHELL BRACKET (mathematical use) #023E0 uni23E0.size3 1DF Q\obrbrak TOP TORTOISE SHELL BRACKET (mathematical use) X023E1 uni23E1 1DF Q\ubrbrak BOTTOM TORTOISE SHELL BRACKET (mathematical use) #023E1 uni23E1.size1 1DF Q\ubrbrak BOTTOM TORTOISE SHELL BRACKET (mathematical use) #023E1 uni23E1.size2 1DF Q\ubrbrak BOTTOM TORTOISE SHELL BRACKET (mathematical use) #023E1 uni23E1.size3 1DF Q\ubrbrak BOTTOM TORTOISE SHELL BRACKET (mathematical use) W023E2 E2EC uni23E2 DBB8 7X41 DXF5 1 N N trpezium ISOAMSO Q\trapezium WHITE TRAPEZIUM W023E3 E43B uni23E3 D8DC 1dN N benzenr ISOCHEM E\benzenr BENZENE RING WITH CIRCLE W023E4 E380 uni23E4 EE49 1 N N strns ISOTECH E\strns STRAIGHTNESS W023E5 E381 uni23E5 EE4A 1 N N fltns ISOTECH E\fltns FLATNESS W023E6 E3A6 uni23E6 DB3B 1 N N acd ISOTECH Q\accurrent AC CURRENT W023E7 E3A7 uni23E7 DB4E 1 N N elinters ISOTECH E\elinters ELECTRICAL INTERSECTION %02422 uni2422 0 C\textblank BLANK SYMBOL %02423 E4F9 uni2423 F0FE 1DN N blank ISOPUB L\textvisiblespace blank SpaceIndicator 0x2423 space indicator 02460 uni2460 EFD1 2DO N Q\circledone CIRCLED DIGIT ONE 02461 uni2461 EFD2 2DO N Q\circledtwo CIRCLED DIGIT TWO 02462 uni2462 EFD3 2DO N Q\circledthree CIRCLED DIGIT THREE 02463 uni2463 EFD4 2DO N Q\circledfour CIRCLED DIGIT FOUR 02464 uni2464 EFD5 2DO N Q\circledfive CIRCLED DIGIT FIVE 02465 uni2465 EFD6 2DO N Q\circledsix CIRCLED DIGIT SIX 02466 uni2466 EFD7 2DO N Q\circledseven CIRCLED DIGIT SEVEN 02467 uni2467 EFD8 2DO N Q\circledeight CIRCLED DIGIT EIGHT 02468 uni2468 EFD9 2DO N Q\circlednine CIRCLED DIGIT NINE 024B6 uni24B6 7641 2DO N Q\circledA CIRCLED LATIN CAPITAL LETTER A 024B7 uni24B7 7642 2DO N Q\circledB CIRCLED LATIN CAPITAL LETTER B 024B8 uni24B8 7643 2DO N Q\circledC CIRCLED LATIN CAPITAL LETTER C 024B9 uni24B9 7644 2DO N Q\circledD CIRCLED LATIN CAPITAL LETTER D 024BA uni24BA 7645 2DO N Q\circledE CIRCLED LATIN CAPITAL LETTER E 024BB uni24BB 7646 2DO N Q\circledF CIRCLED LATIN CAPITAL LETTER F 024BC uni24BC 7647 2DO N Q\circledG CIRCLED LATIN CAPITAL LETTER G 024BD uni24BD 7648 2DO N Q\circledH CIRCLED LATIN CAPITAL LETTER H 024BE uni24BE 7649 2DO N Q\circledI CIRCLED LATIN CAPITAL LETTER I 024BF uni24BF 764A 2DO N Q\circledJ CIRCLED LATIN CAPITAL LETTER J 024C0 uni24C0 764B 2DO N Q\circledK CIRCLED LATIN CAPITAL LETTER K 024C1 uni24C1 764C 2DO N Q\circledL CIRCLED LATIN CAPITAL LETTER L 024C2 uni24C2 764D 2DO N Q\circledM CIRCLED LATIN CAPITAL LETTER M 024C3 uni24C3 764E 2DO N Q\circledN CIRCLED LATIN CAPITAL LETTER N 024C4 uni24C4 764F 2DO N Q\circledO CIRCLED LATIN CAPITAL LETTER O 024C5 uni24C5 7650 2DO N Q\circledP CIRCLED LATIN CAPITAL LETTER P 024C6 uni24C6 7651 2DO N Q\circledQ CIRCLED LATIN CAPITAL LETTER Q 024C7 uni24C7 7652 2DO N Q\circledR CIRCLED LATIN CAPITAL LETTER R 024C8 uni24C8 7653 2DO N oS ISOAMSO A\circledS circS oS \circS 0x24C8 capital S in circle 024C9 uni24C9 7654 2DO N Q\circledT CIRCLED LATIN CAPITAL LETTER T 024CA uni24CA 7655 2DO N Q\circledU CIRCLED LATIN CAPITAL LETTER U 024CB uni24CB 7656 2DO N Q\circledV CIRCLED LATIN CAPITAL LETTER V 024CC uni24CC 7657 2DO N Q\circledW CIRCLED LATIN CAPITAL LETTER W 024CD uni24CD 7658 2DO N Q\circledX CIRCLED LATIN CAPITAL LETTER X 024CE uni24CE 7659 2DO N Q\circledY CIRCLED LATIN CAPITAL LETTER Y 024CF uni24CF 765A 2DO N Q\circledZ CIRCLED LATIN CAPITAL LETTER Z 024D0 uni24D0 7661 2DO N Q\circleda CIRCLED LATIN SMALL LETTER A 024D1 uni24D1 7662 2DO N Q\circledb CIRCLED LATIN SMALL LETTER B 024D2 uni24D2 7663 2DO N Q\circledc CIRCLED LATIN SMALL LETTER C 024D3 uni24D3 7664 2DO N Q\circledd CIRCLED LATIN SMALL LETTER D 024D4 uni24D4 7665 2DO N Q\circlede CIRCLED LATIN SMALL LETTER E 024D5 uni24D5 7666 2DO N Q\circledf CIRCLED LATIN SMALL LETTER F 024D6 uni24D6 7667 2DO N Q\circledg CIRCLED LATIN SMALL LETTER G 024D7 uni24D7 7668 2DO N Q\circledh CIRCLED LATIN SMALL LETTER H 024D8 uni24D8 7669 2DO N Q\circledi CIRCLED LATIN SMALL LETTER I 024D9 uni24D9 766A 2DO N Q\circledj CIRCLED LATIN SMALL LETTER J 024DA uni24DA 766B 2DO N Q\circledk CIRCLED LATIN SMALL LETTER K 024DB uni24DB 766C 2DO N Q\circledl CIRCLED LATIN SMALL LETTER L 024DC uni24DC 766D 2DO N Q\circledm CIRCLED LATIN SMALL LETTER M 024DD uni24DD 766E 2DO N Q\circledn CIRCLED LATIN SMALL LETTER N 024DE uni24DE 766F 2DO N Q\circledo CIRCLED LATIN SMALL LETTER O 024DF uni24DF 7670 2DO N Q\circledp CIRCLED LATIN SMALL LETTER P 024E0 uni24E0 7671 2DO N Q\circledq CIRCLED LATIN SMALL LETTER Q 024E1 uni24E1 7672 2DO N Q\circledr CIRCLED LATIN SMALL LETTER R 024E2 uni24E2 7673 2DO N Q\circleds CIRCLED LATIN SMALL LETTER S 024E3 uni24E3 7674 2DO N Q\circledt CIRCLED LATIN SMALL LETTER T 024E4 uni24E4 7675 2DO N Q\circledu CIRCLED LATIN SMALL LETTER U 024E5 uni24E5 7676 2DO N Q\circledv CIRCLED LATIN SMALL LETTER V 024E6 uni24E6 7677 2DO N Q\circledw CIRCLED LATIN SMALL LETTER W 024E7 uni24E7 7678 2DO N Q\circledx CIRCLED LATIN SMALL LETTER X 024E8 uni24E8 7679 2DO N Q\circledy CIRCLED LATIN SMALL LETTER Y 024E9 uni24E9 767A 2DO N Q\circledz CIRCLED LATIN SMALL LETTER Z 024EA uni24EA 76BC 2DO N Q\circledzero CIRCLED DIGIT ZERO 02500 uni2500 1 Q\bdhrule box drawings light horizontal 02502 uni2502 1 Q\bdvrule box drawings light vertical 02506 uni2506 4X48 1FN Bvert beo Q\bdtriplevdash doubly broken vert 02508 uni2508 1 N Q\bdquadhdash 0xE988 2 AA box drawings light quadruple dash horizontal 0250A uni250A 1 N Q\bdquadvdash 0xE989 2 C1 box drawings light quadruple dash vertical 0250C uni250C 1 Q\bddvrh box drawings light down and right 02510 uni2510 1 Q\bddvlh box drawings light down and left 02514 uni2514 1 Q\bduvrh box drawings light up and right 02518 uni2518 1 Q\bduvlh box drawings light up and left 0251C uni251C 1 Q\bdbvrh box drawings light vertical and right 02524 uni2524 1 Q\bdbvlh box drawings light vertical and left 0252C uni252C 1 Q\bddvbh box drawings light down and horizontal 02534 uni2534 1 Q\bduvbh box drawings light up and horizontal 0253C uni253C 1 Q\bdbvbh box drawings light vertical and horizontal 02550 uni2550 1 Q\bdHrule box drawings double horizontal 02551 uni2551 1 Q\bdVrule box drawings double vertical 02552 uni2552 1 Q\bddvrH box drawings down single and right double 02553 uni2553 1 Q\bddVrh box drawings down double and right single 02554 uni2554 1 Q\bddVrH box drawings double down and right 02555 uni2555 1 Q\bddvlH box drawings down single and left double 02556 uni2556 1 Q\bddVlh box drawings down double and left single 02557 uni2557 1 Q\bddVlH box drawings double down and left 02558 uni2558 1 Q\bduvrH box drawings up single and right double 02559 uni2559 1 Q\bduVrh box drawings up double and right single 0255A uni255A 1 Q\bduVrH box drawings double up and right 0255B uni255B 1 Q\bduvlH box drawings up single and left double 0255C uni255C 1 Q\bduVlh box drawings up double and left single 0255D uni255D 1 Q\bduVlH box drawings double up and left 0255E uni255E 1 Q\bdbvrH box drawings vertical single and right double 0255F uni255F 1 Q\bdbVrh box drawings vertical double and right single 02560 uni2560 1 Q\bdbVrH box drawings double vertical and right 02561 uni2561 1 Q\bdbvlH box drawings vertical single and left double 02562 uni2562 1 Q\bdbVlh box drawings vertical double and left single 02563 uni2563 1 Q\bdbVlH box drawings double vertical and left 02564 uni2564 1 Q\bddvbH box drawings down single and horizontal double 02565 uni2565 1 Q\bddVbh box drawings down double and horizontal single 02566 uni2566 1 Q\bddVbH box drawings double down and horizontal 02567 uni2567 1 Q\bduvbH box drawings up single and horizontal double 02568 uni2568 1 Q\bduVbh box drawings up double and horizontal single 02569 uni2569 1 Q\bduVbH box drawings double up and horizontal 0256A uni256A 1 Q\bdbvbH box drawings vertical single and horizontal double 0256B uni256B 1 Q\bdbVbh box drawings vertical double and horizontal single 0256C uni256C 1 Q\bdbVbH box drawings double vertical and horizontal 02571 uni2571 1DN Q\bdnesw BOX DRAWINGS LIGHT DIAGONAL UPPER RIGHT TO LOWER LEFT 02572 uni2572 1DN Q\bdnwse BOX DRAWINGS LIGHT DIAGONAL UPPER LEFT TO LOWER RIGHT %02580 uni2580 EEBD 1DN uhblk ISOPUB Q\blockuphalf uhblk upper half block %02584 uni2584 EEBA 1DN lhblk ISOPUB Q\blocklowhalf lhblk lower half block %02588 uni2588 EEB9 1DN block ISOPUB Q\blockfull block full block 0258C uni258C 1 Q\blocklefthalf left half block 02590 uni2590 1 Q\blockrighthalf right half block %02591 uni2591 1DN blk14 ISOPUB Q\blockqtrshaded blk14 25% shaded block %02592 uni2592 1DN blk12 ISOPUB Q\blockhalfshaded blk12 50% shaded block %02593 uni2593 1DN blk34 ISOPUB Q\blockthreeqtrshaded blk34 75% shaded block 025A0 uni25A0 2223 1FN squarf ISOPUB bfo Q\mdlgblksquare squf squf squf \blackbox FilledSquare 0x25A0 6 6A square, filled +025A0 uni25A0 2223 0f0 squarf ISOTECH bfo A\blacksquare squf squf squf \blackbox FilledSquare 0x25A0 6 6A square, filled +025A0 EA22 uni25A0 7X39 0 N N squf ISOPUB* Q\mdlgblksquare Density large closed square +025A1 uni25A1 2222 1FN square ISOPUB bfn Q\mdlgwhtsquare square square Obox EmptySquare \sq 0x25A1 6 68 square, open +025A1 uni25A1 2222 0f0 square ISOTECH bfn P\square square square Obox EmptySquare \sq 0x25A1 6 68 square +025A1 uni25A1 2222 0f0 squ ISOPUB* Q\mdlgwhtsquare squ square, open M025A2 uni25A2 1 N Q\squoval WHITE SQUARE WITH ROUNDED CORNERS 025A3 uni25A3 1FN Q\blackinwhitesquare WHITE SQUARE CONTAINING BLACK SMALL SQUARE %025A4 uni25A4 D880 1FN bgp Q\squarehfill square, horizontal rule filled %025A5 uni25A5 D881 1FN bgq Q\squarevfill square, vertical rule filled M025A6 uni25A6 1 N Q\squarehvfill SQUARE WITH ORTHOGONAL CROSSHATCH FILL %025A7 uni25A7 D883 1FN bgr Q\squarenwsefill square, nw-to-se rule filled %025A8 uni25A8 D884 1FN bgs Q\squareneswfill square, ne-to-sw rule filled %025A9 25A9 uni25A9 D885 1DN N Q\squarecrossfill GraySquare square with diagonal crosshatch fill +025A9 E5B8 uni25A9.var 1FN N bg6 Q\squaregrayfill square with gray shading fill =025AA uni25AA EB47 7X3B DXEF 1DN Q\smblksquare FilledSmallSquare 0x25AA /blacksquare - sq bullet, filled +025AA E3D2 uni25AA EB47 0 N Q\smblksquare small square, filled (square bullet) %025AB uni25AB EB78 7X3A DXEE 1DN N Q\smwhtsquare EmptySmallSquare 0x25AB white small square 025AC uni25AC 0 Q\hrectangleblack black rectangle %025AD uni25AD EBA7 1FN bgx Q\hrectangle 0x25AD 6 60 horizontal rectangle, open %025AE uni25AE D8BD 1DN Q\vrectangleblack \blackslug FilledRectangle 0x25AE black vertical rectangle +025AE uni25AE EE2A 7X24 1d0 N marker ISOPUB Q\vrectangleblack marker FilledRectangle histogram marker %025AF uni25AF D8BE 1FN rect ISOPUB bgy Q\vrectangle rect orect EmptyRectangle 0x25AF rectangle, white (vertical) %025B0 uni25B0 1FN Q\parallelogramblack BLACK PARALLELOGRAM %025B1 uni25B1 EBA8 1FN bgz Q\parallelogram oparlgrm 0x25B1 6 7E parallelogram, open 025B2 uni25B2 2225 1DN Q\bigblacktriangleup utrif utrif FilledUpTriangle 0x25B2 6 6D black up-pointing triangle 025B3 uni25B3 2224 1FN xutri ISOAMSB bg1 P\bigtriangleup xutri utri utri \bigtriangleup EmptyUpTriangle 0x25B3 6 6E big up triangle, open 025B4 uni25B4 22B4 1FN utrif ISOPUB bf5 A\blacktriangle utrif up triangle, filled 025B5 uni25B5 2270 1FN utri ISOPUB bf1 A\vartriangle utri /triangle - up triangle, open 025B6 uni25B6 EEB0 1FS vrtrif bf7 A\blacktriangleright rtrif r230 0x25B6 6 63 (large) right triangle, filled 025B7 uni25B7 EEB2 1FS B vrtri bf3 P\triangleright rtri rtri \triangleright r146 0x25B7 6 78 xx7E (large) right triangle, open; Z NOTATION RANGE RESTRICTION %025B8 uni25B8 EB6C 1 S rtrif ISOPUB Q\smallblacktriangleright right triangle, filled %025B9 uni25B9 22BB 1 S rtri ISOPUB Q\smalltriangleright right triangle, open M025BA uni25BA 0 Q\blackpointerright black right-pointing pointer M025BB uni25BB 0 Q\whitepointerright white right-pointing pointer 025BC uni25BC 2227 1DN Q\bigblacktriangledown dtrif dtrif FilledDownTriangle 0x25BC 6 2E big down triangle, filled 025BD uni25BD 2226 1FN xdtri ISOAMSB bg2 P\bigtriangledown xdtri dtri dtri \bigtriangledown EmptyDownTriangle 0x25BD 6 2C big down triangle, open 025BE uni25BE 22B5 1FN dtrif ISOPUB bf6 A\blacktriangledown dtrif down triangle, filled 025BF uni25BF 227B 1FN dtri ISOPUB bf2 A\triangledown dtri down triangle, open 025C0 uni25C0 EBB1 1FS vltrif bf8 A\blacktriangleleft ltrif r231 0x25C0 6 62 (large) left triangle, filled 025C1 uni25C1 EEB3 1FS B vltri bf4 P\triangleleft ltri \triangleleft r147 0x25C1 6 76 xx6E (large) left triangle, open; Z NOTATION DOMAIN RESTRICTION %025C2 uni25C2 EB6D 1 S ltrif ISOPUB Q\smallblacktriangleleft 0x25C2 left triangle, filled %025C3 uni25C3 22BC 1 S ltri ISOPUB Q\smalltriangleleft 0x25C3 left triangle, open 025C4 uni25C4 1 S Q\blackpointerleft 0x25C4 Black left-pointing pointer 025C5 uni25C5 1 S Q\whitepointerleft 0x25C5 White left-pointing pointer 025C6 uni25C6 2221 1FN N diamondf ISOPUB bgi Q\mdlgblkdiamond tsqs FilledDiamond 0x25C6 6 72 black diamond 025C7 uni25C7 217E 1DN N diamond ISOPUB bgf Q\mdlgwhtdiamond tsqo \diamond EmptyDiamond 0x25C7 6 65 white diamond; diamond, open 025C8 uni25C8 1 N Q\blackinwhitediamond 0x25C8 White diamond containing black small diamond 025C9 uni25C9 1 N Q\fisheye 0x25C9 Fisheye 025CA uni25CA 217E? 1DN loz ISOPUB Q\mdlgwhtlozenge loz 0x25CA lozenge or total mark +025CA uni25CA 217E? 0DN loz ISOPUB A\lozenge loz 0x25CA lozenge or total mark 025CB uni25CB 217B 1FS B xcirc ISOAMSB bgn Q\mdlgwhtcircle bigcirc cir rng \bigcirc EmptyCircle 0x25CB 6 73 large circle +025CB uni25CB 217B 0FS B xcirc ISOAMSB bgn P\bigcirc bigcirc cir rng \bigcirc EmptyCircle 0x25CB 6 73 large circle 025CC uni25CC 1 N Q\dottedcircle 0x25CC Dotted circle 025CD uni25CD 1 N Q\circlevertfill 0x25CD Circle with vertical fill 025CE uni25CE 1 N Q\bullseye 0x25CE Bullseye 025CF uni25CF 217C 1FN circlef ISOPUB bgo Q\mdlgblkcircle bull rngs FilledCircle 0x25CF 6 64 circle, filled %025D0 uni25D0 ECF5 1FN circlefl ISOPUB bgt Q\circlelefthalfblack cirfl crclls 0x25D0 6 66 circle, filled left half [Harvey ball] %025D1 uni25D1 ECE3 1FN circlefr ISOPUB bgu Q\circlerighthalfblack cirfr crclrs 0x25D1 6 67 circle, filled right half %025D2 uni25D2 ECE2 1FN circlefb ISOPUB bgw Q\circlebottomhalfblack cirfbtm crclbs 0x25D2 circle, filled bottom half %025D3 uni25D3 ECF6 1FN circleft ISOPUB bgv Q\circletophalfblack cirftop 0x25D3 circle, filled top half 025D4 uni25D4 1 N Q\circleurquadblack 0x25D4 Circle with upper right quadrant black 025D5 uni25D5 1 N Q\blackcircleulquadwhite 0x25D5 Circle with all but upper left quadrant black 025D6 uni25D6 1 N Q\blacklefthalfcircle 0x25D6 Left half black circle 025D7 uni25D7 1 N Q\blackrighthalfcircle 0x25D7 Right half black circle %025D8 uni25D8 EE41 1FN bg7 Q\inversebullet 0x25D8 inverse bullet 025D9 uni25D9 1 N Q\inversewhitecircle 0x25D9 Inverse white circle 025DA uni25DA 1 N Q\invwhiteupperhalfcircle 0x25DA Upper half inverse white circle 025DB uni25DB 1 N Q\invwhitelowerhalfcircle 0x25DB Lower half inverse white circle 025DC uni25DC 1 N Q\ularc 0x25DC Upper left quadrant circular arc 025DD uni25DD 1 N Q\urarc 0x25DD Upper right quadrant circular arc 025DE uni25DE 1 N Q\lrarc 0x25DE Lower right quadrant circular arc 025DF uni25DF 1 N Q\llarc 0x25DF Lower left quadrant circular arc 025E0 uni25E0 1 N Q\topsemicircle 0x25E0 Upper half circle 025E1 uni25E1 1 N Q\botsemicircle 0x25E1 Lower half circle 025E2 uni25E2 EB4E 1DN lrtrif Q\lrblacktriangle endcom 0x25E2 lower right triangle, filled 025E3 uni25E3 EB4F 7X35 1 N lltrif Q\llblacktriangle 0x25E3 lower left triangle, filled 025E4 uni25E4 EB4C 1DN ultrif Q\ulblacktriangle stcom 0x25E4 upper left triangle, filled 025E5 uni25E5 EB4D 7X36 1 N urtrif Q\urblacktriangle 0x25E5 upper right triangle, filled %025E6 uni25E6 EB79 1DN Q\smwhtcircle cir EmptySmallCircle 0x25E6 white bullet %025E7 uni25E7 D88D 1FN squarfl ISOPUB bft Q\squareleftblack sqls 0x25E7 6 6B square, filled left half %025E8 uni25E8 D88E 1FN squarfr ISOPUB bfu Q\squarerightblack sqrs 0x25E8 6 6C square, filled right half %025E9 uni25E9 D88F 1FN squarftl ISOPUB bfq Q\squareulblack squftopl 0x25E9 6 69 square, filled top left corner %025EA uni25EA D890 1FN squarfbr ISOPUB bfs Q\squarelrblack squfbtmr sqlrs 0x25EA 6 6F square, filled bottom right corner 025EB uni25EB D891 2DO B midb S\boxbar \boxbar 0x25EB 6 61 vertical bar in box 025EC uni25EC DBEC 2DO tridot ISOAMSB Q\trianglecdot tridot tridott 0x25EC 6 5F triangle with centered dot %025ED uni25ED D892 1DN Q\triangleleftblack triuls 0x25ED 6 74 up-pointing triangle with left half black %025EE uni25EE D893 1DN Q\trianglerightblack triurs 0x25EE 6 79 up-pointing triangle with right half black 025EF uni25EF 1 N Q\lgwhtcircle 0x25EF Large circle M025F0 uni25F0 1 N Q\squareulquad WHITE SQUARE WITH UPPER LEFT QUADRANT M025F1 uni25F1 1 N Q\squarellquad WHITE SQUARE WITH LOWER LEFT QUADRANT M025F2 uni25F2 1 N Q\squarelrquad WHITE SQUARE WITH LOWER RIGHT QUADRANT M025F3 uni25F3 1 N Q\squareurquad WHITE SQUARE WITH UPPER RIGHT QUADRANT M025F4 uni25F4 1 N Q\circleulquad WHITE CIRCLE WITH UPPER LEFT QUADRANT M025F5 uni25F5 1 N Q\circlellquad WHITE CIRCLE WITH LOWER LEFT QUADRANT M025F6 uni25F6 1 N Q\circlelrquad WHITE CIRCLE WITH LOWER RIGHT QUADRANT M025F7 uni25F7 1 N Q\circleurquad WHITE CIRCLE WITH UPPER RIGHT QUADRANT &025F8 E2E4 uni25F8 DBB9 7X32 DXE9 1dN ultri ISOAMSO Q\ultriangle UPPER LEFT TRIANGLE &025F9 E2E2 uni25F9 DBBA 7X33 DXEA 1dN urtri ISOAMSO Q\urtriangle UPPER RIGHT TRIANGLE &025FA E2E5 uni25FA DBB3 7X34 DXEB 1dN lltri ISOAMSO Q\lltriangle LOWER LEFT TRIANGLE &025FB uni25FB EB77 1dN N Q\mdwhtsquare Placeholder WHITE MEDIUM SQUARE &025FC uni25FC EB6B 1dN N Q\mdblksquare SelectionPlaceholder BLACK MEDIUM SQUARE &025FD F520 uni25FD 1dN N Q\mdsmwhtsquare Square WHITE MEDIUM SMALL SQUARE &025FE uni25FE 1dN N Q\mdsmblksquare BLACK MEDIUM SMALL SQUARE &025FF uni25FF 1dN N lrtri ISOAMSO Q\lrtriangle LOWER RIGHT TRIANGLE 02605 uni2605 217A 1FN starf ISOPUB bfm A\bigstar starf bstarf starf FivePointedStar 0x2605 6 77 star, filled 02606 uni2606 2179 1FN star ISOPUB bfl Q\bigwhitestar star ostar 0x2606 6 71 star, open 02609 uni2609 EFE7 1DN W\astrosun odot \sun sun %0260C uni260C D89D 1DN W\conjunction conj conjunction %0260E uni260E EFFC 1FN N phone ISOPUB bg9 W\phone phone telephone symbol %02612 uni2612 EF60 1DN N cross ISOPUB W\XBox cross ballot cross 02621 uni2621 1DN N Q\danger dangerous bend (caution sign) %02639 uni2639 EB45 1DN N W\frownie SadSmiley sad smiley %0263A uni263A EFDF 1DN N W\smiley HappySmiley happy smiley 0263B uni263B 0 W\blacksmiley black smiling face 0263C uni263C 0 W\sun white sun with rays 0263D uni263D 1 N W\rightmoon 0x263D First quarter moon 0263E uni263E 1 N W\leftmoon 0x263E Last quarter moon %0263F uni263F EFEA 1FN N bh3 W\mercury Mercury Mercury 02640 uni2640 216A 1FN N female ISOPUB bh4 W\female female Venus Venus, female %02641 uni2641 D8B5 1DN N W\earth Earth Earth 02642 uni2642 2169 1FN N male ISOPUB bh7 W\male male Mars Mars, male %02643 uni2643 EFEB 1FN N bh5 W\jupiter Jupiter Jupiter %02644 uni2644 EFEC 1FN N bh6 W\saturn Saturn Saturn %02646 uni2646 EFEE 1FN N bh9 W\neptune Neptune Neptune %02647 uni2647 EFEF 1DN N W\pluto Pluto Pluto %02648 uni2648 EFF2 1DN N W\aries Aries Aries %02649 uni2649 EFF3 1DN N W\taurus Taurus Taurus 02660 uni2660 EFCB 1FN N spades ISOPUB bfj P\spadesuit spades spades \spadesuit SpadeSuit 0x2660 spades suit symbol 02661 uni2661 EFCC 1DN N hearts ISOPUB P\heartsuit hearts \heartsuit HeartSuit 0x2661 heart suit symbol 02662 uni2662 EFCD 1FN N diams ISOPUB bfg P\diamondsuit diams diam diams \diamondsuit DiamondSuit 0x2662 diamond suit symbol 02663 uni2663 EFCE 1FN N clubs ISOPUB bfk P\clubsuit clubs clubs \clubsuit ClubSuit 0x2663 club suit symbol 02664 uni2664 EECB 1DN N spadeso X\varspadesuit 0x2664 spade, white (card suit) 02665 uni2665 EECC 1FN N heartsf bfi X\varheartsuit hearts 0x2665 filled heart (card suit) 02666 uni2666 EECD 1FN N diamsf bfh X\vardiamondsuit diams 0x2666 filled diamond (card suit) 02667 uni2667 EECE 1DN N clubso X\varclubsuit 0x2667 club, white (card suit) 02669 uni2669 00D5 1 N N sung ISONUM W\quarternote music note (sung text sign) 0266A uni266A 0 W\eighthnote eighth note 0266B uni266B 0 W\twonotes beamed eighth notes 0266D uni266D 23AC 1FN N flat ISOPUB bhw P\flat flat flat \flat Flat 0x266D musical flat 0266E uni266E 226E 1FN N natur ISOPUB bhy P\natural natur natur \natural Natural 0x266E music natural 0266F uni266F 23BC 1FN N sharp ISOPUB bhx P\sharp sharp sharp \sharp Sharp 0x266F xx0B musical sharp P0267E uni267E 1 Q\acidfree PERMANENT PAPER SIGN &02680 uni2680 1 Q\dicei DIE FACE-1 &02681 uni2681 1 Q\diceii DIE FACE-2 &02682 uni2682 1 Q\diceiii DIE FACE-3 &02683 uni2683 1 Q\diceiv DIE FACE-4 &02684 uni2684 1 Q\dicev DIE FACE-5 &02685 uni2685 1 Q\dicevi DIE FACE-6 &02686 uni2686 1 Q\circledrightdot WHITE CIRCLE WITH DOT RIGHT &02687 uni2687 1 Q\circledtwodots WHITE CIRCLE WITH TWO DOTS &02688 uni2688 1 Q\blackcircledrightdot BLACK CIRCLE WITH WHITE DOT RIGHT &02689 uni2689 1 Q\blackcircledtwodots BLACK CIRCLE WITH TWO WHITE DOTS %026A0 F725 uni26A0 1DN N triexcl Q\triangleexclam WarningSign WARNING SIGN W026A5 E5BC uni26A5 1FN N hmphdite bh8 V\Hermaphrodite hmphdite MALE AND FEMALE SIGN W026AA uni26AA 1 N N Q\mdwhtcircle MEDIUM WHITE CIRCLE W026AB uni26AB 1 N N Q\mdblkcircle MEDIUM BLACK CIRCLE W026AC uni26AC 1 N N Q\mdsmwhtcircle MEDIUM SMALL WHITE CIRCLE W026B2 EB04 uni26B2 1dN N neuter Q\neuter cirmid tmpneuter NEUTER %02702 uni2702 ED22 1FN N bg8 Q\scissors scissors, solid open %02709 uni2709 ED29 1 N N Q\envelope &envelop; envelope 02713 uni2713 EFCF 1FN N check ISOPUB bff A\checkmark chkmrk 0x2713 tick, check mark 02720 uni2720 21AE 1FN N malt ISOPUB bfe A\maltese malt maltese 0x2720 maltese cross %0272A uni272A ED47 1DN Q\circledstar ostarcir circled white star 02736 E3B5 uni2736 7X42 DXF6 1 N N sext ISOPUB M\varstar sext SixPointedStar 0x2736 Six pointed black star 0273D uni273D 1 N Q\dingasterisk 0x273D Heavy teardrop-spoked asterisk &02772 uni2772 214C 1DF O lbbrk ISOTECH Q\lbrbrak LIGHT LEFT TORTOISE SHELL BRACKET ORNAMENT #02772 uni2772.lgdisplay1 214C 1DF O lbbrk ISOTECH Q\lbrbrak LIGHT LEFT TORTOISE SHELL BRACKET ORNAMENT #02772 uni2772.lgdisplay2 214C 1DF O lbbrk ISOTECH Q\lbrbrak LIGHT LEFT TORTOISE SHELL BRACKET ORNAMENT #02772 uni2772.lgdisplay3 214C 1DF O lbbrk ISOTECH Q\lbrbrak LIGHT LEFT TORTOISE SHELL BRACKET ORNAMENT #02772 uni2772.lgdisplay4 214C 1DF O lbbrk ISOTECH Q\lbrbrak LIGHT LEFT TORTOISE SHELL BRACKET ORNAMENT &02773 uni2773 214D 1DF C rbbrk ISOTECH Q\rbrbrak LIGHT RIGHT TORTOISE SHELL BRACKET ORNAMENT #02773 uni2773.lgdisplay1 214D 1DF C rbbrk ISOTECH Q\rbrbrak LIGHT RIGHT TORTOISE SHELL BRACKET ORNAMENT #02773 uni2773.lgdisplay2 214D 1DF C rbbrk ISOTECH Q\rbrbrak LIGHT RIGHT TORTOISE SHELL BRACKET ORNAMENT #02773 uni2773.lgdisplay3 214D 1DF C rbbrk ISOTECH Q\rbrbrak LIGHT RIGHT TORTOISE SHELL BRACKET ORNAMENT #02773 uni2773.lgdisplay4 214D 1DF C rbbrk ISOTECH Q\rbrbrak LIGHT RIGHT TORTOISE SHELL BRACKET ORNAMENT %02780 uni2780 ECC2 1DN Q\circledsansone cir1 dingbat circled sans-serif digit one %02781 uni2781 ECC3 1DN Q\circledsanstwo cir2 dingbat circled sans-serif digit two %02782 uni2782 ECC4 1DN Q\circledsansthree cir3 dingbat circled sans-serif digit three %02783 uni2783 ECC5 1DN Q\circledsansfour cir4 dingbat circled sans-serif digit four %02784 uni2784 ECC6 1DN Q\circledsansfive cir5 dingbat circled sans-serif digit five %02785 uni2785 ECC7 1DN Q\circledsanssix cir6 dingbat circled sans-serif digit six %02786 uni2786 ECC8 1DN Q\circledsansseven cir7 dingbat circled sans-serif digit seven %02787 uni2787 ECC9 1DN Q\circledsanseight cir8 dingbat circled sans-serif digit eight %02788 uni2788 ECCA 1DN Q\circledsansnine cir9 dingbat circled sans-serif digit nine %02789 uni2789 ECCB 1DN Q\circledsansten cir10 dingbat circled sans-serif number ten %0278A uni278A ECCC 1DN Q\blackcircledsansone cirf1 dingbat negative circled sans-serif digit one %0278B uni278B ECCD 1DN Q\blackcircledsanstwo cirf2 dingbat negative circled sans-serif digit two %0278C uni278C ECCE 1DN Q\blackcircledsansthree cirf3 dingbat negative circled sans-serif digit three %0278D uni278D ECCF 1DN Q\blackcircledsansfour cirf4 dingbat negative circled sans-serif digit four %0278E uni278E ECD0 1DN Q\blackcircledsansfive cirf5 dingbat negative circled sans-serif digit five %0278F uni278F ECD1 1DN Q\blackcircledsanssix cirf6 dingbat negative circled sans-serif digit six %02790 uni2790 ECD2 1DN Q\blackcircledsansseven cirf7 dingbat negative circled sans-serif digit seven %02791 uni2791 ECD3 1DN Q\blackcircledsanseight cirf8 dingbat negative circled sans-serif digit eight %02792 uni2792 ECD4 1DN Q\blackcircledsansnine cirf9 dingbat negative circled sans-serif digit nine %02793 uni2793 ECD5 1DN Q\blackcircledsansten cirf10 dingbat negative circled sans-serif number ten 0279B uni279B EDA9 1DN Q\draftingarrow rarrb right arrow with bold head (drafting) P027C0 uni27C0 1 Q\threedangle THREE DIMENSIONAL ANGLE P027C1 uni27C1 1 Q\whiteinwhitetriangle WHITE TRIANGLE CONTAINING SMALL WHITE TRIANGLE P027C2 22A5 uni27C2 EF70 2FR R perp ISOTECH bdp P\perp perp perp \perp r215 perpendicular P027C3 uni27C3 1 Q\subsetcirc OPEN SUBSET P027C4 uni27C4 1 Q\supsetcirc OPEN SUPERSET P027C5 uni27C5 1 O S\lbag LEFT S-SHAPED BAG DELIMITER P027C6 uni27C6 1 C S\rbag RIGHT S-SHAPED BAG DELIMITER W027C7 EE0C uni27C7 DB32 1 S B ordot Q\veedot OR WITH DOT INSIDE W027C8 E34D uni27C8 DBF4 1dS R bsolhsub ISOAMSR H\bsolhsub r199 REVERSE SOLIDUS PRECEDING SUBSET W027C9 E34E uni27C9 D95C 1dS R suphsol ISOAMSR H\suphsol r200 SUPERSET PRECEDING SOLIDUS &027D0 EA60 uni27D0 7X3E DXF2 1dN N diamdot Q\diamondcdot diadot WHITE DIAMOND WITH CENTRED DOT &027D1 uni27D1 1 B anddot Q\wedgedot AND WITH DOT &027D2 uni27D2 1 R Q\upin ELEMENT OF OPENING UPWARDS &027D3 G110 uni27D3 2DR R Q\pullback LOWER RIGHT CORNER WITH DOT &027D4 G111 uni27D4 2DR R Q\pushout UPPER LEFT CORNER WITH DOT &027D5 uni27D5 1 L Q\leftouterjoin LEFT OUTER JOIN &027D6 uni27D6 1 L Q\rightouterjoin RIGHT OUTER JOIN &027D7 uni27D7 1 L Q\fullouterjoin FULL OUTER JOIN &027D8 uni27D8 1 L Q\bigbot LARGE UP TACK &027D9 uni27D9 1 L Q\bigtop LARGE DOWN TACK &027DA uni27DA 1 R Q\DashVDash LEFT AND RIGHT DOUBLE TURNSTILE &027DB uni27DB 1 R Q\dashVdash LEFT AND RIGHT TACK &027DC uni27DC 1 R X\multimapinv LEFT MULTIMAP &027DD uni27DD 1 R Q\vlongdash LONG LEFT TACK &027DE uni27DE 1 R Q\longdashv LONG RIGHT TACK &027DF uni27DF 1 R Q\cirbot UP TACK WITH CIRCLE ABOVE &027E0 uni27E0 1 B Q\lozengeminus LOZENGE DIVIDED BY HORIZONTAL RULE &027E1 uni27E1 1 B Q\concavediamond WHITE CONCAVE-SIDED DIAMOND &027E2 uni27E2 1 B Q\concavediamondtickleft WHITE CONCAVE-SIDED DIAMOND WITH LEFTWARDS TICK &027E3 uni27E3 1 B Q\concavediamondtickright WHITE CONCAVE-SIDED DIAMOND WITH RIGHTWARDS TICK &027E4 uni27E4 1 B Q\whitesquaretickleft WHITE SQUARE WITH LEFTWARDS TICK &027E5 uni27E5 1 B Q\whitesquaretickright WHITE SQUARE WITH RIGHTWARDS TICK &027E6 301A uni27E6 214A 4X17 1FF O lobrk ISOTECH bdc N\lBrack lopenb LeftDoubleBracket 0x301A 3 76 xx5B MATHEMATICAL LEFT WHITE SQUARE BRACKET #027E6 301A uni27E6.lgdisplay1 214A 4X17 1FF O lobrk ISOTECH bdc N\lBrack lopenb LeftDoubleBracket 0x301A 3 76 xx5B MATHEMATICAL LEFT WHITE SQUARE BRACKET #027E6 301A uni27E6.lgdisplay2 214A 4X17 1FF O lobrk ISOTECH bdc N\lBrack lopenb LeftDoubleBracket 0x301A 3 76 xx5B MATHEMATICAL LEFT WHITE SQUARE BRACKET #027E6 301A uni27E6.lgdisplay3 214A 4X17 1FF O lobrk ISOTECH bdc N\lBrack lopenb LeftDoubleBracket 0x301A 3 76 xx5B MATHEMATICAL LEFT WHITE SQUARE BRACKET #027E6 301A uni27E6.lgdisplay4 214A 4X17 1FF O lobrk ISOTECH bdc N\lBrack lopenb LeftDoubleBracket 0x301A 3 76 xx5B MATHEMATICAL LEFT WHITE SQUARE BRACKET &027E7 301B uni27E7 214B 4X18 1FF C robrk ISOTECH bec N\rBrack ropenb RightDoubleBracket 0x301B 3 62 xx5D MATHEMATICAL RIGHT WHITE SQUARE BRACKET #027E7 301B uni27E7.lgdisplay1 214B 4X18 1FF C robrk ISOTECH bec N\rBrack ropenb RightDoubleBracket 0x301B 3 62 xx5D MATHEMATICAL RIGHT WHITE SQUARE BRACKET #027E7 301B uni27E7.lgdisplay2 214B 4X18 1FF C robrk ISOTECH bec N\rBrack ropenb RightDoubleBracket 0x301B 3 62 xx5D MATHEMATICAL RIGHT WHITE SQUARE BRACKET #027E7 301B uni27E7.lgdisplay3 214B 4X18 1FF C robrk ISOTECH bec N\rBrack ropenb RightDoubleBracket 0x301B 3 62 xx5D MATHEMATICAL RIGHT WHITE SQUARE BRACKET #027E7 301B uni27E7.lgdisplay4 214B 4X18 1FF C robrk ISOTECH bec N\rBrack ropenb RightDoubleBracket 0x301B 3 62 xx5D MATHEMATICAL RIGHT WHITE SQUARE BRACKET &027E8 uni27E8 EF32 1FF O lang ISOTECH bda P\langle lang lang \langle LeftAngleBracket 0x2329 3 6B xx7B MATHEMATICAL LEFT ANGLE BRACKET #027E8 uni27E8.lgdisplay1 EF32 1FF O lang ISOTECH bda P\langle lang lang \langle LeftAngleBracket 0x2329 3 6B xx7B MATHEMATICAL LEFT ANGLE BRACKET #027E8 uni27E8.lgdisplay2 EF32 1FF O lang ISOTECH bda P\langle lang lang \langle LeftAngleBracket 0x2329 3 6B xx7B MATHEMATICAL LEFT ANGLE BRACKET #027E8 uni27E8.lgdisplay3 EF32 1FF O lang ISOTECH bda P\langle lang lang \langle LeftAngleBracket 0x2329 3 6B xx7B MATHEMATICAL LEFT ANGLE BRACKET #027E8 uni27E8.lgdisplay4 EF32 1FF O lang ISOTECH bda P\langle lang lang \langle LeftAngleBracket 0x2329 3 6B xx7B MATHEMATICAL LEFT ANGLE BRACKET &027E9 uni27E9 EF33 1FF C rang ISOTECH bea P\rangle rang rang \rangle RightAngleBracket 0x232A 3 6C xx7D MATHEMATICAL RIGHT ANGLE BRACKET #027E9 uni27E9.lgdisplay1 EF33 1FF C rang ISOTECH bea P\rangle rang rang \rangle RightAngleBracket 0x232A 3 6C xx7D MATHEMATICAL RIGHT ANGLE BRACKET #027E9 uni27E9.lgdisplay2 EF33 1FF C rang ISOTECH bea P\rangle rang rang \rangle RightAngleBracket 0x232A 3 6C xx7D MATHEMATICAL RIGHT ANGLE BRACKET #027E9 uni27E9.lgdisplay3 EF33 1FF C rang ISOTECH bea P\rangle rang rang \rangle RightAngleBracket 0x232A 3 6C xx7D MATHEMATICAL RIGHT ANGLE BRACKET #027E9 uni27E9.lgdisplay4 EF33 1FF C rang ISOTECH bea P\rangle rang rang \rangle RightAngleBracket 0x232A 3 6C xx7D MATHEMATICAL RIGHT ANGLE BRACKET &027EA uni27EA 2238 1FF O Lang ISOTECH bdb N\lAngle sverline 0x300A xx28 MATHEMATICAL LEFT DOUBLE ANGLE BRACKET #027EA uni27EA.lgdisplay1 2238 1FF O Lang ISOTECH bdb N\lAngle sverline 0x300A xx28 MATHEMATICAL LEFT DOUBLE ANGLE BRACKET #027EA uni27EA.lgdisplay2 2238 1FF O Lang ISOTECH bdb N\lAngle sverline 0x300A xx28 MATHEMATICAL LEFT DOUBLE ANGLE BRACKET #027EA uni27EA.lgdisplay3 2238 1FF O Lang ISOTECH bdb N\lAngle sverline 0x300A xx28 MATHEMATICAL LEFT DOUBLE ANGLE BRACKET #027EA uni27EA.lgdisplay4 2238 1FF O Lang ISOTECH bdb N\lAngle sverline 0x300A xx28 MATHEMATICAL LEFT DOUBLE ANGLE BRACKET &027EB uni27EB 2239 1FF C Rang ISOTECH beb N\rAngle 0x300B xx29 MATHEMATICAL RIGHT DOUBLE ANGLE BRACKET #027EB uni27EB.lgdisplay1 2239 1FF C Rang ISOTECH beb N\rAngle 0x300B xx29 MATHEMATICAL RIGHT DOUBLE ANGLE BRACKET #027EB uni27EB.lgdisplay2 2239 1FF C Rang ISOTECH beb N\rAngle 0x300B xx29 MATHEMATICAL RIGHT DOUBLE ANGLE BRACKET #027EB uni27EB.lgdisplay3 2239 1FF C Rang ISOTECH beb N\rAngle 0x300B xx29 MATHEMATICAL RIGHT DOUBLE ANGLE BRACKET #027EB uni27EB.lgdisplay4 2239 1FF C Rang ISOTECH beb N\rAngle 0x300B xx29 MATHEMATICAL RIGHT DOUBLE ANGLE BRACKET Y027EC 3018 uni27EC 2148 4X1B 1 O loang ISOTECH Q\Lbrbrak MATHEMATICAL LEFT WHITE TORTOISE SHELL BRACKET Y027ED 3019 uni27ED 2149 4X1C 1 C roang ISOTECH Q\Rbrbrak MATHEMATICAL RIGHT WHITE TORTOISE SHELL BRACKET &027F0 uni27F0 1 R Q\UUparrow UPWARDS QUADRUPLE ARROW &027F1 uni27F1 1 R Q\DDownarrow DOWNWARDS QUADRUPLE ARROW &027F2 uni27F2 1 R Q\acwgapcirclearrow ANTICLOCKWISE GAPPED CIRCLE ARROW &027F3 uni27F3 1 R Q\cwgapcirclearrow CLOCKWISE GAPPED CIRCLE ARROW &027F4 G031 uni27F4 1 S R Q\rightarrowonoplus \arrowonoplus RIGHT ARROW WITH CIRCLE PLUS &027F5 E201 uni27F5 225C 1DS R xlarr ISOAMSA P\longleftarrow \longleftarrow LongLeftArrow a040 LONG LEFTWARDS ARROW &027F6 E205 uni27F6 225D 1DS R xrarr ISOAMSA P\longrightarrow lngrarr \longrightarrow LongRightArrow a042 LONG RIGHTWARDS ARROW &027F7 E203 uni27F7 2267 1DS R xharr ISOAMSA P\longleftrightarrow harrr \longleftrightarrow LongLeftRightArrow a045 LONG LEFT RIGHT ARROW &027F8 E200 uni27F8 225E 1DS R xlArr ISOAMSA P\Longleftarrow lArrr \Longleftarrow DoubleLongLeftArrow a046 LONG LEFTWARDS DOUBLE ARROW &027F9 E204 uni27F9 225F 1DS R xrArr ISOAMSA P\Longrightarrow rArrr \Longrightarrow DoubleLongRightArrow a048 LONG RIGHTWARDS DOUBLE ARROW &027FA E202 uni27FA 2269 1DS R xhArr ISOAMSA P\Longleftrightarrow xhArr \Longleftrightarrow DoubleLongLeftRightArrow a051 LONG LEFT RIGHT DOUBLE ARROW &027FB E82D uni27FB 1DS R xmapfrom S\longmapsfrom a211 LONG LEFTWARDS ARROW FROM BAR &027FC E208 uni27FC D9E8 1DS R xmap ISOAMSA P\longmapsto \longmapsto a210 LONG RIGHTWARDS ARROW FROM BAR &027FD E82E uni27FD 1DS R xMapfrom S\Longmapsfrom a213 LONG LEFTWARDS DOUBLE ARROW FROM BAR &027FE E830 uni27FE 1DS R xMapto S\Longmapsto a212 LONG RIGHTWARDS DOUBLE ARROW FROM BAR &027FF uni27FF EBCB 1FS R xzigrarr ISOAMSA baj H\longrightzigzagarrow zigarr a176 LONG RIGHTWARDS ZIG-ZAG ARROW &02900 ED10 uni2900 BX0C 1DS R Q\nvtwoheadrightarrow xx24 RIGHTWARDS TWO-HEADED ARROW WITH VERTICAL STROKE &02901 ED11 uni2901 BX0D 1DS R Q\nVtwoheadrightarrow xx25 RIGHTWARDS TWO-HEADED ARROW WITH DOUBLE VERTICAL STROKE &02902 E247 uni2902 D9C3 BX0E 1DS R nvlArr ISOAMSA H\nvLeftarrow a221 LEFTWARDS DOUBLE ARROW WITH VERTICAL STROKE &02903 E246 uni2903 D9C4 BX0F 1DS R nvrArr ISOAMSA H\nvRightarrow a222 RIGHTWARDS DOUBLE ARROW WITH VERTICAL STROKE &02904 E245 uni2904 EBBA BX10 1DS R nvHarr ISOAMSA H\nvLeftrightarrow a223 LEFT RIGHT DOUBLE ARROW WITH VERTICAL STROKE &02905 E212 uni2905 D9BC 1X06 BX11 1FS R Map ISOAMSA bax H\twoheadmapsto a149 RIGHTWARDS TWO-HEADED ARROW FROM BAR &02906 E834 uni2906 1X07 BX12 1DS R Mapfrom S\Mapsfrom a058 LEFTWARDS DOUBLE ARROW FROM BAR &02907 E835 uni2907 1X08 BX13 1DS R Mapto S\Mapsto a057 RIGHTWARDS DOUBLE ARROW FROM BAR &02908 EA29 uni2908 1X09 BX14 1DS R darrln H\downarrowbarred dnarln a118 DOWNWARDS ARROW WITH HORIZONTAL STROKE &02909 EA5C uni2909 1X0A BX15 1DS R uarrln H\uparrowbarred uparln a117 UPWARDS ARROW WITH HORIZONTAL STROKE &0290A EC08 uni290A 1X0B BX16 1DS R uAarr H\Uuparrow a060 UPWARDS TRIPLE ARROW &0290B EC09 uni290B 1X0C BX17 1DS R dAarr H\Ddownarrow a062 DOWNWARDS TRIPLE ARROW &0290C E402 uni290C D9B0 1X0D BX18 1DS R lbarr ISOAMSA H\leftbkarrow a142 LEFTWARDS DOUBLE DASH ARROW &0290D E80A uni290D EB30 1X0E BX19 1DS R rbarr ISOAMSA H\rightbkarrow a141 RIGHTWARDS DOUBLE DASH ARROW &0290E E206 uni290E D9B1 1X0F BX1A 1DS R lBarr ISOAMSA H\leftdbkarrow a144 LEFTWARDS TRIPLE DASH ARROW &0290F E207 uni290F D9D2 1X10 BX1B 1DS R rBarr ISOAMSA A\dbkarow a143 RIGHTWARDS TRIPLE DASH ARROW *0290F E207 uni290F D9D2 0dS R rBarr ISOAMSA H\rightdbkarrow a143 right doubly broken arrow &02910 E209 uni2910 D9D3 1X11 BX1C 1DS R RBarr ISOAMSA A\drbkarow a147 RIGHTWARDS TWO-HEADED TRIPLE DASH ARROW &02911 E238 uni2911 D9A3 1X12 BX1D 1DS R DDotrahd ISOAMSA H\rightdotarrow a145 RIGHTWARDS ARROW WITH DOTTED STEM &02912 F503 uni2912 1X13 BX1E 1DS R uarrb H\baruparrow UpArrowBar a111 0xEB30 UPWARDS ARROW TO BAR &02913 F504 uni2913 1X14 BX1F 1DS R darrb H\downarrowbar DownArrowBar a113 0xEB31 DOWNWARDS ARROW TO BAR &02914 ED12 uni2914 BX20 1DS R Q\nvrightarrowtail 0xEB18 xx31 RIGHTWARDS ARROW WITH TAIL WITH VERTICAL STROKE &02915 ED13 uni2915 BX21 1DS R Q\nVrightarrowtail xx32 RIGHTWARDS ARROW WITH TAIL WITH DOUBLE VERTICAL STROKE &02916 E239 uni2916 D9CF 1X15 BX22 1DS R Rarrtl ISOAMSA H\twoheadrightarrowtail a214 xx33 RIGHTWARDS TWO-HEADED ARROW WITH TAIL &02917 ED14 uni2917 BX23 1DS R Q\nvtwoheadrightarrowtail xx34 RIGHTWARDS TWO-HEADED ARROW WITH TAIL WITH VERTICAL STROKE &02918 ED15 uni2918 BX24 1DS R Q\nVtwoheadrightarrowtail xx35 RIGHTWARDS TWO-HEADED ARROW WITH TAIL WITH DOUBLE VERTICAL STROKE &02919 E23C uni2919 D9AE 1X16 BX25 1DS R latail ISOAMSA H\lefttail a198 LEFTWARDS ARROW-TAIL &0291A E23A uni291A D9D0 1X17 BX26 1DS R ratail ISOAMSA H\righttail a196 RIGHTWARDS ARROW-TAIL &0291B E23D uni291B D9AF 1X18 BX27 1DS R lAtail ISOAMSA H\leftdbltail a199 LEFTWARDS DOUBLE ARROW-TAIL &0291C E23B uni291C D9D1 1X19 BX28 1DS R rAtail ISOAMSA H\rightdbltail a197 RIGHTWARDS DOUBLE ARROW-TAIL &0291D E222 uni291D D9AB 1X1A BX29 1DS R larrfs ISOAMSA H\diamondleftarrow a103 LEFTWARDS ARROW TO BLACK DIAMOND &0291E E223 uni291E D9CC 1X1B BX2A 1DS R rarrfs ISOAMSA H\rightarrowdiamond a104 RIGHTWARDS ARROW TO BLACK DIAMOND &0291F E220 uni291F D9AA 1X1C BX2B 1DS R larrbfs ISOAMSA H\diamondleftarrowbar a101 LEFTWARDS ARROW FROM BAR TO BLACK DIAMOND &02920 E221 uni2920 D9CA 1X1D BX2C 1DS R rarrbfs ISOAMSA H\barrightarrowdiamond a102 RIGHTWARDS ARROW FROM BAR TO BLACK DIAMOND &02921 EA45 uni2921 1X1E BX2D 1DS R nwsesarr H\nwsearrow nwarr2 a083 0xEB06 NORTH WEST AND SOUTH EAST ARROW &02922 EA44 uni2922 1X1F BX2E 1DS R neswsarr H\neswarrow nearr2 a084 0xEB05 NORTH EAST AND SOUTH WEST ARROW &02923 E20C uni2923 D9C5 1X20 BX2F 1FS R nwarhk ISOAMSA bbc H\hknwarrow a075 NORTH WEST ARROW WITH HOOK &02924 E20D uni2924 D9BD 1X21 BX30 1FS R nearhk ISOAMSA bbd H\hknearrow a076 NORTH EAST ARROW WITH HOOK &02925 E20B uni2925 D9DB 1X22 BX31 1FS R searhk ISOAMSA bbb A\hksearow a077 SOUTH EAST ARROW WITH HOOK +02925 E20B uni2925 D9DB 1fS R searhk ISOAMSA bbb H\hksearrow a077 SE arrow-hooked &02926 E20A uni2926 D9E0 1X23 BX32 1FS R swarhk ISOAMSA bba A\hkswarow a078 SOUTH WEST ARROW WITH HOOK +02926 E20A uni2926 D9E0 1fS R swarhk ISOAMSA bba H\hkswarrow a078 SW arrow-hooked &02927 E211 uni2927 D9C7 1X24 BX33 1FS R nwnear ISOAMSA bb5 A\tona a090 NORTH WEST ARROW AND NORTH EAST ARROW &02928 E20E uni2928 D9BF 1X25 BX34 1FS R nesear ISOAMSA bb2 A\toea a087 NORTH EAST ARROW AND SOUTH EAST ARROW &02929 E20F uni2929 D9DD 1X26 BX35 1FS R seswar ISOAMSA bb3 A\tosa a088 SOUTH EAST ARROW AND SOUTH WEST ARROW &0292A E210 uni292A D9E2 1X27 BX36 1FS R swnwar ISOAMSA bb4 A\towa a089 SOUTH WEST ARROW AND NORTH WEST ARROW &0292B ED00 uni292B 1X28 BX37 1DN rdiofdi H\rdiagovfdiag a098 RISING DIAGONAL CROSSING FALLING DIAGONAL &0292C ED01 uni292C 1X29 BX38 1DN fdiordi H\fdiagovrdiag a097 FALLING DIAGONAL CROSSING RISING DIAGONAL &0292D ED02 uni292D 1X2A BX39 1DN seonearr H\seovnearrow a091 SOUTH EAST ARROW CROSSING NORTH EAST ARROW &0292E ED03 uni292E 1X2B BX3A 1DN neosearr H\neovsearrow a092 NORTH EAST ARROW CROSSING SOUTH EAST ARROW &0292F ED04 uni292F 1X2C BX3B 1DN fdonearr H\fdiagovnearrow a095 FALLING DIAGONAL CROSSING NORTH EAST ARROW &02930 ED05 uni2930 1X2D BX3C 1DN rdosearr H\rdiagovsearrow a096 RISING DIAGONAL CROSSING SOUTH EAST ARROW &02931 ED06 uni2931 1X2E BX3D 1DN neonwarr H\neovnwarrow a093 NORTH EAST ARROW CROSSING NORTH WEST ARROW &02932 ED07 uni2932 1X2F BX3E 1DN nwonearr H\nwovnearrow a094 NORTH WEST ARROW CROSSING NORTH EAST ARROW &02933 E21C uni2933 D9CB 1X30 BX3F 1FS R rarrc ISOAMSA ba1 H\rightcurvedarrow a174 5 56 WAVE ARROW POINTING DIRECTLY RIGHT &02934 E3D6 uni2934 BX40 1 N Q\uprightcurvearrow ARROW POINTING RIGHTWARDS THEN CURVING UPWARDS &02935 E3D7 uni2935 BX41 1 N Q\downrightcurvedarrow ARROW POINTING RIGHTWARDS THEN CURVING DOWNWARDS &02936 E21A uni2936 F0BE 1X33 BX42 1FS R ldca ISOAMSA bcz H\leftdowncurvedarrow a127 ARROW POINTING DOWNWARDS THEN CURVING LEFTWARDS &02937 E219 uni2937 D9D4 1X34 BX43 1FS R rdca ISOAMSA bcy H\rightdowncurvedarrow a128 ARROW POINTING DOWNWARDS THEN CURVING RIGHTWARDS &02938 E23E uni2938 EBCF 1X35 BX44 1DS R cudarrl ISOAMSA Q\cwrightarcarrow a133 RIGHT-SIDE ARC CLOCKWISE ARROW &02939 E23F uni2939 EBCE 1X36 BX45 1DS R cudarrr ISOAMSA Q\acwleftarcarrow a134 LEFT-SIDE ARC ANTICLOCKWISE ARROW &0293A ED21 uni293A BX46 1 S Q\acwoverarcarrow 0xEB08 5 4D TOP ARC ANTICLOCKWISE ARROW &0293B EA4D uni293B 1X38 BX47 1DS R Q\acwunderarcarrow rarrcurb a136 0xEB09 5 4E BOTTOM ARC ANTICLOCKWISE ARROW &0293C E249 uni293C D9A1 1X39 BX48 1DS R curarrm ISOAMSA H\curvearrowrightminus a131 0xEB17 2 7E TOP ARC CLOCKWISE ARROW WITH MINUS &0293D E24A uni293D D97E 1X3A BX49 1DS R cularrp ISOAMSA H\curvearrowleftplus a132 0xEB16 2 60 TOP ARC ANTICLOCKWISE ARROW WITH PLUS &0293E EA3E uni293E 1X37 BX4A 1DS R H\cwundercurvearrow larrcurb a135 2 7C LOWER RIGHT SEMICIRCULAR CLOCKWISE ARROW &0293F ED20 uni293F BX4B 1 S Q\ccwundercurvearrow 2 5C LOWER LEFT SEMICIRCULAR ANTICLOCKWISE ARROW &02940 E5A3 uni2940 EEF4?1X3B BX4C 1FS R olarr ISOAMSA bbp A\acwcirclearrow olarr larrcur a137 ANTICLOCKWISE CLOSED CIRCLE ARROW &02941 E5A4 uni2941 EEF5?1X3C BX4D 1FS R orarr ISOAMSA bbq A\cwcirclearrow orarr rarrcur a138 CLOCKWISE CLOSED CIRCLE ARROW &02942 E5A0 uni2942 1X3E BX4E 1FS R arrlrsl ba2 H\rightarrowshortleftarrow arrlrsl a119 0xEB01 RIGHTWARDS ARROW ABOVE SHORT LEFTWARDS ARROW &02943 EA07 uni2943 1X3D BX4F 1DS R arrllsr H\leftarrowshortrightarrow arrllsr a121 LEFTWARDS ARROW ABOVE SHORT RIGHTWARDS ARROW &02944 E5A1 uni2944 1X3F BX50 1FS R arrsrll ba3 H\shortrightarrowleftarrow a120 0xEB02 SHORT RIGHTWARDS ARROW ABOVE LEFTWARDS ARROW &02945 E21E uni2945 D9CD 1X40 BX51 1DS R rarrpl ISOAMSA H\rightarrowplus a099 RIGHTWARDS ARROW WITH PLUS BELOW &02946 E21F uni2946 D9AC 1X41 BX52 1DS R larrpl ISOAMSA H\leftarrowplus a100 LEFTWARDS ARROW WITH PLUS BELOW &02947 E5A2 uni2947 1X42 BX53 1FS R rarrx bbl H\rightarrowx a160 RIGHTWARDS ARROW THROUGH X &02948 E240 uni2948 D9A8 1X43 BX54 1DS R harrcir ISOAMSA H\leftrightarrowcircle a109 LEFT RIGHT ARROW THROUGH SMALL CIRCLE &02949 E237 uni2949 D9E4 1X44 BX55 1DS R Uarrocir ISOAMSA H\twoheaduparrowcircle a216 UPWARDS TWO-HEADED ARROW FROM SMALL CIRCLE &0294A E229 uni294A D9BA 1X46 BX57 1DS R lurdshar ISOAMSA H\leftrightharpoonupdown h018 0xEB37 LEFT BARB UP RIGHT BARB DOWN HARPOON &0294B E228 uni294B D9B3 1X47 BX58 1DS R ldrushar ISOAMSA H\leftrightharpoondownup h019 0xEB36 LEFT BARB DOWN RIGHT BARB UP HARPOON &0294C ED08 uni294C 1X48 BX59 1DS R urdlshar H\updownharpoonrightleft h038 UP BARB RIGHT DOWN BARB LEFT HARPOON &0294D ED09 uni294D 1X49 BX5A 1DS R uldrshar H\updownharpoonleftright h039 UP BARB LEFT DOWN BARB RIGHT HARPOON &0294E F505 uni294E 1X4A BX5B 1DS R lurushar H\leftrightharpoonupup LeftRightVector h020 0xEB1B LEFT BARB UP RIGHT BARB UP HARPOON &0294F F510 uni294F 1X4B BX5C 1DS R urdrshar H\updownharpoonrightright RightUpDownVector h040 0xEB1E UP BARB RIGHT DOWN BARB RIGHT HARPOON &02950 F50B uni2950 1X4C BX5D 1DS R ldrdshar H\leftrightharpoondowndown DownLeftRightVector h021 0xEB1C LEFT BARB DOWN RIGHT BARB DOWN HARPOON &02951 F515 uni2951 1X4D BX5E 1DS R uldlshar H\updownharpoonleftleft LeftUpDownVector h041 0xEB1D UP BARB LEFT DOWN BARB LEFT HARPOON &02952 F507 uni2952 1X4E BX5F 1DS R luharb H\barleftharpoonup LeftVectorBar h022 0xEB20 LEFTWARDS HARPOON WITH BARB UP TO BAR &02953 F508 uni2953 1X4F BX60 1DS R ruharb H\rightharpoonupbar RightVectorBar h023 0xEB21 RIGHTWARDS HARPOON WITH BARB UP TO BAR &02954 F511 uni2954 1X50 BX61 1DS R urharb H\barupharpoonright RightUpVectorBar h042 0xEB2A UPWARDS HARPOON WITH BARB RIGHT TO BAR &02955 F512 uni2955 1X51 BX62 1DS R drharb H\downharpoonrightbar RightDownVectorBar h043 0xEB2B DOWNWARDS HARPOON WITH BARB RIGHT TO BAR &02956 F50C uni2956 1X52 BX63 1DS R ldharb H\barleftharpoondown DownLeftVectorBar h026 0xEB22 LEFTWARDS HARPOON WITH BARB DOWN TO BAR &02957 F50D uni2957 1X53 BX64 1DS R rdharb H\rightharpoondownbar DownRightVectorBar h027 0xEB23 RIGHTWARDS HARPOON WITH BARB DOWN TO BAR &02958 F516 uni2958 1X54 BX65 1DS R ulharb H\barupharpoonleft LeftUpVectorBar h046 0xEB28 UPWARDS HARPOON WITH BARB LEFT TO BAR &02959 F517 uni2959 1X55 BX66 1DS R dlharb H\downharpoonleftbar LeftDownVectorBar h047 0xEB29 DOWNWARDS HARPOON WITH BARB LEFT TO BAR &0295A F509 uni295A 1X56 BX67 1DS R bluhar H\leftharpoonupbar LeftTeeVector h024 0xEB24 LEFTWARDS HARPOON WITH BARB UP FROM BAR &0295B F50A uni295B 1X57 BX68 1DS R bruhar H\barrightharpoonup RightTeeVector h025 0xEB25 RIGHTWARDS HARPOON WITH BARB UP FROM BAR &0295C F513 uni295C 1X58 BX69 1DS R burhar H\upharpoonrightbar RightUpTeeVector h044 0xEB2E UPWARDS HARPOON WITH BARB RIGHT FROM BAR &0295D F514 uni295D 1X59 BX6A 1DS R bdrhar H\bardownharpoonright RightDownTeeVector h045 0xEB2F DOWNWARDS HARPOON WITH BARB RIGHT FROM BAR &0295E F50E uni295E 1X5A BX6B 1DS R bldhar H\leftharpoondownbar DownLeftTeeVector h028 0xEB26 LEFTWARDS HARPOON WITH BARB DOWN FROM BAR &0295F F50F uni295F 1X5B BX6C 1DS R brdhar H\barrightharpoondown DownRightTeeVector h029 0xEB27 RIGHTWARDS HARPOON WITH BARB DOWN FROM BAR &02960 F518 uni2960 1X5C BX6D 1DS R bulhar H\upharpoonleftbar LeftUpTeeVector h048 0xEB2C UPWARDS HARPOON WITH BARB LEFT FROM BAR &02961 F519 uni2961 1X5D BX6E 1DS R bdlhar H\bardownharpoonleft LeftDownTeeVector h049 0xEB2D DOWNWARDS HARPOON WITH BARB LEFT FROM BAR &02962 E225 uni2962 D9B5 1X5E BX6F 1DS R lHar ISOAMSA H\leftharpoonsupdown h009 LEFTWARDS HARPOON WITH BARB UP ABOVE LEFTWARDS HARPOON WITH BARB DOWN &02963 E226 uni2963 D9E7 1X5F BX70 1DS R uHar ISOAMSA H\upharpoonsleftright h036 UPWARDS HARPOON WITH BARB LEFT BESIDE UPWARDS HARPOON WITH BARB RIGHT &02964 E224 uni2964 D9D7 1X60 BX71 1DS R rHar ISOAMSA H\rightharpoonsupdown h008 RIGHTWARDS HARPOON WITH BARB UP ABOVE RIGHTWARDS HARPOON WITH BARB DOWN &02965 E227 uni2965 D9A5 1X61 BX72 1DS R dHar ISOAMSA H\downharpoonsleftright h037 DOWNWARDS HARPOON WITH BARB LEFT BESIDE DOWNWARDS HARPOON WITH BARB RIGHT &02966 E22B uni2966 D9BB 1X62 BX73 1DS R luruhar ISOAMSA H\leftrightharpoonsup h011 LEFTWARDS HARPOON WITH BARB UP ABOVE RIGHTWARDS HARPOON WITH BARB UP &02967 E22C uni2967 D9B2 1X63 BX74 1DS R ldrdhar ISOAMSA H\leftrightharpoonsdown h012 LEFTWARDS HARPOON WITH BARB DOWN ABOVE RIGHTWARDS HARPOON WITH BARB DOWN &02968 E22A uni2968 D9DA 1X64 BX75 1DS R ruluhar ISOAMSA H\rightleftharpoonsup h010 RIGHTWARDS HARPOON WITH BARB UP ABOVE LEFTWARDS HARPOON WITH BARB UP &02969 E22D uni2969 D9D5 1X65 BX76 1DS R rdldhar ISOAMSA H\rightleftharpoonsdown h013 RIGHTWARDS HARPOON WITH BARB DOWN ABOVE LEFTWARDS HARPOON WITH BARB DOWN &0296A E22E uni296A D9B6 1X66 BX77 1DS R lharul ISOAMSA H\leftharpoonupdash h014 LEFTWARDS HARPOON WITH BARB UP ABOVE LONG DASH &0296B E231 uni296B D9B7 1X67 BX78 1DS R llhard ISOAMSA H\dashleftharpoondown h017 LEFTWARDS HARPOON WITH BARB DOWN BELOW LONG DASH &0296C E230 uni296C D9D8 1X68 BX79 1DS R rharul ISOAMSA H\rightharpoonupdash h016 RIGHTWARDS HARPOON WITH BARB UP ABOVE LONG DASH &0296D E22F uni296D D9B9 1X69 BX7A 1DS R lrhard ISOAMSA H\dashrightharpoondown h015 RIGHTWARDS HARPOON WITH BARB DOWN BELOW LONG DASH &0296E E218 uni296E D9E5 1X6A BX7B 1FS R udhar ISOAMSA bc2 H\updownharpoonsleftright UpEquilibrium h035 0xEB32 UPWARDS HARPOON WITH BARB LEFT BESIDE DOWNWARDS HARPOON WITH BARB RIGHT &0296F E217 uni296F D9A6 1X6B BX7C 1FS R duhar ISOAMSA bc1 H\downupharpoonsleftright ReverseUpEquilibrium h034 0xEB33 DOWNWARDS HARPOON WITH BARB LEFT BESIDE UPWARDS HARPOON WITH BARB RIGHT &02970 F524 uni2970 1X6C BX7D 1DS R rimply H\rightimply RoundImplies a218 0xE954 RIGHT DOUBLE ARROW WITH ROUNDED HEAD &02971 E236 uni2971 D9A7 1X70 BX7E 1DS R erarr ISOAMSA H\equalrightarrow a206 EQUALS SIGN ABOVE RIGHTWARDS ARROW &02972 E234 uni2972 2236 1X71 BX7F 1DS R simrarr ISOAMSA H\similarrightarrow a105 TILDE OPERATOR ABOVE RIGHTWARDS ARROW &02973 E24E uni2973 D9AD 1X73 BX80 1DS R larrsim ISOAMSA H\leftarrowsimilar a107 LEFTWARDS ARROW ABOVE TILDE OPERATOR &02974 E24D uni2974 D9CE 1X74 BX81 1DS R rarrsim ISOAMSA H\rightarrowsimilar a106 RIGHTWARDS ARROW ABOVE TILDE OPERATOR &02975 E235 uni2975 D9C9 1X72 BX82 1DS R rarrap ISOAMSA H\rightarrowapprox a207 RIGHTWARDS ARROW ABOVE ALMOST EQUAL TO &02976 E35E uni2976 D943 1X75 BX83 1DS R ltlarr ISOAMSR H\ltlarr r124 LESS-THAN ABOVE LEFTWARDS ARROW &02977 EA64 uni2977 1X76 BX84 1DS R H\leftarrowless tranless a155 LEFTWARDS ARROW THROUGH LESS-THAN &02978 E35F uni2978 D934 1X77 BX85 1DS R gtrarr ISOAMSR H\gtrarr r125 GREATER-THAN ABOVE RIGHTWARDS ARROW &02979 E33F uni2979 D956 1X78 BX86 1DS R subrarr ISOAMSR H\subrarr r177 SUBSET ABOVE RIGHTWARDS ARROW &0297A EA59 uni297A 1X79 BX87 1DS R H\leftarrowsubset transub a151 LEFTWARDS ARROW THROUGH SUBSET &0297B E340 uni297B D95E 1X7A BX88 1DS R suplarr ISOAMSR H\suplarr r186 SUPERSET ABOVE LEFTWARDS ARROW &0297C E214 uni297C D9B4 1X80 BX89 1FS R lfisht ISOAMSA bey H\leftfishtail nulst a067 LEFT FISH TAIL &0297D E215 uni297D D9D6 1X81 BX8A 1FS R rfisht ISOAMSA bdy H\rightfishtail a068 RIGHT FISH TAIL &0297E E24B uni297E D9E6 1X82 BX8B 1DS R ufisht ISOAMSA H\upfishtail a070 0xE98E UP FISH TAIL &0297F E24C uni297F D9A4 1X83 BX8C 1DS R dfisht ISOAMSA H\downfishtail a069 DOWN FISH TAIL &02980 E5AA uni2980 DX68 2FF tverbar bdm A\Vvert 0xE979 TRIPLE VERTICAL BAR DELIMITER &02981 F750 uni2981 DX69 1DN N scirclef Q\mdsmblkcircle FilledSmallCircle 0xE98F xx40 Z NOTATION SPOT &02982 EAA4 uni2982 DX6A 1DF F Q\typecolon xx2D Z NOTATION TYPE COLON &02983 EA43 uni2983 4X19 DX6B 1DF O locub Q\lBrace lopcub 3 6E LEFT WHITE CURLY BRACKET #02983 EA43 uni2983.lgdisplay1 4X19 DX6B 1DF O locub Q\lBrace lopcub 3 6E LEFT WHITE CURLY BRACKET #02983 EA43 uni2983.lgdisplay2 4X19 DX6B 1DF O locub Q\lBrace lopcub 3 6E LEFT WHITE CURLY BRACKET #02983 EA43 uni2983.lgdisplay3 4X19 DX6B 1DF O locub Q\lBrace lopcub 3 6E LEFT WHITE CURLY BRACKET #02983 EA43 uni2983.lgdisplay4 4X19 DX6B 1DF O locub Q\lBrace lopcub 3 6E LEFT WHITE CURLY BRACKET &02984 EA50 uni2984 4X1A DX6C 1DF C rocub Q\rBrace ropcub 3 6D RIGHT WHITE CURLY BRACKET #02984 EA50 uni2984.lgdisplay1 4X1A DX6C 1DF C rocub Q\rBrace ropcub 3 6D RIGHT WHITE CURLY BRACKET #02984 EA50 uni2984.lgdisplay2 4X1A DX6C 1DF C rocub Q\rBrace ropcub 3 6D RIGHT WHITE CURLY BRACKET #02984 EA50 uni2984.lgdisplay3 4X1A DX6C 1DF C rocub Q\rBrace ropcub 3 6D RIGHT WHITE CURLY BRACKET #02984 EA50 uni2984.lgdisplay4 4X1A DX6C 1DF C rocub Q\rBrace ropcub 3 6D RIGHT WHITE CURLY BRACKET &02985 E5A8 uni2985 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OVERBAR &02A43 E284 uni2A43 DBD0 2X63 CX60 1 S B ncap ISOAMSB Q\barcap INTERSECTION WITH OVERBAR &02A44 E281 uni2A44 DBBE 2X64 CX61 1 S B capand ISOAMSB Q\capwedge INTERSECTION WITH LOGICAL AND &02A45 E282 uni2A45 DBC8 2X65 CX62 1 S B cupor ISOAMSB Q\cupvee UNION WITH LOGICAL OR &02A46 E26E uni2A46 EBDA 2X66 CX63 1 S B cupcap ISOAMSB Q\cupovercap UNION ABOVE INTERSECTION &02A47 E26F uni2A47 DBC1 2X67 CX64 1 S B capcup ISOAMSB Q\capovercup INTERSECTION ABOVE UNION &02A48 E270 uni2A48 DBC6 2X68 CX65 1 S B cupbrcap ISOAMSB Q\cupbarcap UNION ABOVE BAR ABOVE INTERSECTION &02A49 E271 uni2A49 DBBF 2X69 CX66 1 S B capbrcup ISOAMSB Q\capbarcup INTERSECTION ABOVE BAR ABOVE UNION &02A4A E272 uni2A4A DBC7 2X6A CX67 1 S B cupcup ISOAMSB Q\twocups UNION BESIDE AND JOINED WITH UNION &02A4B E273 uni2A4B DBC0 2X6B CX68 1 S B capcap ISOAMSB Q\twocaps INTERSECTION BESIDE AND JOINED WITH INTERSECTION &02A4C E278 uni2A4C DBC4 2X6E CX6B 1 S B ccups ISOAMSB Q\closedvarcup CLOSED UNION WITH SERIFS &02A4D E279 uni2A4D DBC3 2X6F CX6C 1 S B ccaps ISOAMSB Q\closedvarcap CLOSED INTERSECTION WITH SERIFS &02A4E ED85 uni2A4E CX6D 1 S B Q\Sqcap 0xE921 DOUBLE SQUARE INTERSECTION &02A4F ED86 uni2A4F CX6E 1 S B Q\Sqcup 0xE920 DOUBLE SQUARE UNION &02A50 E27A uni2A50 DBC5 2X72 CX71 1 S B ccupssm ISOAMSB Q\closedvarcupsmashprod CLOSED UNION WITH SERIFS AND SMASH PRODUCT &02A51 E3CA uni2A51 2X73 CX72 1 S B Q\wedgeodot LOGICAL AND WITH DOT ABOVE &02A52 E3CB uni2A52 2X74 CX73 1 S B Q\veeodot LOGICAL OR WITH DOT ABOVE &02A53 E374 uni2A53 DB3C 2X75 CX74 1FS B And ISOTECH bip Q\Wedge 0xE95D 3 C1 DOUBLE LOGICAL AND &02A54 E375 uni2A54 DB6C 2X76 CX75 1FS B Or ISOTECH bio Q\Vee 0xE95C 3 AA DOUBLE LOGICAL OR &02A55 E36E uni2A55 DB3D 2X77 CX76 1FS B andand ISOTECH bir Q\wedgeonwedge TWO INTERSECTING LOGICAL AND &02A56 E36F uni2A56 DB6F 2X78 CX77 1FS B oror ISOTECH biq Q\veeonvee TWO INTERSECTING LOGICAL OR &02A57 E3AE uni2A57 DB70 2X79 CX78 1 S B orslope ISOTECH Q\bigslopedvee SLOPING LARGE OR &02A58 E3AF uni2A58 DB3F 2X7A CX79 1 S B andslope ISOTECH Q\bigslopedwedge SLOPING LARGE AND &02A59 ED84 uni2A59 CX7A 1 S R Q\veeonwedge 0xE96F LOGICAL OR OVERLAPPING LOGICAL AND &02A5A E391 uni2A5A DB40 2X7B CX7B 1 S B andv ISOTECH Q\wedgemidvert LOGICAL AND WITH MIDDLE STEM &02A5B E392 uni2A5B DB71 2X7C CX7C 1 S B orv ISOTECH Q\veemidvert LOGICAL OR WITH MIDDLE STEM &02A5C E394 uni2A5C DB3E 2X7E CX7D 1 S B andd ISOTECH Q\midbarwedge LOGICAL AND WITH HORIZONTAL DASH &02A5D E393 uni2A5D DB6D 2X7D CX7E 1 S B ord ISOTECH Q\midbarvee LOGICAL OR WITH HORIZONTAL DASH &02A5E E5C8 uni2A5E 2X7F CX7F 2FR B Barwed biz A\doublebarwedge 3 B0 LOGICAL AND WITH DOUBLE OVERBAR &02A5F E265 uni2A5F DBF1 2X80 CX80 1FS B wedbar ISOAMSB bts Q\wedgebar 5 30 LOGICAL AND WITH UNDERBAR &02A60 ED45 uni2A60 CX81 1 S B wedBar Q\wedgedoublebar 5 3D LOGICAL AND WITH DOUBLE UNDERBAR &02A61 E3B0 uni2A61 EEDB 2X81 CX82 1 S B veebar ISOAMSB Q\varveebar 0xE95F SMALL VEE WITH UNDERBAR &02A62 ED44 uni2A62 CX83 1 S B Barvee Q\doublebarvee 0xE900 5 2D LOGICAL OR WITH DOUBLE OVERBAR &02A63 E5C7 uni2A63 2X82 CX84 2FR B veeBar biy Q\veedoublebar 0xE95E 3 A4 LOGICAL OR WITH DOUBLE UNDERBAR &02A64 EAAA uni2A64 CX85 1DS B Z\dsub 0xE964 xx6F Z NOTATION DOMAIN ANTIRESTRICTION &02A65 EAAB uni2A65 CX86 1DS B Z\rsub 0xE965 xx7F Z NOTATION RANGE ANTIRESTRICTION &02A66 E319 uni2A66 D94B 3X00 CX87 2DR R sdote ISOAMSR Q\eqdot r079 0xE918 6 39 EQUALS SIGN WITH DOT BELOW &02A67 ED5A uni2A67 CX8B 2 R R Q\dotequiv 0xE92C IDENTICAL WITH DOT ABOVE &02A68 ED9A uni2A68 CX8D 1 S Q\equivVert 0xE991 3 22 TRIPLE HORIZONTAL BAR WITH DOUBLE VERTICAL STROKE &02A69 ED9B uni2A69 CX8E 1 S Q\equivVvert 0xE995 3 7D TRIPLE HORIZONTAL BAR WITH TRIPLE VERTICAL STROKE &02A6A E38B uni2A6A DB78 3X04 CX92 2DR R simdot ISOTECH Q\dotsim r161 0xE924 5 6A TILDE OPERATOR WITH DOT ABOVE &02A6B ED50 uni2A6B CX94 1 S R Q\simrdots 0xE925 5 6B TILDE OPERATOR WITH RISING DOTS &02A6C ED53 uni2A6C CX97 1 S R Q\simminussim 0xE91F 5 68 SIMILAR MINUS SIMILAR &02A6D E314 uni2A6D DBF7 3X07 CX9E 2DR R congdot ISOAMSR H\congdot r075 CONGRUENT WITH DOT ABOVE &02A6E uni2A6E DBFC 2DR R easter ISOAMSR Q\asteq EQUALS WITH ASTERISK &02A6F E38C uni2A6F DB41 3X0A CXA1 2 R R apacir ISOTECH Q\hatapprox r141 ALMOST EQUAL TO WITH CIRCUMFLEX ACCENT &02A70 E315 uni2A70 DBF2 3X0B CXA2 2DR R apE ISOAMSR H\approxeqq r076 0xE962 3 3F APPROXIMATELY EQUAL OR EQUAL TO &02A71 E268 uni2A71 DBCA 3X0D CXA6 2 R B eplus ISOAMSB Q\eqqplus 0xE902 5 32 EQUALS SIGN ABOVE PLUS SIGN &02A72 E267 uni2A72 DBDE 3X0E CXA7 2 R B pluse ISOAMSB Q\pluseqq 0xE901 5 31 PLUS SIGN ABOVE EQUALS SIGN &02A73 E317 uni2A73 D925 3X0F CXA8 2DR R Esim ISOAMSR H\eqqsim r077 EQUALS SIGN ABOVE TILDE OPERATOR &02A74 E30E uni2A74 DBF6 3X10 CXA9 1DS R Colone ISOAMSR H\Coloneq r074 DOUBLE COLON EQUAL &02A75 F431 uni2A75 3X11 CXAA 1DS R eqeq H\eqeq Equal r145 0xE94B TWO CONSECUTIVE EQUALS SIGNS &02A76 ED5E uni2A76 CXAB 1 S R Q\eqeqeq 0xE94C THREE CONSECUTIVE EQUALS SIGNS &02A77 E309 uni2A77 DBFD 3X12 CXAC 1FS R eDDot ISOAMSR bqv A\ddotseq r070 EQUALS SIGN WITH TWO DOTS ABOVE AND TWO DOTS BELOW &02A78 E318 uni2A78 D924 3X13 CXAD 1DS R equivDD ISOAMSR H\equivDD r078 EQUIVALENT WITH FOUR DOTS ABOVE &02A79 E325 uni2A79 D942 3X14 CXAE 1DS R ltcir ISOAMSR H\ltcir r091 LESS-THAN WITH CIRCLE INSIDE &02A7A E326 uni2A7A D932 3X15 CXAF 1DS R gtcir ISOAMSR H\gtcir r092 GREATER-THAN WITH CIRCLE INSIDE &02A7B E329 uni2A7B D944 3X16 CXB0 1DS R ltquest ISOAMSR H\ltquest r093 LESS-THAN WITH QUESTION MARK ABOVE &02A7C E32A uni2A7C D933 3X17 CXB1 1DS R gtquest ISOAMSR H\gtquest r094 GREATER-THAN WITH QUESTION MARK ABOVE &02A7D E2FA uni2A7D 2172 3X18 CXB2 2FR R les ISOAMSR bkb A\leqslant les les les LessSlantEqual r062 1 3C LESS-THAN OR SLANTED EQUAL TO &02A7E E2F6 uni2A7E 2173 3X19 CXB3 2FR R ges ISOAMSR bmb A\geqslant ges ges ges GreaterSlantEqual r058 1 3E GREATER-THAN OR SLANTED EQUAL TO &02A7F E31D uni2A7F D939 3X1A CXB4 1DS R lesdot ISOAMSR H\lesdot r083 LESS-THAN OR SLANTED EQUAL TO WITH DOT INSIDE &02A80 E31E uni2A80 D927 3X1B CXB5 1DS R gesdot ISOAMSR H\gesdot r084 GREATER-THAN OR SLANTED EQUAL TO WITH DOT INSIDE &02A81 E31F uni2A81 D93A 3X1C CXB6 1DS R lesdoto ISOAMSR H\lesdoto r085 LESS-THAN OR SLANTED EQUAL TO WITH DOT ABOVE &02A82 E320 uni2A82 D928 3X1D CXB7 1DS R gesdoto ISOAMSR H\gesdoto r086 GREATER-THAN OR SLANTED EQUAL TO WITH DOT ABOVE &02A83 E321 uni2A83 D93B 3X1E CXB8 1DS R lesdotor ISOAMSR H\lesdotor r087 LESS-THAN OR SLANTED EQUAL TO WITH DOT ABOVE RIGHT &02A84 E322 uni2A84 D929 3X1F CXB9 1DS R gesdotol ISOAMSR H\gesdotol r088 GREATER-THAN OR SLANTED EQUAL TO WITH DOT ABOVE LEFT &02A85 E2F8 uni2A85 2163 3X20 CXBC 1FS R lap ISOAMSR bkg A\lessapprox lap \loa r060 0xE932 LESS-THAN OR APPROXIMATE &02A86 E2F4 uni2A86 2164 3X21 CXBD 1FS R gap ISOAMSR bmg A\gtrapprox gap \goa r056 0xE933 GREATER-THAN OR APPROXIMATE &02A87 E2A3 uni2A87 21E2 3X22 CXBE 2FR R lne ISOAMSN bld A\lneq lne n169 0xEA34 LESS-THAN AND SINGLE-LINE NOT EQUAL TO &02A88 E2A0 uni2A88 21E3 3X23 CXBF 2FR R gne ISOAMSN bnd A\gneq gne n170 0xEA35 GREATER-THAN AND SINGLE-LINE NOT EQUAL TO &02A89 E2A2 uni2A89 21F6 3X24 CXC2 2FR R lnap ISOAMSN blg A\lnapprox lnap n060 0xEA32 LESS-THAN AND NOT APPROXIMATE &02A8A E29F uni2A8A 21F7 3X25 CXC3 2FR R gnap ISOAMSN bng A\gnapprox gnap n056 0xEA33 GREATER-THAN AND NOT APPROXIMATE &02A8B E2F9 uni2A8B 2174 3X2C CXD2 1FS R lEg ISOAMSR bkk A\lesseqqgtr lEg r061 0xE922 5 62 LESS-THAN ABOVE DOUBLE-LINE EQUAL ABOVE GREATER-THAN &02A8C E2F5 uni2A8C 2175 3X2D CXD3 1FS R gEl ISOAMSR bmk A\gtreqqless gEl r057 0xE92D 5 76 GREATER-THAN ABOVE DOUBLE-LINE EQUAL ABOVE LESS-THAN &02A8D E333 uni2A8D D93F 3X2E CXD4 1DS R lsime ISOAMSR H\lsime \lse r103 LESS-THAN ABOVE SIMILAR OR EQUAL &02A8E E334 uni2A8E D92F 3X2F CXD5 1DS R gsime ISOAMSR H\gsime \gse r104 GREATER-THAN ABOVE SIMILAR OR EQUAL &02A8F E335 uni2A8F D940 3X30 CXD6 1DS R lsimg ISOAMSR H\lsimg r105 0xE9F0 LESS-THAN ABOVE SIMILAR ABOVE GREATER-THAN &02A90 E336 uni2A90 D930 3X31 CXD7 1DS R gsiml ISOAMSR H\gsiml r106 0xE9F1 GREATER-THAN ABOVE SIMILAR ABOVE LESS-THAN &02A91 E32D uni2A91 D93E 3X32 CXD8 1DS R lgE ISOAMSR H\lgE r097 0xE926 5 6D LESS-THAN ABOVE GREATER-THAN ABOVE DOUBLE-LINE EQUAL &02A92 E32E uni2A92 D92D 3X33 CXD9 1DS R glE ISOAMSR H\glE r098 0xE927 5 6E GREATER-THAN ABOVE LESS-THAN ABOVE DOUBLE-LINE EQUAL &02A93 E331 uni2A93 D93D 3X34 CXDA 1DS R lesges ISOAMSR H\lesges r101 LESS-THAN ABOVE SLANTED EQUAL ABOVE GREATER-THAN ABOVE SLANTED EQUAL &02A94 E332 uni2A94 D92B 3X35 CXDB 1DS R gesles ISOAMSR H\gesles r102 GREATER-THAN ABOVE SLANTED EQUAL ABOVE LESS-THAN ABOVE SLANTED EQUAL &02A95 E5CF uni2A95 2160 3X36 CXDE 2FR R els ISOAMSR bkc A\eqslantless els r126 0xE90D 5 65 SLANTED EQUAL TO OR LESS-THAN &02A96 E5DF uni2A96 2161 3X37 CXDF 2FR R egs ISOAMSR bmc A\eqslantgtr egs r127 0x22DD 5 72 SLANTED EQUAL TO OR GREATER-THAN &02A97 E323 uni2A97 D923 3X38 CXE4 1DS R elsdot ISOAMSR H\elsdot r089 SLANTED EQUAL TO OR LESS-THAN WITH DOT INSIDE &02A98 E324 uni2A98 D921 3X39 CXE5 1DS R egsdot ISOAMSR H\egsdot r090 SLANTED EQUAL TO OR GREATER-THAN WITH DOT INSIDE &02A99 ED68 uni2A99 CXE6 1 S R Q\eqqless 0xE909 5 74 DOUBLE-LINE EQUAL TO OR LESS-THAN &02A9A ED69 uni2A9A CXE7 1 S R Q\eqqgtr 0xE913 5 79 DOUBLE-LINE EQUAL TO OR GREATER-THAN &02A9B ED6A uni2A9B CXE8 1DS R Q\eqqslantless DOUBLE-LINE SLANTED EQUAL TO OR LESS-THAN &02A9C ED6B uni2A9C CXE9 1DS R Q\eqqslantgtr 0xE908 DOUBLE-LINE SLANTED EQUAL TO OR GREATER-THAN &02A9D E30B uni2A9D D94E 3X3A CXEE 1FS R siml ISOAMSR bkh H\simless siml \sol r072 0xE928 5 75 SIMILAR OR LESS-THAN &02A9E E30C uni2A9E D94C 3X3B CXEF 2FR R simg ISOAMSR bmh H\simgtr simg \sog r073 0xE929 5 69 SIMILAR OR GREATER-THAN &02A9F E337 uni2A9F D94F 3X3C CXF2 1DS R simlE ISOAMSR H\simlE r107 SIMILAR ABOVE LESS-THAN ABOVE EQUALS SIGN &02AA0 E338 uni2AA0 D94D 3X3D CXF3 1DS R simgE ISOAMSR H\simgE r108 SIMILAR ABOVE GREATER-THAN ABOVE EQUALS SIGN &02AA1 E2FB uni2AA1 EF42 3X40 CXF4 1FS R Lt ISOAMSR bkl H\Lt NestedLessLess r063 0xE936 1 21 DOUBLE NESTED LESS-THAN &02AA2 E2F7 uni2AA2 EF43 3X41 CXF5 1FS R Gt ISOAMSR bml H\Gt NestedGreaterGreater r059 0xE937 1 40 DOUBLE NESTED GREATER-THAN &02AA3 E840 uni2AA3 3X42 CXF6 1DS R Ltbar A\partialmeetcontraction r143 DOUBLE LESS-THAN WITH UNDERBAR &02AA4 E32F uni2AA4 D92E 3X49 DX00 1DS R glj ISOAMSR H\glj r099 0xE96E GREATER-THAN OVERLAPPING LESS-THAN &02AA5 E330 uni2AA5 D92C 3X4A DX01 1DS R gla ISOAMSR H\gla r100 GREATER-THAN BESIDE LESS-THAN &02AA6 E355 uni2AA6 D941 3X4B DX02 1DS R ltcc ISOAMSR H\ltcc r115 LESS-THAN CLOSED BY CURVE &02AA7 E356 uni2AA7 D931 3X4C DX03 1DS R gtcc ISOAMSR H\gtcc r116 GREATER-THAN CLOSED BY CURVE &02AA8 E357 uni2AA8 D938 3X4D DX04 1DS R lescc ISOAMSR H\lescc r117 LESS-THAN CLOSED BY CURVE ABOVE SLANTED EQUAL &02AA9 E358 uni2AA9 D926 3X4E DX05 1DS R gescc ISOAMSR H\gescc r118 GREATER-THAN CLOSED BY CURVE ABOVE SLANTED EQUAL &02AAA E339 uni2AAA D950 3X50 DX06 1DS R smt ISOAMSR H\smt smt r109 SMALLER THAN &02AAB E33A uni2AAB D935 3X51 DX07 1DS R lat ISOAMSR H\lat lat r110 LARGER THAN &02AAC E33B uni2AAC D951 3X52 DX08 1DS R smte ISOAMSR H\smte r111 SMALLER THAN OR EQUAL TO &02AAD E33C uni2AAD D936 3X53 DX09 1DS R late ISOAMSR H\late r112 LARGER THAN OR EQUAL TO &02AAE E316 uni2AAE DBF5 3X58 DX0E 1DS R bumpE ISOAMSR H\bumpeqq r140 0xE96D EQUALS SIGN WITH BUMPY ABOVE &02AAF E2FE uni2AAF 2265 3X61 DX0F 1FS R pre ISOAMSR bkt P\preceq pre \preceq PrecedesEqual r065 PRECEDES ABOVE SINGLE-LINE EQUALS SIGN &02AB0 E300 uni2AB0 2266 3X60 DX10 1FS R sce ISOAMSR bmt P\succeq sce \succeq SucceedsEqual r067 SUCCEEDS ABOVE SINGLE-LINE EQUALS SIGN &02AB1 ED74 uni2AB1 DX11 1 S R Q\precneq 0xEA3C PRECEDES ABOVE SINGLE-LINE NOT EQUAL TO &02AB2 ED75 uni2AB2 DX12 1 S R Q\succneq 0xEA3D SUCCEEDS ABOVE SINGLE-LINE NOT EQUAL TO &02AB3 E35A uni2AB3 D84A 3X62 DX13 1DS R prE ISOAMSR X\preceqq r120 0xE940 PRECEDES ABOVE EQUALS SIGN &02AB4 E35B uni2AB4 D94A 3X63 DX14 1DS R scE ISOAMSR X\succeqq r121 0xE941 SUCCEEDS ABOVE EQUALS SIGN &02AB5 E2B3 uni2AB5 21D4 3X64 DX15 1FS R prnE ISOAMSN blt A\precneqq prnE n120 0xEA40 PRECEDES ABOVE NOT EQUAL TO &02AB6 E2B5 uni2AB6 21D5 3X65 DX16 1FS R scnE ISOAMSN bnt A\succneqq scnE n121 0xEA41 SUCCEEDS ABOVE NOT EQUAL TO &02AB7 E2FD uni2AB7 21A3 3X67 DX17 1FS R prap ISOAMSR bks A\precapprox prap r064 0xE93A PRECEDES ABOVE ALMOST EQUAL TO &02AB8 E2FF uni2AB8 21A4 3X66 DX18 1FS R scap ISOAMSR bms A\succapprox scap r066 0xE93B SUCCEEDS ABOVE ALMOST EQUAL TO &02AB9 E2B2 uni2AB9 21B3 3X68 DX19 1FS R prnap ISOAMSN bls A\precnapprox prnap n064 0xEA3A PRECEDES ABOVE NOT ALMOST EQUAL TO &02ABA E2B4 uni2ABA 21B4 3X69 DX1A 1FS R scnap ISOAMSN bns A\succnapprox scnap n066 0xEA3B SUCCEEDS ABOVE NOT ALMOST EQUAL TO &02ABB E35C uni2ABB D849 3X6E DX25 1DS R Pr ISOAMSR Q\Prec r122 DOUBLE PRECEDES &02ABC E35D uni2ABC D949 3X6F DX26 1DS R Sc ISOAMSR Q\Succ r123 DOUBLE SUCCEEDS &02ABD E262 uni2ABD EB33 3X70 DX29 2DR R subdot ISOAMSB H\subsetdot r184 0xE917 4 26 SUBSET WITH DOT &02ABE E263 uni2ABE DBE9 3X71 DX2A 2DR R supdot ISOAMSB H\supsetdot r185 0xE916 4 2A SUPERSET WITH DOT &02ABF E341 uni2ABF D955 3X72 DX2B 1DS R subplus ISOAMSR H\subsetplus subplus r187 SUBSET WITH PLUS SIGN BELOW &02AC0 E342 uni2AC0 D960 3X73 DX2C 1DS R supplus ISOAMSR H\supsetplus supplus r188 SUPERSET WITH PLUS SIGN BELOW &02AC1 E343 uni2AC1 D954 3X74 DX2D 1DS R submult ISOAMSR H\submult r189 SUBSET WITH MULTIPLICATION SIGN BELOW &02AC2 E344 uni2AC2 D95F 3X75 DX2E 1DS R supmult ISOAMSR H\supmult r190 SUPERSET WITH MULTIPLICATION SIGN BELOW &02AC3 E34F uni2AC3 D953 3X76 DX31 1DS R subedot ISOAMSR H\subedot r201 SUBSET OF OR EQUAL TO WITH DOT ABOVE &02AC4 E350 uni2AC4 D95B 3X77 DX32 1DS R supedot ISOAMSR H\supedot r202 SUPERSET OF OR EQUAL TO WITH DOT ABOVE &02AC5 E304 uni2AC5 215C 3X78 DX33 2FR R subE ISOAMSR bog A\subseteqq subE r175 0xE90C 5 37 SUBSET OF ABOVE EQUALS SIGN &02AC6 E305 uni2AC6 215D 3X79 DX34 2FR R supE ISOAMSR bqg A\supseteqq supE r176 0xE90B 5 38 SUPERSET OF ABOVE EQUALS SIGN &02AC7 E345 uni2AC7 D957 3X7A DX35 1DS R subsim ISOAMSR H\subsim r191 0xE915 4 25 SUBSET OF ABOVE TILDE OPERATOR &02AC8 E346 uni2AC8 D961 3X7B DX36 1DS R supsim ISOAMSR H\supsim r192 0xE914 4 5E SUPERSET OF ABOVE TILDE OPERATOR &02AC9 ED80 uni2AC9 DX37 1 S R Q\subsetapprox 0xE958 SUBSET OF ABOVE ALMOST EQUAL TO &02ACA ED81 uni2ACA DX38 1 S R Q\supsetapprox 0xE957 SUPERSET OF ABOVE ALMOST EQUAL TO &02ACB E2B6 uni2ACB 21C1 3X7E DX3B 1FS R subnE ISOAMSN bpg A\subsetneqq subnE subne n197 0xEA44 SUBSET OF ABOVE NOT EQUAL TO &02ACC E2B7 uni2ACC 21C2 3X7F DX3C 1FS R supnE ISOAMSN brg A\supsetneqq supnE supne n198 0xEA45 SUPERSET OF ABOVE NOT EQUAL TO &02ACD ED87 uni2ACD DX45 1 S R Q\lsqhook 0xE92A 5 71 SQUARE LEFT OPEN BOX OPERATOR &02ACE ED88 uni2ACE DX46 1 S R Q\rsqhook 0xE92B 5 77 SQUARE RIGHT OPEN BOX OPERATOR &02ACF E351 uni2ACF DBF8 3X86 DX47 1DS R csub ISOAMSR H\csub r203 CLOSED SUBSET &02AD0 E352 uni2AD0 DBFA 3X87 DX48 1DS R csup ISOAMSR H\csup r204 CLOSED SUPERSET &02AD1 E353 uni2AD1 DBF9 3X88 DX49 1DS R csube ISOAMSR H\csube r205 CLOSED SUBSET OR EQUAL TO &02AD2 E354 uni2AD2 DBFB 3X89 DX4A 1DS R csupe ISOAMSR H\csupe r206 CLOSED SUPERSET OR EQUAL TO &02AD3 E347 uni2AD3 D959 3X8A DX4B 1DS R subsup ISOAMSR H\subsup r193 0xE973 4 5F SUBSET ABOVE SUPERSET &02AD4 E348 uni2AD4 D962 3X8B DX4C 1DS R supsub ISOAMSR H\supsub r194 0xE972 4 2B SUPERSET ABOVE SUBSET &02AD5 E349 uni2AD5 D958 3X8C DX4D 1DS R subsub ISOAMSR H\subsub r195 0xE971 4 28 SUBSET ABOVE SUBSET &02AD6 E34A uni2AD6 D963 3X8D DX4E 1DS R supsup ISOAMSR H\supsup r196 0xE970 4 29 SUPERSET ABOVE SUPERSET &02AD7 E34B uni2AD7 D95D 3X8E DX4F 1DS R suphsub ISOAMSR H\suphsub r197 SUPERSET BESIDE SUBSET &02AD8 E34C uni2AD8 D95A 3X8F DX50 1DS R supdsub ISOAMSR H\supdsub r198 SUPERSET BESIDE AND JOINED BY DASH WITH SUBSET &02AD9 E31B uni2AD9 DB2E 3X90 DX51 1DS R forkv ISOAMSR H\forkv r081 ELEMENT OF OPENING DOWNWARDS &02ADA E31C uni2ADA D964 3X91 DX52 1DS R topfork ISOAMSR H\topfork r082 PITCHFORK WITH TEE TOP &02ADB E30A uni2ADB D946 3X92 DX53 1DS R mlcp ISOAMSR A\mlcp r071 TRANSVERSAL INTERSECTION &02ADC E81A uni2ADC 3X93 DX54 1DS R A\forks r142 FORKING &02ADD E81B uni2ADD 3X94 DX55 1DS R A\forksnot n142 NONFORKING &02ADE ED91 uni2ADE DX56 1 S R Q\shortlefttack 0xE94A 6 A2 SHORT LEFT TACK &02ADF ED92 uni2ADF DX57 1 S R Q\shortdowntack 6 AA SHORT DOWN TACK &02AE0 ED90 uni2AE0 DX58 1 S R Q\shortuptack 6 3E SHORT UP TACK &02AE1 ED94 uni2AE1 DX59 1 N Q\perps 0xE98A 6 22 PERPENDICULAR WITH S &02AE2 E3C4 uni2AE2 EBD4 4X00 DX5A 1DS R vDdash Q\vDdash r234 VERTICAL BAR TRIPLE RIGHT TURNSTILE &02AE3 E813 uni2AE3 4X01 DX5B 1DS R dashV A\dashV r249 0xE97C DOUBLE VERTICAL BAR LEFT TURNSTILE &02AE4 E30F uni2AE4 EF39 4X02 DX5C 1DS R Dashv ISOAMSR A\Dashv DoubleLeftTee r243 0xE97F VERTICAL BAR DOUBLE LEFT TURNSTILE &02AE5 ED93 uni2AE5 DX5D 1 S R Q\DashV 0xE97D DOUBLE VERTICAL BAR DOUBLE LEFT TURNSTILE &02AE6 E313 uni2AE6 D968 4X03 DX5E 1 S R Vdashl ISOAMSR Q\varVdash r252 LONG DASH FROM LEFT MEMBER OF DOUBLE VERTICAL &02AE7 E311 uni2AE7 DBF3 4X06 DX61 1DS R Barv ISOAMSR H\Barv r250 SHORT DOWN TACK WITH OVERBAR &02AE8 E310 uni2AE8 D965 4X07 DX62 1DS R vBar ISOAMSR H\vBar r244 0xE97B SHORT UP TACK WITH UNDERBAR &02AE9 E312 uni2AE9 D966 4X08 DX63 1DS R vBarv ISOAMSR H\vBarv r251 0xE97E SHORT UP TACK ABOVE SHORT DOWN TACK &02AEA E3B7 uni2AEA DB33 4X09 DX64 1DS R barV H\barV r246 DOUBLE DOWN TACK &02AEB E30D uni2AEB DB34 4X0A DX65 1FS R Vbar ISOAMSR bdr H\Vbar Vbar r242 DOUBLE UP TACK &02AEC E3AC uni2AEC DB60 4X0B DX66 1DS R Not ISOTECH H\Not DOUBLE STROKE NOT SIGN &02AED E3AD uni2AED DB46 4X0C DX67 1DS R bNot ISOTECH H\bNot REVERSED DOUBLE STROKE NOT SIGN &02AEE E2D1 uni2AEE D97B 4X40 DX83 1 S R rnmid ISOAMSN Q\revnmid n003 DOES NOT DIVIDE WITH REVERSED NEGATION SLASH &02AEF E250 uni2AEF D97D 4X41 DX84 1 S R cirmid ISOAMSA E\cirmid r233 VERTICAL LINE WITH CIRCLE ABOVE &02AF0 E24F uni2AF0 EBDC 4X42 DX85 1 S R midcir ISOAMSA E\midcir r232 0xE996 VERTICAL LINE WITH CIRCLE BELOW &02AF1 E383 uni2AF1 DB7A 4X43 DX86 1 N N topcir ISOTECH E\topcir DOWN TACK WITH CIRCLE BELOW &02AF2 E38D uni2AF2 DB5C DX87 1 S R nhpar ISOTECH E\nhpar n004 PARALLEL WITH HORIZONTAL STROKE &02AF3 E2C8 uni2AF3 D97A 4X44 DX88 1 S R parsim ISOAMSN E\parsim r155 PARALLEL WITH TILDE OPERATOR &02AF4 E824 uni2AF4 4X47 DX8B 1DS B vert3 S\interleave 0xE930 TRIPLE VERTICAL BAR BINARY RELATION &02AF5 ED99 uni2AF5 DX8D 1 S B Q\nhVvert 0xE993 3 5D TRIPLE VERTICAL BAR WITH HORIZONTAL STROKE &02AF6 E5B0 uni2AF6 4X49 DX8F 1FN B vellipv bek Q\threedotcolon TRIPLE COLON OPERATOR &02AF7 ED9C uni2AF7 1 S R Q\lllnest STACKED VERY MUCH LESS-THAN &02AF8 ED9D uni2AF8 1 S R Q\gggnest STACKED VERY MUCH GREATER-THAN &02AF9 uni2AF9 1 R Q\leqqslant DOUBLE-LINE SLANTED LESS-THAN OR EQUAL TO &02AFA uni2AFA 1 R Q\geqqslant DOUBLE-LINE SLANTED GREATER-THAN OR EQUAL TO &02AFB uni2AFB 1 B Q\trslash TRIPLE SOLIDUS BINARY RELATION +02AFB E647 uni2AFB 0FZ A pk1 Q\texttripleslash triple slash (phonetic symbol) &02AFC uni2AFC 1 L S\biginterleave LARGE TRIPLE VERTICAL BAR OPERATOR #02AFC uni2AFC.lgdisplay 1 L S\biginterleave LARGE TRIPLE VERTICAL BAR OPERATOR &02AFD E382 uni2AFD EF48 4X45 1DS B parsl ISOTECH S\sslash \dslash r152 0xE981 DOUBLE SOLIDUS OPERATOR +02AFD E643 uni2AFD 0FZ A pj1 Q\textdoubleslash double slash (phonetic symbol) &02AFE uni2AFE 1 B S\talloblong WHITE VERTICAL BAR &02AFF uni2AFF 1 L Q\bigtalloblong N-ARY WHITE VERTICAL BAR P02B12 E5B6 uni2B12 ____ 1FN N squarft ISOPUB bfv Q\squaretopblack sqts SQUARE WITH TOP HALF BLACK P02B13 E5B7 uni2B13 ____ 1FN N squarfb ISOPUB bfw Q\squarebotblack sqbs SQUARE WITH BOTTOM HALF BLACK W02B14 E5B4 uni2B14 ____ 1FN N squarftr ISOPUB bfp Q\squareurblack squftopr \semaphorer SQUARE WITH UPPER RIGHT DIAGONAL HALF BLACK W02B15 E5B5 uni2B15 ____ 1FN N squarfbl ISOPUB bfr Q\squarellblack squfbtml sqlls \semaphorel SQUARE WITH LOWER LEFT DIAGONAL HALF BLACK W02B16 E5B9 uni2B16 ____ 1FN N diamonfl ISOPUB bgg Q\diamondleftblack DIAMOND WITH LEFT HALF BLACK W02B17 E5BA uni2B17 ____ 1FN N diamonfr ISOPUB bgh Q\diamondrightblack DIAMOND WITH RIGHT HALF BLACK W02B18 E4FF uni2B18 ____ 1DN N diamonft ISOPUB Q\diamondtopblack diamftop DIAMOND WITH TOP HALF BLACK W02B19 E4FC uni2B19 ____ 1DN N diamonfb ISOPUB Q\diamondbotblack diamfbtm DIAMOND WITH BOTTOM HALF BLACK X02B1A F751 uni2B1A 1DN N Q\dottedsquare DottedSquare DOTTED SQUARE W02B20 E5F2 uni2B20 DB2D 1FN N pentagon bo1 W\pentagon WHITE PENTAGON W02B21 E43C uni2B21 ____ 1DN N benzen ISOCHEM W\varhexagon hexago 0xE9A5 WHITE HEXAGON W02B22 EB02 uni2B22 1DN N hexagf Q\varhexagonblack hexags BLACK HEXAGON W02B23 EB00 uni2B23 1DN N hhexagf Q\hexagonblack hexagfs HORIZONTAL BLACK HEXAGON =0300A 27EA uni300A 0 N\lAngle left angle bracket, double =0300B 27EB uni300B 0 N\rAngle right angle bracket, double 03012 uni3012 1 Q\postalmark 0x3012 Postal mark =03014 2772 uni3014 0DF O Q\lbrbrak left broken bracket =03015 2773 uni3015 0DF C Q\rbrbrak right broken bracket =03018 27EC uni3018 0 O Q\Lbrbrak LEFT WHITE TORTOISE SHELL BRACKET =03019 27ED uni3019 0 C Q\Rbrbrak RIGHT WHITE TORTOISE SHELL BRACKET =0301A 27E6 uni301A 0 N\lBrack left white square bracket =0301B 27E7 uni301B 0 N\rBrack right white square bracket 0301E uni301E 0 Q\cjkdprimequote 0x301E Double prime quotation mark 03030 uni3030 1 Q\hzigzag 0x3030 Zigzag 0306E uni306E 244E 1 1 N Q\hiraganano HIRAGANA LETTER NO &1D400 u1D400 1 Z A Q\bfA MATHEMATICAL BOLD CAPITAL A &1D401 u1D401 1 Z A Q\bfB MATHEMATICAL BOLD CAPITAL B &1D402 u1D402 1 Z A Q\bfC MATHEMATICAL BOLD CAPITAL C &1D403 u1D403 1 Z A Q\bfD MATHEMATICAL BOLD CAPITAL D &1D404 u1D404 1 Z A Q\bfE MATHEMATICAL BOLD CAPITAL E &1D405 u1D405 1 Z A Q\bfF MATHEMATICAL BOLD CAPITAL F &1D406 u1D406 1 Z A Q\bfG MATHEMATICAL BOLD CAPITAL G &1D407 u1D407 1 Z A Q\bfH MATHEMATICAL BOLD CAPITAL H &1D408 u1D408 1 Z A Q\bfI MATHEMATICAL BOLD CAPITAL I &1D409 u1D409 1 Z A Q\bfJ MATHEMATICAL BOLD CAPITAL J &1D40A u1D40A 1 Z A Q\bfK MATHEMATICAL BOLD CAPITAL K &1D40B u1D40B 1 Z A Q\bfL MATHEMATICAL BOLD CAPITAL L &1D40C u1D40C 1 Z A Q\bfM MATHEMATICAL BOLD CAPITAL M &1D40D u1D40D 1 Z A Q\bfN MATHEMATICAL BOLD CAPITAL N &1D40E u1D40E 1 Z A Q\bfO MATHEMATICAL BOLD CAPITAL O &1D40F u1D40F 1 Z A Q\bfP MATHEMATICAL BOLD CAPITAL P &1D410 u1D410 1 Z A Q\bfQ MATHEMATICAL BOLD CAPITAL Q &1D411 u1D411 1 Z A Q\bfR MATHEMATICAL BOLD CAPITAL R &1D412 u1D412 1 Z A Q\bfS MATHEMATICAL BOLD CAPITAL S &1D413 u1D413 1 Z A Q\bfT MATHEMATICAL BOLD CAPITAL T &1D414 u1D414 1 Z A Q\bfU MATHEMATICAL BOLD CAPITAL U &1D415 u1D415 1 Z A Q\bfV MATHEMATICAL BOLD CAPITAL V &1D416 u1D416 1 Z A Q\bfW MATHEMATICAL BOLD CAPITAL W &1D417 u1D417 1 Z A Q\bfX MATHEMATICAL BOLD CAPITAL X &1D418 u1D418 1 Z A Q\bfY MATHEMATICAL BOLD CAPITAL Y &1D419 u1D419 1 Z A Q\bfZ MATHEMATICAL BOLD CAPITAL Z &1D41A u1D41A 1 Z A Q\bfa MATHEMATICAL BOLD SMALL A &1D41B u1D41B 1 Z A Q\bfb MATHEMATICAL BOLD SMALL B &1D41C u1D41C 1 Z A Q\bfc MATHEMATICAL BOLD SMALL C &1D41D u1D41D 1 Z A Q\bfd MATHEMATICAL BOLD SMALL D &1D41E u1D41E 1 Z A Q\bfe MATHEMATICAL BOLD SMALL E &1D41F u1D41F 1 Z A Q\bff MATHEMATICAL BOLD SMALL F &1D420 u1D420 1 Z A Q\bfg MATHEMATICAL BOLD SMALL G &1D421 u1D421 1 Z A Q\bfh MATHEMATICAL BOLD SMALL H &1D422 u1D422 1 Z A Q\bfi MATHEMATICAL BOLD SMALL I &1D423 u1D423 1 Z A Q\bfj MATHEMATICAL BOLD SMALL J &1D424 u1D424 1 Z A Q\bfk MATHEMATICAL BOLD SMALL K &1D425 u1D425 1 Z A Q\bfl MATHEMATICAL BOLD SMALL L &1D426 u1D426 1 Z A Q\bfm MATHEMATICAL BOLD SMALL M &1D427 u1D427 1 Z A Q\bfn MATHEMATICAL BOLD SMALL N &1D428 u1D428 1 Z A Q\bfo MATHEMATICAL BOLD SMALL O &1D429 u1D429 1 Z A Q\bfp MATHEMATICAL BOLD SMALL P &1D42A u1D42A 1 Z A Q\bfq MATHEMATICAL BOLD SMALL Q &1D42B u1D42B 1 Z A Q\bfr MATHEMATICAL BOLD SMALL R &1D42C u1D42C 1 Z A Q\bfs MATHEMATICAL BOLD SMALL S &1D42D u1D42D 1 Z A Q\bft MATHEMATICAL BOLD SMALL T &1D42E u1D42E 1 Z A Q\bfu MATHEMATICAL BOLD SMALL U &1D42F u1D42F 1 Z A Q\bfv MATHEMATICAL BOLD SMALL V &1D430 u1D430 1 Z A Q\bfw MATHEMATICAL BOLD SMALL W &1D431 u1D431 1 Z A Q\bfx MATHEMATICAL BOLD SMALL X &1D432 u1D432 1 Z A Q\bfy MATHEMATICAL BOLD SMALL Y &1D433 u1D433 1 Z A Q\bfz MATHEMATICAL BOLD SMALL Z &1D434 u1D434 1 Z A Q\itA MATHEMATICAL ITALIC CAPITAL A &1D435 u1D435 1 Z A Q\itB MATHEMATICAL ITALIC CAPITAL B &1D436 u1D436 1 Z A Q\itC MATHEMATICAL ITALIC CAPITAL C &1D437 u1D437 1 Z A Q\itD MATHEMATICAL ITALIC CAPITAL D &1D438 u1D438 1 Z A Q\itE MATHEMATICAL ITALIC CAPITAL E &1D439 u1D439 1 Z A Q\itF MATHEMATICAL ITALIC CAPITAL F &1D43A u1D43A 1 Z A Q\itG MATHEMATICAL ITALIC CAPITAL G &1D43B u1D43B 1 Z A Q\itH MATHEMATICAL ITALIC CAPITAL H &1D43C u1D43C 1 Z A Q\itI MATHEMATICAL ITALIC CAPITAL I &1D43D u1D43D 1 Z A Q\itJ MATHEMATICAL ITALIC CAPITAL J &1D43E u1D43E 1 Z A Q\itK MATHEMATICAL ITALIC CAPITAL K &1D43F u1D43F 1 Z A Q\itL MATHEMATICAL ITALIC CAPITAL L &1D440 u1D440 1 Z A Q\itM MATHEMATICAL ITALIC CAPITAL M &1D441 u1D441 1 Z A Q\itN MATHEMATICAL ITALIC CAPITAL N &1D442 u1D442 1 Z A Q\itO MATHEMATICAL ITALIC CAPITAL O &1D443 u1D443 1 Z A Q\itP MATHEMATICAL ITALIC CAPITAL P &1D444 u1D444 1 Z A Q\itQ MATHEMATICAL ITALIC CAPITAL Q &1D445 u1D445 1 Z A Q\itR MATHEMATICAL ITALIC CAPITAL R &1D446 u1D446 1 Z A Q\itS MATHEMATICAL ITALIC CAPITAL S &1D447 u1D447 1 Z A Q\itT MATHEMATICAL ITALIC CAPITAL T &1D448 u1D448 1 Z A Q\itU MATHEMATICAL ITALIC CAPITAL U &1D449 u1D449 1 Z A Q\itV MATHEMATICAL ITALIC CAPITAL V &1D44A u1D44A 1 Z A Q\itW MATHEMATICAL ITALIC CAPITAL W &1D44B u1D44B 1 Z A Q\itX MATHEMATICAL ITALIC CAPITAL X &1D44C u1D44C 1 Z A Q\itY MATHEMATICAL ITALIC CAPITAL Y &1D44D u1D44D 1 Z A Q\itZ MATHEMATICAL ITALIC CAPITAL Z &1D44E u1D44E 1 Z A Q\ita MATHEMATICAL ITALIC SMALL A &1D44F u1D44F 1 Z A Q\itb MATHEMATICAL ITALIC SMALL B &1D450 u1D450 1 Z A Q\itc MATHEMATICAL ITALIC SMALL C &1D451 u1D451 1 Z A Q\itd MATHEMATICAL ITALIC SMALL D &1D452 u1D452 1 Z A Q\ite MATHEMATICAL ITALIC SMALL E &1D453 E364 u1D453 EE54 6X10 1 Z A fnof ISOTECH Q\itf fnof MATHEMATICAL ITALIC SMALL F &1D454 u1D454 1 Z A Q\itg MATHEMATICAL ITALIC SMALL G +1D455 210E uni210E 0 Z A Q\ith MATHEMATICAL ITALIC SMALL H &1D456 u1D456 1 Z A Q\iti MATHEMATICAL ITALIC SMALL I &1D457 u1D457 1 Z A Q\itj MATHEMATICAL ITALIC SMALL J &1D458 u1D458 1 Z A Q\itk MATHEMATICAL ITALIC SMALL K &1D459 u1D459 1 Z A Q\itl MATHEMATICAL ITALIC SMALL L &1D45A u1D45A 1 Z A Q\itm MATHEMATICAL ITALIC SMALL M &1D45B u1D45B 1 Z A Q\itn MATHEMATICAL ITALIC SMALL N &1D45C u1D45C 1 Z A Q\ito MATHEMATICAL ITALIC SMALL O &1D45D u1D45D 1 Z A Q\itp MATHEMATICAL ITALIC SMALL P &1D45E u1D45E 1 Z A Q\itq MATHEMATICAL ITALIC SMALL Q &1D45F u1D45F 1 Z A Q\itr MATHEMATICAL ITALIC SMALL R &1D460 u1D460 1 Z A Q\its MATHEMATICAL ITALIC SMALL S &1D461 u1D461 1 Z A Q\itt MATHEMATICAL ITALIC SMALL T &1D462 u1D462 1 Z A Q\itu MATHEMATICAL ITALIC SMALL U &1D463 u1D463 1 Z A Q\itv MATHEMATICAL ITALIC SMALL V &1D464 u1D464 1 Z A Q\itw MATHEMATICAL ITALIC SMALL W &1D465 u1D465 1 Z A Q\itx MATHEMATICAL ITALIC SMALL X &1D466 u1D466 1 Z A Q\ity MATHEMATICAL ITALIC SMALL Y &1D467 u1D467 1 Z A Q\itz MATHEMATICAL ITALIC SMALL Z &1D468 u1D468 1 Z A Q\bfitA MATHEMATICAL BOLD ITALIC CAPITAL A &1D469 u1D469 1 Z A Q\bfitB MATHEMATICAL BOLD ITALIC CAPITAL B &1D46A u1D46A 1 Z A Q\bfitC MATHEMATICAL BOLD ITALIC CAPITAL C &1D46B u1D46B 1 Z A Q\bfitD MATHEMATICAL BOLD ITALIC CAPITAL D &1D46C u1D46C 1 Z A Q\bfitE MATHEMATICAL BOLD ITALIC CAPITAL E &1D46D u1D46D 1 Z A Q\bfitF MATHEMATICAL BOLD ITALIC CAPITAL F &1D46E u1D46E 1 Z A Q\bfitG MATHEMATICAL BOLD ITALIC CAPITAL G &1D46F u1D46F 1 Z A Q\bfitH MATHEMATICAL BOLD ITALIC CAPITAL H &1D470 u1D470 1 Z A Q\bfitI MATHEMATICAL BOLD ITALIC CAPITAL I &1D471 u1D471 1 Z A Q\bfitJ MATHEMATICAL BOLD ITALIC CAPITAL J &1D472 u1D472 1 Z A Q\bfitK MATHEMATICAL BOLD ITALIC CAPITAL K &1D473 u1D473 1 Z A Q\bfitL MATHEMATICAL BOLD ITALIC CAPITAL L &1D474 u1D474 1 Z A Q\bfitM MATHEMATICAL BOLD ITALIC CAPITAL M &1D475 u1D475 1 Z A Q\bfitN MATHEMATICAL BOLD ITALIC CAPITAL N &1D476 u1D476 1 Z A Q\bfitO MATHEMATICAL BOLD ITALIC CAPITAL O &1D477 u1D477 1 Z A Q\bfitP MATHEMATICAL BOLD ITALIC CAPITAL P &1D478 u1D478 1 Z A Q\bfitQ MATHEMATICAL BOLD ITALIC CAPITAL Q &1D479 u1D479 1 Z A Q\bfitR MATHEMATICAL BOLD ITALIC CAPITAL R &1D47A u1D47A 1 Z A Q\bfitS MATHEMATICAL BOLD ITALIC CAPITAL S &1D47B u1D47B 1 Z A Q\bfitT MATHEMATICAL BOLD ITALIC CAPITAL T &1D47C u1D47C 1 Z A Q\bfitU MATHEMATICAL BOLD ITALIC CAPITAL U &1D47D u1D47D 1 Z A Q\bfitV MATHEMATICAL BOLD ITALIC CAPITAL V &1D47E u1D47E 1 Z A Q\bfitW MATHEMATICAL BOLD ITALIC CAPITAL W &1D47F u1D47F 1 Z A Q\bfitX MATHEMATICAL BOLD ITALIC CAPITAL X &1D480 u1D480 1 Z A Q\bfitY MATHEMATICAL BOLD ITALIC CAPITAL Y &1D481 u1D481 1 Z A Q\bfitZ MATHEMATICAL BOLD ITALIC CAPITAL Z &1D482 u1D482 1 Z A Q\bfita MATHEMATICAL BOLD ITALIC SMALL A &1D483 u1D483 1 Z A Q\bfitb MATHEMATICAL BOLD ITALIC SMALL B &1D484 u1D484 1 Z A Q\bfitc MATHEMATICAL BOLD ITALIC SMALL C &1D485 u1D485 1 Z A Q\bfitd MATHEMATICAL BOLD ITALIC SMALL D &1D486 u1D486 1 Z A Q\bfite MATHEMATICAL BOLD ITALIC SMALL E &1D487 u1D487 1 Z A Q\bfitf MATHEMATICAL BOLD ITALIC SMALL F &1D488 u1D488 1 Z A Q\bfitg MATHEMATICAL BOLD ITALIC SMALL G &1D489 u1D489 1 Z A Q\bfith MATHEMATICAL BOLD ITALIC SMALL H &1D48A u1D48A 1 Z A Q\bfiti MATHEMATICAL BOLD ITALIC SMALL I &1D48B u1D48B 1 Z A Q\bfitj MATHEMATICAL BOLD ITALIC SMALL J &1D48C u1D48C 1 Z A Q\bfitk MATHEMATICAL BOLD ITALIC SMALL K &1D48D u1D48D 1 Z A Q\bfitl MATHEMATICAL BOLD ITALIC SMALL L &1D48E u1D48E 1 Z A Q\bfitm MATHEMATICAL BOLD ITALIC SMALL M &1D48F u1D48F 1 Z A Q\bfitn MATHEMATICAL BOLD ITALIC SMALL N &1D490 u1D490 1 Z A Q\bfito MATHEMATICAL BOLD ITALIC SMALL O &1D491 u1D491 1 Z A Q\bfitp MATHEMATICAL BOLD ITALIC SMALL P &1D492 u1D492 1 Z A Q\bfitq MATHEMATICAL BOLD ITALIC SMALL Q &1D493 u1D493 1 Z A Q\bfitr MATHEMATICAL BOLD ITALIC SMALL R &1D494 u1D494 1 Z A Q\bfits MATHEMATICAL BOLD ITALIC SMALL S &1D495 u1D495 1 Z A Q\bfitt MATHEMATICAL BOLD ITALIC SMALL T &1D496 u1D496 1 Z A Q\bfitu MATHEMATICAL BOLD ITALIC SMALL U &1D497 u1D497 1 Z A Q\bfitv MATHEMATICAL BOLD ITALIC SMALL V &1D498 u1D498 1 Z A Q\bfitw MATHEMATICAL BOLD ITALIC SMALL W &1D499 u1D499 1 Z A Q\bfitx MATHEMATICAL BOLD ITALIC SMALL X &1D49A u1D49A 1 Z A Q\bfity MATHEMATICAL BOLD ITALIC SMALL Y &1D49B u1D49B 1 Z A Q\bfitz MATHEMATICAL BOLD ITALIC SMALL Z &1D49C E520 u1D49C D853 6X70 1DZ A Ascr ISOMSCR Q\scrA ScriptCapitalA 2 21 MATHEMATICAL SCRIPT CAPITAL A +1D49D 212C uni212C DB43 0fZ A Bscr ISOMSCR cjb Q\scrB ScriptCapitalB 0x212C 2 40 MATHEMATICAL SCRIPT CAPITAL B &1D49E E522 u1D49E D854 6X72 1DZ A Cscr ISOMSCR Q\scrC ScriptCapitalC 2 23 MATHEMATICAL SCRIPT CAPITAL C &1D49F E523 u1D49F D855 6X73 1DZ A Dscr ISOMSCR Q\scrD ScriptCapitalD 2 24 MATHEMATICAL SCRIPT CAPITAL D +1D4A0 2130 uni2130 D856 0dZ A Escr ISOMSCR Q\scrE ScriptCapitalE 0x2130 2 25 MATHEMATICAL SCRIPT CAPITAL E +1D4A1 2131 uni2131 D857 0dZ A Fscr ISOMSCR Q\scrF ScriptCapitalF 0x2131 2 5E MATHEMATICAL SCRIPT CAPITAL F &1D4A2 E526 u1D4A2 D858 6X76 1DZ A Gscr ISOMSCR Q\scrG ScriptCapitalG 2 26 MATHEMATICAL SCRIPT CAPITAL G +1D4A3 210B uni210B EB22 0fZ A Hscr ISOMSCR cjh Q\scrH ScriptCapitalH 0x210B 2 2A MATHEMATICAL SCRIPT CAPITAL H +1D4A4 2110 uni2110 EB23 0dZ A Iscr ISOMSCR Q\scrI ScriptCapitalI 0x2110 2 28 MATHEMATICAL SCRIPT CAPITAL I &1D4A5 E529 u1D4A5 D859 6X79 1DZ A Jscr ISOMSCR Q\scrJ ScriptCapitalJ 2 29 MATHEMATICAL SCRIPT CAPITAL J &1D4A6 E52A u1D4A6 D85A 6X7A 1DZ A Kscr ISOMSCR Q\scrK ScriptCapitalK 2 5F MATHEMATICAL SCRIPT CAPITAL K +1D4A7 2112 uni2112 EE44 0fZ A Lscr ISOMSCR cjl Q\scrL ScriptCapitalL 0x2112 2 2B MATHEMATICAL SCRIPT CAPITAL L +1D4A8 2133 uni2133 EB5E 0fZ A Mscr ISOMSCR cjm Q\scrM ScriptCapitalM 0x2133 2 7D MATHEMATICAL SCRIPT CAPITAL M &1D4A9 E52D u1D4A9 D85B 6X7D 1DZ A Nscr ISOMSCR Q\scrN ScriptCapitalN 2 31 MATHEMATICAL SCRIPT CAPITAL N &1D4AA E52E u1D4AA D85C 6X7E 1FZ A Oscr ISOMSCR cjo Q\scrO ScriptCapitalO 2 32 MATHEMATICAL SCRIPT CAPITAL O &1D4AB E52F u1D4AB D85D 6X7F 1DZ A Pscr ISOMSCR Q\scrP ScriptCapitalP 2 33 MATHEMATICAL SCRIPT CAPITAL P &1D4AC E530 u1D4AC D85E 6X80 1DZ A Qscr ISOMSCR Q\scrQ ScriptCapitalQ 2 34 MATHEMATICAL SCRIPT CAPITAL Q +1D4AD 211B uni211B EE43 0dZ A Rscr ISOMSCR Q\scrR ScriptCapitalR 0x211B 2 35 MATHEMATICAL SCRIPT CAPITAL R &1D4AE E532 u1D4AE D85F 6X82 1DZ A Sscr ISOMSCR Q\scrS ScriptCapitalS 2 36 MATHEMATICAL SCRIPT CAPITAL S &1D4AF E533 u1D4AF D860 6X83 1DZ A Tscr ISOMSCR Q\scrT ScriptCapitalT 2 37 MATHEMATICAL SCRIPT CAPITAL T &1D4B0 E534 u1D4B0 D861 6X84 1DZ A Uscr ISOMSCR Q\scrU ScriptCapitalU 2 38 MATHEMATICAL SCRIPT CAPITAL U &1D4B1 E535 u1D4B1 D862 6X85 1DZ A Vscr ISOMSCR Q\scrV ScriptCapitalV 2 39 MATHEMATICAL SCRIPT CAPITAL V &1D4B2 E536 u1D4B2 D863 6X86 1DZ A Wscr ISOMSCR Q\scrW ScriptCapitalW 2 30 MATHEMATICAL SCRIPT CAPITAL W &1D4B3 E537 u1D4B3 D864 6X87 1DZ A Xscr ISOMSCR Q\scrX ScriptCapitalX 2 2D MATHEMATICAL SCRIPT CAPITAL X &1D4B4 E538 u1D4B4 D865 6X88 1DZ A Yscr ISOMSCR Q\scrY ScriptCapitalY 2 3D MATHEMATICAL SCRIPT CAPITAL Y &1D4B5 E539 u1D4B5 D866 6X89 1DZ A Zscr ISOMSCR Q\scrZ ScriptCapitalZ 2 5D MATHEMATICAL SCRIPT CAPITAL Z &1D4B6 E540 u1D4B6 ____ 6X90 1DZ A ascr ISOMSCR Q\scra ScriptA MATHEMATICAL SCRIPT SMALL A &1D4B7 E541 u1D4B7 ____ 6X91 1DZ A bscr ISOMSCR Q\scrb ScriptB MATHEMATICAL SCRIPT SMALL B &1D4B8 E542 u1D4B8 ____ 6X92 1DZ A cscr ISOMSCR Q\scrc ScriptC MATHEMATICAL SCRIPT SMALL C &1D4B9 E543 u1D4B9 ____ 6X93 1DZ A dscr ISOMSCR Q\scrd ScriptD MATHEMATICAL SCRIPT SMALL D +1D4BA 212F uni212F ____ 0dZ A escr ISOMSCR Q\scre ScriptE 0x212F MATHEMATICAL SCRIPT SMALL E &1D4BB E545 u1D4BB ____ 6X95 1DZ A fscr ISOMSCR Q\scrf ScriptF MATHEMATICAL SCRIPT SMALL F +1D4BC 210A uni210A ____ 0dZ A gscr ISOMSCR Q\scrg ScriptG 0x210A 2 3B MATHEMATICAL SCRIPT SMALL G &1D4BD E547 u1D4BD ____ 6X97 1DZ A hscr ISOMSCR Q\scrh ScriptH 2 27 MATHEMATICAL SCRIPT SMALL H &1D4BE E548 u1D4BE ____ 6X98 1DZ A iscr ISOMSCR Q\scri ScriptI MATHEMATICAL SCRIPT SMALL I &1D4BF E549 u1D4BF ____ 6X99 1DZ A jscr ISOMSCR Q\scrj ScriptJ MATHEMATICAL SCRIPT SMALL J &1D4C0 E54A u1D4C0 ____ 6X9A 1DZ A kscr ISOMSCR Q\scrk ScriptK MATHEMATICAL SCRIPT SMALL K B1D4C1 D4C1 u1D4C1 1DZ A lscr ISOMSCR Q\scrl MATHEMATICAL SCRIPT SMALL L &1D4C2 E54C u1D4C2 ____ 6X9C 1DZ A mscr ISOMSCR Q\scrm ScriptM MATHEMATICAL SCRIPT SMALL M &1D4C3 E54D u1D4C3 ____ 6X9D 1DZ A nscr ISOMSCR Q\scrn ScriptN MATHEMATICAL SCRIPT SMALL N +1D4C4 2134 uni2134 DB6E 0dZ A oscr ISOMSCR Q\scro ScriptO 0x2134 MATHEMATICAL SCRIPT SMALL O &1D4C5 E54F u1D4C5 ____ 6X9F 1DZ A pscr ISOMSCR Q\scrp ScriptP MATHEMATICAL SCRIPT SMALL P &1D4C6 E550 u1D4C6 ____ 6XA0 1DZ A qscr ISOMSCR Q\scrq ScriptQ MATHEMATICAL SCRIPT SMALL Q &1D4C7 E551 u1D4C7 ____ 6XA1 1DZ A rscr ISOMSCR Q\scrr ScriptR MATHEMATICAL SCRIPT SMALL R &1D4C8 E552 u1D4C8 ____ 6XA2 1DZ A sscr ISOMSCR Q\scrs ScriptS MATHEMATICAL SCRIPT SMALL S &1D4C9 E553 u1D4C9 ____ 6XA3 1DZ A tscr ISOMSCR Q\scrt ScriptT MATHEMATICAL SCRIPT SMALL T &1D4CA E554 u1D4CA ____ 6XA4 1DZ A uscr ISOMSCR Q\scru ScriptU MATHEMATICAL SCRIPT SMALL U &1D4CB E555 u1D4CB ____ 6XA5 1DZ A vscr ISOMSCR Q\scrv ScriptV MATHEMATICAL SCRIPT SMALL V &1D4CC E556 u1D4CC ____ 6XA6 1DZ A wscr ISOMSCR Q\scrw ScriptW MATHEMATICAL SCRIPT SMALL W &1D4CD E557 u1D4CD ____ 6XA7 1DZ A xscr ISOMSCR Q\scrx ScriptX MATHEMATICAL SCRIPT SMALL X &1D4CE E558 u1D4CE ____ 6XA8 1DZ A yscr ISOMSCR Q\scry ScriptY MATHEMATICAL SCRIPT SMALL Y &1D4CF E559 u1D4CF ____ 6XA9 1DZ A zscr ISOMSCR Q\scrz ScriptZ 2 2F MATHEMATICAL SCRIPT SMALL Z &1D4D0 u1D4D0 1 Z A Q\bfscrA MATHEMATICAL BOLD SCRIPT CAPITAL A &1D4D1 u1D4D1 1 Z A Q\bfscrB MATHEMATICAL BOLD SCRIPT CAPITAL B &1D4D2 u1D4D2 1 Z A Q\bfscrC MATHEMATICAL BOLD SCRIPT CAPITAL C &1D4D3 u1D4D3 1 Z A Q\bfscrD MATHEMATICAL BOLD SCRIPT CAPITAL D &1D4D4 u1D4D4 1 Z A Q\bfscrE MATHEMATICAL BOLD SCRIPT CAPITAL E &1D4D5 u1D4D5 1 Z A Q\bfscrF MATHEMATICAL BOLD SCRIPT CAPITAL F &1D4D6 u1D4D6 1 Z A Q\bfscrG MATHEMATICAL BOLD SCRIPT CAPITAL G &1D4D7 u1D4D7 1 Z A Q\bfscrH MATHEMATICAL BOLD SCRIPT CAPITAL H &1D4D8 u1D4D8 1 Z A Q\bfscrI MATHEMATICAL BOLD SCRIPT CAPITAL I &1D4D9 u1D4D9 1 Z A Q\bfscrJ MATHEMATICAL BOLD SCRIPT CAPITAL J &1D4DA u1D4DA 1 Z A Q\bfscrK MATHEMATICAL BOLD SCRIPT CAPITAL K &1D4DB u1D4DB 1 Z A Q\bfscrL MATHEMATICAL BOLD SCRIPT CAPITAL L &1D4DC u1D4DC 1 Z A Q\bfscrM MATHEMATICAL BOLD SCRIPT CAPITAL M &1D4DD u1D4DD 1 Z A Q\bfscrN MATHEMATICAL BOLD SCRIPT CAPITAL N &1D4DE u1D4DE 1 Z A Q\bfscrO MATHEMATICAL BOLD SCRIPT CAPITAL O &1D4DF u1D4DF 1 Z A Q\bfscrP MATHEMATICAL BOLD SCRIPT CAPITAL P &1D4E0 u1D4E0 1 Z A Q\bfscrQ MATHEMATICAL BOLD SCRIPT CAPITAL Q &1D4E1 u1D4E1 1 Z A Q\bfscrR MATHEMATICAL BOLD SCRIPT CAPITAL R &1D4E2 u1D4E2 1 Z A Q\bfscrS MATHEMATICAL BOLD SCRIPT CAPITAL S &1D4E3 u1D4E3 1 Z A Q\bfscrT MATHEMATICAL BOLD SCRIPT CAPITAL T &1D4E4 u1D4E4 1 Z A Q\bfscrU MATHEMATICAL BOLD SCRIPT CAPITAL U &1D4E5 u1D4E5 1 Z A Q\bfscrV MATHEMATICAL BOLD SCRIPT CAPITAL V &1D4E6 u1D4E6 1 Z A Q\bfscrW MATHEMATICAL BOLD SCRIPT CAPITAL W &1D4E7 u1D4E7 1 Z A Q\bfscrX MATHEMATICAL BOLD SCRIPT CAPITAL X &1D4E8 u1D4E8 1 Z A Q\bfscrY MATHEMATICAL BOLD SCRIPT CAPITAL Y &1D4E9 u1D4E9 1 Z A Q\bfscrZ MATHEMATICAL BOLD SCRIPT CAPITAL Z &1D4EA u1D4EA 1 Z A Q\bfscra MATHEMATICAL BOLD SCRIPT SMALL A &1D4EB u1D4EB 1 Z A Q\bfscrb MATHEMATICAL BOLD SCRIPT SMALL B &1D4EC u1D4EC 1 Z A Q\bfscrc MATHEMATICAL BOLD SCRIPT SMALL C &1D4ED u1D4ED 1 Z A Q\bfscrd MATHEMATICAL BOLD SCRIPT SMALL D &1D4EE u1D4EE 1 Z A Q\bfscre MATHEMATICAL BOLD SCRIPT SMALL E &1D4EF u1D4EF 1 Z A Q\bfscrf MATHEMATICAL BOLD SCRIPT SMALL F &1D4F0 u1D4F0 1 Z A Q\bfscrg MATHEMATICAL BOLD SCRIPT SMALL G &1D4F1 u1D4F1 1 Z A Q\bfscrh MATHEMATICAL BOLD SCRIPT SMALL H &1D4F2 u1D4F2 1 Z A Q\bfscri MATHEMATICAL BOLD SCRIPT SMALL I &1D4F3 u1D4F3 1 Z A Q\bfscrj MATHEMATICAL BOLD SCRIPT SMALL J &1D4F4 u1D4F4 1 Z A Q\bfscrk MATHEMATICAL BOLD SCRIPT SMALL K &1D4F5 u1D4F5 1 Z A Q\bfscrl MATHEMATICAL BOLD SCRIPT SMALL L &1D4F6 u1D4F6 1 Z A Q\bfscrm MATHEMATICAL BOLD SCRIPT SMALL M &1D4F7 u1D4F7 1 Z A Q\bfscrn MATHEMATICAL BOLD SCRIPT SMALL N &1D4F8 u1D4F8 1 Z A Q\bfscro MATHEMATICAL BOLD SCRIPT SMALL O &1D4F9 u1D4F9 1 Z A Q\bfscrp MATHEMATICAL BOLD SCRIPT SMALL P &1D4FA u1D4FA 1 Z A Q\bfscrq MATHEMATICAL BOLD SCRIPT SMALL Q &1D4FB u1D4FB 1 Z A Q\bfscrr MATHEMATICAL BOLD SCRIPT SMALL R &1D4FC u1D4FC 1 Z A Q\bfscrs MATHEMATICAL BOLD SCRIPT SMALL S &1D4FD u1D4FD 1 Z A Q\bfscrt MATHEMATICAL BOLD SCRIPT SMALL T &1D4FE u1D4FE 1 Z A Q\bfscru MATHEMATICAL BOLD SCRIPT SMALL U &1D4FF u1D4FF 1 Z A Q\bfscrv MATHEMATICAL BOLD SCRIPT SMALL V &1D500 u1D500 1 Z A Q\bfscrw MATHEMATICAL BOLD SCRIPT SMALL W &1D501 u1D501 1 Z A Q\bfscrx MATHEMATICAL BOLD SCRIPT SMALL X &1D502 u1D502 1 Z A Q\bfscry MATHEMATICAL BOLD SCRIPT SMALL Y &1D503 u1D503 1 Z A Q\bfscrz MATHEMATICAL BOLD SCRIPT SMALL Z &1D504 E560 u1D504 ____ 6XB0 1fZ A Afr ISOMFRK Q\frakA GothicCapitalA 2 41 MATHEMATICAL FRAKTUR CAPITAL A &1D505 E561 u1D505 ____ 6XB1 1fZ A Bfr ISOMFRK Q\frakB GothicCapitalB 2 42 MATHEMATICAL FRAKTUR CAPITAL B +1D506 212D uni212D EB7B 6XB2 0fZ A Cfr ISOMFRK Q\frakC GothicCapitalC 0x212D 2 43 MATHEMATICAL FRAKTUR CAPITAL C &1D507 E563 u1D507 ____ 6XB3 1fZ A Dfr ISOMFRK Q\frakD GothicCapitalD 2 44 MATHEMATICAL FRAKTUR CAPITAL D &1D508 E564 u1D508 ____ 6XB4 1fZ A Efr ISOMFRK Q\frakE GothicCapitalE 2 45 MATHEMATICAL FRAKTUR CAPITAL E &1D509 E565 u1D509 ____ 6XB5 1fZ A Ffr ISOMFRK Q\frakF GothicCapitalF 2 46 MATHEMATICAL FRAKTUR CAPITAL F &1D50A E566 u1D50A EB2A 6XB6 1fZ A Gfr ISOMFRK Q\frakG GothicCapitalG 2 47 MATHEMATICAL FRAKTUR CAPITAL G +1D50B 210C uni210C EB2B 0 Z A Hfr ISOMFRK Q\frakH GothicCapitalH 0x210C 2 48 MATHEMATICAL FRAKTUR CAPITAL H +1D50C 2111 uni2111 22A9 0 Z A Ifr ISOMFRK Q\frakI GothicCapitalI 0x2111 2 49 MATHEMATICAL FRAKTUR CAPITAL I &1D50D E569 u1D50D ____ 6XB9 1fZ A Jfr ISOMFRK Q\frakJ GothicCapitalJ 2 4A MATHEMATICAL FRAKTUR CAPITAL J &1D50E E56A u1D50E ____ 6XBA 1fZ A Kfr ISOMFRK Q\frakK GothicCapitalK 2 4B MATHEMATICAL FRAKTUR CAPITAL K &1D50F E56B u1D50F ____ 6XBB 1fZ A Lfr ISOMFRK Q\frakL GothicCapitalL 2 4C MATHEMATICAL FRAKTUR CAPITAL L &1D510 E56C u1D510 EB2C 6XBC 1fZ A Mfr ISOMFRK Q\frakM GothicCapitalM 2 4D MATHEMATICAL FRAKTUR CAPITAL M &1D511 E56D u1D511 ____ 6XBD 1fZ A Nfr ISOMFRK Q\frakN GothicCapitalN 2 4E MATHEMATICAL FRAKTUR CAPITAL N &1D512 E56E u1D512 ____ 6XBE 1fZ A Ofr ISOMFRK Q\frakO GothicCapitalO 2 4F MATHEMATICAL FRAKTUR CAPITAL O &1D513 E56F u1D513 ____ 6XBF 1fZ A Pfr ISOMFRK Q\frakP GothicCapitalP 2 50 MATHEMATICAL FRAKTUR CAPITAL P &1D514 E570 u1D514 ____ 6XC0 1fZ A Qfr ISOMFRK Q\frakQ GothicCapitalQ 2 51 MATHEMATICAL FRAKTUR CAPITAL Q +1D515 211C uni211C 22A8 0 Z A Rfr ISOMFRK Q\frakR GothicCapitalR 0x211C 2 52 MATHEMATICAL FRAKTUR CAPITAL R &1D516 E572 u1D516 ____ 6XC2 1fZ A Sfr ISOMFRK Q\frakS GothicCapitalS 2 53 MATHEMATICAL FRAKTUR CAPITAL S &1D517 E573 u1D517 ____ 6XC3 1fZ A Tfr ISOMFRK Q\frakT GothicCapitalT 2 54 MATHEMATICAL FRAKTUR CAPITAL T &1D518 E574 u1D518 ____ 6XC4 1fZ A Ufr ISOMFRK Q\frakU GothicCapitalU 2 55 MATHEMATICAL FRAKTUR CAPITAL U &1D519 E575 u1D519 ____ 6XC5 1fZ A Vfr ISOMFRK Q\frakV GothicCapitalV 2 56 MATHEMATICAL FRAKTUR CAPITAL V &1D51A E576 u1D51A ____ 6XC6 1fZ A Wfr ISOMFRK Q\frakW GothicCapitalW 2 57 MATHEMATICAL FRAKTUR CAPITAL W &1D51B E577 u1D51B ____ 6XC7 1fZ A Xfr ISOMFRK Q\frakX GothicCapitalX 2 58 MATHEMATICAL FRAKTUR CAPITAL X &1D51C E578 u1D51C ____ 6XC8 1fZ A Yfr ISOMFRK Q\frakY GothicCapitalY 2 59 MATHEMATICAL FRAKTUR CAPITAL Y +1D51D 2128 uni2128 EB7C 0 Z A Zfr ISOMFRK Q\frakZ GothicCapitalZ 0x2128 2 5A MATHEMATICAL FRAKTUR CAPITAL Z &1D51E E580 u1D51E ____ 6XD0 1fZ A afr ISOMFRK Q\fraka GothicA 2 61 MATHEMATICAL FRAKTUR SMALL A &1D51F E581 u1D51F ____ 6XD1 1fZ A bfr ISOMFRK Q\frakb GothicB 2 62 MATHEMATICAL FRAKTUR SMALL B &1D520 E582 u1D520 ____ 6XD2 1fZ A cfr ISOMFRK Q\frakc GothicC 2 63 MATHEMATICAL FRAKTUR SMALL C &1D521 E583 u1D521 ____ 6XD3 1fZ A dfr ISOMFRK Q\frakd GothicD 2 64 MATHEMATICAL FRAKTUR SMALL D &1D522 E584 u1D522 ____ 6XD4 1fZ A efr ISOMFRK Q\frake GothicE 2 65 MATHEMATICAL FRAKTUR SMALL E &1D523 E585 u1D523 ____ 6XD5 1fZ A ffr ISOMFRK Q\frakf GothicF 2 66 MATHEMATICAL FRAKTUR SMALL F &1D524 E586 u1D524 ____ 6XD6 1fZ A gfr ISOMFRK Q\frakg GothicG 2 67 MATHEMATICAL FRAKTUR SMALL G &1D525 E587 u1D525 ____ 6XD7 1fZ A hfr ISOMFRK Q\frakh GothicH 2 68 MATHEMATICAL FRAKTUR SMALL H &1D526 E588 u1D526 ____ 6XD8 1fZ A ifr ISOMFRK Q\fraki GothicI 2 69 MATHEMATICAL FRAKTUR SMALL I &1D527 E589 u1D527 ____ 6XD9 1fZ A jfr ISOMFRK Q\frakj GothicJ 2 6A MATHEMATICAL FRAKTUR SMALL J &1D528 E58A u1D528 ____ 6XDA 1fZ A kfr ISOMFRK Q\frakk GothicK 2 6B MATHEMATICAL FRAKTUR SMALL K &1D529 E58B u1D529 ____ 6XDB 1fZ A lfr ISOMFRK Q\frakl GothicL 2 6C MATHEMATICAL FRAKTUR SMALL L &1D52A E58C u1D52A ____ 6XDC 1fZ A mfr ISOMFRK Q\frakm GothicM 2 6D MATHEMATICAL FRAKTUR SMALL M &1D52B E58D u1D52B ____ 6XDD 1fZ A nfr ISOMFRK Q\frakn GothicN 2 6E MATHEMATICAL FRAKTUR SMALL N &1D52C E58E u1D52C ____ 6XDE 1fZ A ofr ISOMFRK Q\frako GothicO 2 6F MATHEMATICAL FRAKTUR SMALL O &1D52D E58F u1D52D ____ 6XDF 1fZ A pfr ISOMFRK Q\frakp GothicP 2 70 MATHEMATICAL FRAKTUR SMALL P &1D52E E590 u1D52E ____ 6XE0 1fZ A qfr ISOMFRK Q\frakq GothicQ 2 71 MATHEMATICAL FRAKTUR SMALL Q &1D52F E591 u1D52F ____ 6XE1 1fZ A rfr ISOMFRK Q\frakr GothicR 2 72 MATHEMATICAL FRAKTUR SMALL R &1D530 E592 u1D530 ____ 6XE2 1fZ A sfr ISOMFRK Q\fraks GothicS 2 73 MATHEMATICAL FRAKTUR SMALL S &1D531 E593 u1D531 ____ 6XE3 1fZ A tfr ISOMFRK Q\frakt GothicT 2 74 MATHEMATICAL FRAKTUR SMALL T &1D532 E594 u1D532 ____ 6XE4 1fZ A ufr ISOMFRK Q\fraku GothicU 2 75 MATHEMATICAL FRAKTUR SMALL U &1D533 E595 u1D533 ____ 6XE5 1fZ A vfr ISOMFRK Q\frakv GothicV 2 76 MATHEMATICAL FRAKTUR SMALL V &1D534 E596 u1D534 ____ 6XE6 1fZ A wfr ISOMFRK Q\frakw GothicW 2 77 MATHEMATICAL FRAKTUR SMALL W &1D535 E597 u1D535 ____ 6XE7 1fZ A xfr ISOMFRK Q\frakx GothicX 2 78 MATHEMATICAL FRAKTUR SMALL X &1D536 E598 u1D536 ____ 6XE8 1fZ A yfr ISOMFRK Q\fraky GothicY 2 79 MATHEMATICAL FRAKTUR SMALL Y &1D537 E599 u1D537 ____ 6XE9 1fZ A zfr ISOMFRK Q\frakz GothicZ 2 7A MATHEMATICAL FRAKTUR SMALL Z &1D538 E500 u1D538 ____ 6X30 1fZ A Aopf ISOMOPF Q\BbbA \BBA DoubleStruckCapitalA 6 41 xx41 MATHEMATICAL DOUBLE-STRUCK CAPITAL A &1D539 E501 u1D539 ____ 6X31 1dZ A Bopf ISOMOPF Q\BbbB \binary DoubleStruckCapitalB 6 42 xx42 MATHEMATICAL DOUBLE-STRUCK CAPITAL B +1D539 E501 u1D539 ____ 6X31 0 Z A Bopf ISOMOPF Q\BbbB \BBB DoubleStruckCapitalB 6 42 xx42 MATHEMATICAL DOUBLE-STRUCK CAPITAL B +1D53A 2102 uni2102 EFAC 0 Z A Copf ISOMOPF Q\BbbC \BBC DoubleStruckCapitalC \bbbc 0x2102 6 43 xx43 MATHEMATICAL DOUBLE-STRUCK CAPITAL C &1D53B E503 u1D53B ____ 6X33 1dZ A Dopf ISOMOPF Q\BbbD \BBD DoubleStruckCapitalD 6 44 xx44 MATHEMATICAL DOUBLE-STRUCK CAPITAL D &1D53C E504 u1D53C ____ 6X34 1dZ A Eopf ISOMOPF Q\BbbE \BBE DoubleStruckCapitalE 6 45 xx45 MATHEMATICAL DOUBLE-STRUCK CAPITAL E +1D53C E504 u1D53C ____ 6X34 1dZ A Eopf ISOMOPF Q\BbbE \REALE DoubleStruckCapitalE 6 45 xx45 MATHEMATICAL DOUBLE-STRUCK CAPITAL E &1D53D E505 u1D53D EB2D 6X35 1dZ A Fopf ISOMOPF Q\BbbF \BBF DoubleStruckCapitalF \bbbf 6 46 xx46 MATHEMATICAL DOUBLE-STRUCK CAPITAL F &1D53E E506 u1D53E ____ 6X36 1dZ A Gopf ISOMOPF Q\BbbG \BBG DoubleStruckCapitalG 6 47 xx47 MATHEMATICAL DOUBLE-STRUCK CAPITAL G +1D53F 210D uni210D 22E8 0 Z A Hopf ISOMOPF Q\BbbH \BBH DoubleStruckCapitalH \bbbh 0x210D 6 48 xx48 MATHEMATICAL DOUBLE-STRUCK CAPITAL H &1D540 E508 u1D540 ____ 6X38 1dZ A Iopf ISOMOPF Q\BbbI \BBI DoubleStruckCapitalI 6 49 xx49 MATHEMATICAL DOUBLE-STRUCK CAPITAL I &1D541 E509 u1D541 ____ 6X39 1dZ A Jopf ISOMOPF Q\BbbJ \BBJ DoubleStruckCapitalJ 6 4A xx4A MATHEMATICAL DOUBLE-STRUCK CAPITAL J &1D542 E50A u1D542 ____ 6X3A 1dZ A Kopf ISOMOPF Q\BbbK \REALK DoubleStruckCapitalK \bbbk 6 4B xx4B MATHEMATICAL DOUBLE-STRUCK CAPITAL K +1D542 E50A u1D542 ____ 6X3A 0dZ A Kopf ISOMOPF Q\BbbK \BBK DoubleStruckCapitalK \bbbk 6 4B xx4B MATHEMATICAL DOUBLE-STRUCK CAPITAL K &1D543 E50B u1D543 ____ 6X3B 1dZ A Lopf ISOMOPF Q\BbbL \BBL DoubleStruckCapitalL 6 4C xx4C MATHEMATICAL DOUBLE-STRUCK CAPITAL L &1D544 E50C u1D544 ____ 6X3C 1dZ A Mopf ISOMOPF Q\BbbM \BBM DoubleStruckCapitalM \bbbm 6 4D xx4D MATHEMATICAL DOUBLE-STRUCK CAPITAL M +1D545 2115 uni2115 EFAD 0 Z A Nopf ISOMOPF Q\BbbN \BBN DoubleStruckCapitalN \bbbn 0x2115 6 4E xx4E MATHEMATICAL DOUBLE-STRUCK CAPITAL N &1D546 E50E u1D546 22E9 6X3E 1dZ A Oopf ISOMOPF Q\BbbO \BBO DoubleStruckCapitalO 6 4F xx4F MATHEMATICAL DOUBLE-STRUCK CAPITAL O +1D547 2119 uni2119 EB21 0 Z A Popf ISOMOPF Q\BbbP \BBP DoubleStruckCapitalP \bbbp 0x2119 6 50 xx50 MATHEMATICAL DOUBLE-STRUCK CAPITAL P +1D548 211A uni211A 22E7 0 Z A Qopf ISOMOPF Q\BbbQ \BBQ DoubleStruckCapitalQ 0x211A 6 51 xx51 MATHEMATICAL DOUBLE-STRUCK CAPITAL Q +1D549 211D uni211D EFAE 0 Z A Ropf ISOMOPF Q\BbbR \BBR DoubleStruckCapitalR \bbbr 0x211D 6 52 xx52 MATHEMATICAL DOUBLE-STRUCK CAPITAL R &1D54A E512 u1D54A ____ 6X42 1dZ A Sopf ISOMOPF Q\BbbS \BBS DoubleStruckCapitalS \bbbs 6 53 xx53 MATHEMATICAL DOUBLE-STRUCK CAPITAL S &1D54B E513 u1D54B ____ 6X43 1dZ A Topf ISOMOPF Q\BbbT \BBT DoubleStruckCapitalT \bbbt 6 54 xx54 MATHEMATICAL DOUBLE-STRUCK CAPITAL T &1D54C E514 u1D54C ____ 6X44 1dZ A Uopf ISOMOPF Q\BbbU \BBU DoubleStruckCapitalU 6 55 xx55 MATHEMATICAL DOUBLE-STRUCK CAPITAL U &1D54D E515 u1D54D ____ 6X45 1dZ A Vopf ISOMOPF Q\BbbV \BBV DoubleStruckCapitalV 6 56 xx56 MATHEMATICAL DOUBLE-STRUCK CAPITAL V &1D54E E516 u1D54E ____ 6X46 1dZ A Wopf ISOMOPF Q\BbbW \BBW DoubleStruckCapitalW 6 57 xx57 MATHEMATICAL DOUBLE-STRUCK CAPITAL W &1D54F E517 u1D54F ____ 6X47 1dZ A Xopf ISOMOPF Q\BbbX \BBX DoubleStruckCapitalX 6 58 xx58 MATHEMATICAL DOUBLE-STRUCK CAPITAL X &1D550 E518 u1D550 ____ 6X48 1dZ A Yopf ISOMOPF Q\BbbY \BBY DoubleStruckCapitalY 6 59 xx59 MATHEMATICAL DOUBLE-STRUCK CAPITAL Y +1D551 2124 uni2124 EFAF 0 Z A Zopf ISOMOPF Q\BbbZ \BBZ DoubleStruckCapitalZ \bbbz 0x2124 6 5A xx5A MATHEMATICAL DOUBLE-STRUCK CAPITAL Z &1D552 F6E6 u1D552 6X50 1dZ A aopf Q\Bbba DoubleStruckA MATHEMATICAL DOUBLE-STRUCK SMALL A &1D553 F6E7 u1D553 6X51 1dZ A bopf Q\Bbbb DoubleStruckB MATHEMATICAL DOUBLE-STRUCK SMALL B &1D554 F6E8 u1D554 6X52 1dZ A copf Q\Bbbc DoubleStruckC MATHEMATICAL DOUBLE-STRUCK SMALL C &1D555 F6E9 u1D555 6X53 1dZ A dopf Q\Bbbd DoubleStruckD MATHEMATICAL DOUBLE-STRUCK SMALL D &1D556 F6EA u1D556 6X54 1dZ A eopf Q\Bbbe DoubleStruckE MATHEMATICAL DOUBLE-STRUCK SMALL E &1D557 F6EB u1D557 6X55 1dZ A fopf Q\Bbbf DoubleStruckF MATHEMATICAL DOUBLE-STRUCK SMALL F &1D558 F6EC u1D558 6X56 1dZ A gopf Q\Bbbg DoubleStruckG MATHEMATICAL DOUBLE-STRUCK SMALL G &1D559 F6ED u1D559 6X57 1dZ A hopf Q\Bbbh DoubleStruckH MATHEMATICAL DOUBLE-STRUCK SMALL H &1D55A F6EE u1D55A 6X58 1dZ A iopf Q\Bbbi DoubleStruckI MATHEMATICAL DOUBLE-STRUCK SMALL I &1D55B F6EF u1D55B 6X59 1dZ A jopf Q\Bbbj DoubleStruckJ MATHEMATICAL DOUBLE-STRUCK SMALL J &1D55C F6F0 u1D55C 6X5A 1dZ A kopf A\Bbbk DoubleStruckK MATHEMATICAL DOUBLE-STRUCK SMALL K &1D55D F6F1 u1D55D 6X5B 1dZ A lopf Q\Bbbl DoubleStruckL MATHEMATICAL DOUBLE-STRUCK SMALL L &1D55E F6F2 u1D55E 6X5C 1dZ A mopf Q\Bbbm DoubleStruckM MATHEMATICAL DOUBLE-STRUCK SMALL M &1D55F F6F3 u1D55F 6X5D 1dZ A nopf Q\Bbbn DoubleStruckN MATHEMATICAL DOUBLE-STRUCK SMALL N &1D560 F6F4 u1D560 6X5E 1dZ A oopf Q\Bbbo DoubleStruckO MATHEMATICAL DOUBLE-STRUCK SMALL O &1D561 F6F5 u1D561 6X5F 1dZ A popf Q\Bbbp DoubleStruckP MATHEMATICAL DOUBLE-STRUCK SMALL P &1D562 F6F6 u1D562 6X60 1dZ A qopf Q\Bbbq DoubleStruckQ MATHEMATICAL DOUBLE-STRUCK SMALL Q &1D563 F6F7 u1D563 6X61 1dZ A ropf Q\Bbbr DoubleStruckR MATHEMATICAL DOUBLE-STRUCK SMALL R &1D564 F6F8 u1D564 6X62 1dZ A sopf Q\Bbbs DoubleStruckS MATHEMATICAL DOUBLE-STRUCK SMALL S &1D565 F6F9 u1D565 6X63 1dZ A topf Q\Bbbt DoubleStruckT MATHEMATICAL DOUBLE-STRUCK SMALL T &1D566 F6FA u1D566 6X64 1dZ A uopf Q\Bbbu DoubleStruckU MATHEMATICAL DOUBLE-STRUCK SMALL U &1D567 F6FB u1D567 6X65 1dZ A vopf Q\Bbbv DoubleStruckV MATHEMATICAL DOUBLE-STRUCK SMALL V &1D568 F6FC u1D568 6X66 1dZ A wopf Q\Bbbw DoubleStruckW MATHEMATICAL DOUBLE-STRUCK SMALL W &1D569 F6FD u1D569 6X67 1dZ A xopf Q\Bbbx DoubleStruckX MATHEMATICAL DOUBLE-STRUCK SMALL X &1D56A F6FE u1D56A 6X68 1dZ A yopf Q\Bbby DoubleStruckY MATHEMATICAL DOUBLE-STRUCK SMALL Y &1D56B F6FF u1D56B 6X69 1dZ A zopf Q\Bbbz DoubleStruckZ MATHEMATICAL DOUBLE-STRUCK SMALL Z &1D56C u1D56C 1 Z A Q\bffrakA MATHEMATICAL BOLD FRAKTUR CAPITAL A &1D56D u1D56D 1 Z A Q\bffrakB MATHEMATICAL BOLD FRAKTUR CAPITAL B &1D56E u1D56E 1 Z A Q\bffrakC MATHEMATICAL BOLD FRAKTUR CAPITAL C &1D56F u1D56F 1 Z A Q\bffrakD MATHEMATICAL BOLD FRAKTUR CAPITAL D &1D570 u1D570 1 Z A Q\bffrakE MATHEMATICAL BOLD FRAKTUR CAPITAL E &1D571 u1D571 1 Z A Q\bffrakF MATHEMATICAL BOLD FRAKTUR CAPITAL F &1D572 u1D572 1 Z A Q\bffrakG MATHEMATICAL BOLD FRAKTUR CAPITAL G &1D573 u1D573 1 Z A Q\bffrakH MATHEMATICAL BOLD FRAKTUR CAPITAL H &1D574 u1D574 1 Z A Q\bffrakI MATHEMATICAL BOLD FRAKTUR CAPITAL I &1D575 u1D575 1 Z A Q\bffrakJ MATHEMATICAL BOLD FRAKTUR CAPITAL J &1D576 u1D576 1 Z A Q\bffrakK MATHEMATICAL BOLD FRAKTUR CAPITAL K &1D577 u1D577 1 Z A Q\bffrakL MATHEMATICAL BOLD FRAKTUR CAPITAL L &1D578 u1D578 1 Z A Q\bffrakM MATHEMATICAL BOLD FRAKTUR CAPITAL M &1D579 u1D579 1 Z A Q\bffrakN MATHEMATICAL BOLD FRAKTUR CAPITAL N &1D57A u1D57A 1 Z A Q\bffrakO MATHEMATICAL BOLD FRAKTUR CAPITAL O &1D57B u1D57B 1 Z A Q\bffrakP MATHEMATICAL BOLD FRAKTUR CAPITAL P &1D57C u1D57C 1 Z A Q\bffrakQ MATHEMATICAL BOLD FRAKTUR CAPITAL Q &1D57D u1D57D 1 Z A Q\bffrakR MATHEMATICAL BOLD FRAKTUR CAPITAL R &1D57E u1D57E 1 Z A Q\bffrakS MATHEMATICAL BOLD FRAKTUR CAPITAL S &1D57F u1D57F 1 Z A Q\bffrakT MATHEMATICAL BOLD FRAKTUR CAPITAL T &1D580 u1D580 1 Z A Q\bffrakU MATHEMATICAL BOLD FRAKTUR CAPITAL U &1D581 u1D581 1 Z A Q\bffrakV MATHEMATICAL BOLD FRAKTUR CAPITAL V &1D582 u1D582 1 Z A Q\bffrakW MATHEMATICAL BOLD FRAKTUR CAPITAL W &1D583 u1D583 1 Z A Q\bffrakX MATHEMATICAL BOLD FRAKTUR CAPITAL X &1D584 u1D584 1 Z A Q\bffrakY MATHEMATICAL BOLD FRAKTUR CAPITAL Y &1D585 u1D585 1 Z A Q\bffrakZ MATHEMATICAL BOLD FRAKTUR CAPITAL Z &1D586 u1D586 1 Z A Q\bffraka MATHEMATICAL BOLD FRAKTUR SMALL A &1D587 u1D587 1 Z A Q\bffrakb MATHEMATICAL BOLD FRAKTUR SMALL B &1D588 u1D588 1 Z A Q\bffrakc MATHEMATICAL BOLD FRAKTUR SMALL C &1D589 u1D589 1 Z A Q\bffrakd MATHEMATICAL BOLD FRAKTUR SMALL D &1D58A u1D58A 1 Z A Q\bffrake MATHEMATICAL BOLD FRAKTUR SMALL E &1D58B u1D58B 1 Z A Q\bffrakf MATHEMATICAL BOLD FRAKTUR SMALL F &1D58C u1D58C 1 Z A Q\bffrakg MATHEMATICAL BOLD FRAKTUR SMALL G &1D58D u1D58D 1 Z A Q\bffrakh MATHEMATICAL BOLD FRAKTUR SMALL H &1D58E u1D58E 1 Z A Q\bffraki MATHEMATICAL BOLD FRAKTUR SMALL I &1D58F u1D58F 1 Z A Q\bffrakj MATHEMATICAL BOLD FRAKTUR SMALL J &1D590 u1D590 1 Z A Q\bffrakk MATHEMATICAL BOLD FRAKTUR SMALL K &1D591 u1D591 1 Z A Q\bffrakl MATHEMATICAL BOLD FRAKTUR SMALL L &1D592 u1D592 1 Z A Q\bffrakm MATHEMATICAL BOLD FRAKTUR SMALL M &1D593 u1D593 1 Z A Q\bffrakn MATHEMATICAL BOLD FRAKTUR SMALL N &1D594 u1D594 1 Z A Q\bffrako MATHEMATICAL BOLD FRAKTUR SMALL O &1D595 u1D595 1 Z A Q\bffrakp MATHEMATICAL BOLD FRAKTUR SMALL P &1D596 u1D596 1 Z A Q\bffrakq MATHEMATICAL BOLD FRAKTUR SMALL Q &1D597 u1D597 1 Z A Q\bffrakr MATHEMATICAL BOLD FRAKTUR SMALL R &1D598 u1D598 1 Z A Q\bffraks MATHEMATICAL BOLD FRAKTUR SMALL S &1D599 u1D599 1 Z A Q\bffrakt MATHEMATICAL BOLD FRAKTUR SMALL T &1D59A u1D59A 1 Z A Q\bffraku MATHEMATICAL BOLD FRAKTUR SMALL U &1D59B u1D59B 1 Z A Q\bffrakv MATHEMATICAL BOLD FRAKTUR SMALL V &1D59C u1D59C 1 Z A Q\bffrakw MATHEMATICAL BOLD FRAKTUR SMALL W &1D59D u1D59D 1 Z A Q\bffrakx MATHEMATICAL BOLD FRAKTUR SMALL X &1D59E u1D59E 1 Z A Q\bffraky MATHEMATICAL BOLD FRAKTUR SMALL Y &1D59F u1D59F 1 Z A Q\bffrakz MATHEMATICAL BOLD FRAKTUR SMALL Z &1D5A0 u1D5A0 1 Z A Q\sansA MATHEMATICAL SANS-SERIF CAPITAL A &1D5A1 u1D5A1 1 Z A Q\sansB MATHEMATICAL SANS-SERIF CAPITAL B &1D5A2 u1D5A2 1 Z A Q\sansC MATHEMATICAL SANS-SERIF CAPITAL C &1D5A3 u1D5A3 1 Z A Q\sansD MATHEMATICAL SANS-SERIF CAPITAL D &1D5A4 u1D5A4 1 Z A Q\sansE MATHEMATICAL SANS-SERIF CAPITAL E &1D5A5 u1D5A5 1 Z A Q\sansF MATHEMATICAL SANS-SERIF CAPITAL F &1D5A6 u1D5A6 1 Z A Q\sansG MATHEMATICAL SANS-SERIF CAPITAL G &1D5A7 u1D5A7 1 Z A Q\sansH MATHEMATICAL SANS-SERIF CAPITAL H &1D5A8 u1D5A8 1 Z A Q\sansI MATHEMATICAL SANS-SERIF CAPITAL I &1D5A9 u1D5A9 1 Z A Q\sansJ MATHEMATICAL SANS-SERIF CAPITAL J &1D5AA u1D5AA 1 Z A Q\sansK MATHEMATICAL SANS-SERIF CAPITAL K &1D5AB EA52 u1D5AB 6X13 1 Z A Q\sansL MATHEMATICAL SANS-SERIF CAPITAL L &1D5AC u1D5AC 1 Z A Q\sansM sfL MATHEMATICAL SANS-SERIF CAPITAL M &1D5AD u1D5AD 1 Z A Q\sansN MATHEMATICAL SANS-SERIF CAPITAL N &1D5AE u1D5AE 1 Z A Q\sansO MATHEMATICAL SANS-SERIF CAPITAL O &1D5AF u1D5AF 1 Z A Q\sansP MATHEMATICAL SANS-SERIF CAPITAL P &1D5B0 u1D5B0 1 Z A Q\sansQ MATHEMATICAL SANS-SERIF CAPITAL Q &1D5B1 u1D5B1 1 Z A Q\sansR MATHEMATICAL SANS-SERIF CAPITAL R &1D5B2 u1D5B2 1 Z A Q\sansS MATHEMATICAL SANS-SERIF CAPITAL S &1D5B3 u1D5B3 1 Z A Q\sansT MATHEMATICAL SANS-SERIF CAPITAL T &1D5B4 u1D5B4 1 Z A Q\sansU MATHEMATICAL SANS-SERIF CAPITAL U &1D5B5 u1D5B5 1 Z A Q\sansV MATHEMATICAL SANS-SERIF CAPITAL V &1D5B6 u1D5B6 1 Z A Q\sansW MATHEMATICAL SANS-SERIF CAPITAL W &1D5B7 u1D5B7 1 Z A Q\sansX MATHEMATICAL SANS-SERIF CAPITAL X &1D5B8 u1D5B8 1 Z A Q\sansY MATHEMATICAL SANS-SERIF CAPITAL Y &1D5B9 u1D5B9 1 Z A Q\sansZ MATHEMATICAL SANS-SERIF CAPITAL Z &1D5BA u1D5BA 1 Z A Q\sansa MATHEMATICAL SANS-SERIF SMALL A &1D5BB u1D5BB 1 Z A Q\sansb MATHEMATICAL SANS-SERIF SMALL B &1D5BC u1D5BC 1 Z A Q\sansc MATHEMATICAL SANS-SERIF SMALL C &1D5BD u1D5BD 1 Z A Q\sansd MATHEMATICAL SANS-SERIF SMALL D &1D5BE u1D5BE 1 Z A Q\sanse MATHEMATICAL SANS-SERIF SMALL E &1D5BF u1D5BF 1 Z A Q\sansf MATHEMATICAL SANS-SERIF SMALL F &1D5C0 u1D5C0 1 Z A Q\sansg MATHEMATICAL SANS-SERIF SMALL G &1D5C1 u1D5C1 1 Z A Q\sansh MATHEMATICAL SANS-SERIF SMALL H &1D5C2 u1D5C2 1 Z A Q\sansi MATHEMATICAL SANS-SERIF SMALL I &1D5C3 u1D5C3 1 Z A Q\sansj MATHEMATICAL SANS-SERIF SMALL J &1D5C4 u1D5C4 1 Z A Q\sansk MATHEMATICAL SANS-SERIF SMALL K &1D5C5 u1D5C5 1 Z A Q\sansl MATHEMATICAL SANS-SERIF SMALL L &1D5C6 u1D5C6 1 Z A Q\sansm MATHEMATICAL SANS-SERIF SMALL M &1D5C7 u1D5C7 1 Z A Q\sansn MATHEMATICAL SANS-SERIF SMALL N &1D5C8 u1D5C8 1 Z A Q\sanso MATHEMATICAL SANS-SERIF SMALL O &1D5C9 u1D5C9 1 Z A Q\sansp MATHEMATICAL SANS-SERIF SMALL P &1D5CA u1D5CA 1 Z A Q\sansq MATHEMATICAL SANS-SERIF SMALL Q &1D5CB u1D5CB 1 Z A Q\sansr MATHEMATICAL SANS-SERIF SMALL R &1D5CC u1D5CC 1 Z A Q\sanss MATHEMATICAL SANS-SERIF SMALL S &1D5CD u1D5CD 1 Z A Q\sanst MATHEMATICAL SANS-SERIF SMALL T &1D5CE u1D5CE 1 Z A Q\sansu MATHEMATICAL SANS-SERIF SMALL U &1D5CF u1D5CF 1 Z A Q\sansv MATHEMATICAL SANS-SERIF SMALL V &1D5D0 u1D5D0 1 Z A Q\sansw MATHEMATICAL SANS-SERIF SMALL W &1D5D1 u1D5D1 1 Z A Q\sansx MATHEMATICAL SANS-SERIF SMALL X &1D5D2 u1D5D2 1 Z A Q\sansy MATHEMATICAL SANS-SERIF SMALL Y &1D5D3 u1D5D3 1 Z A Q\sansz MATHEMATICAL SANS-SERIF SMALL Z &1D5D4 u1D5D4 1 Z A Q\bfsansA MATHEMATICAL SANS-SERIF BOLD CAPITAL A &1D5D5 u1D5D5 1 Z A Q\bfsansB MATHEMATICAL SANS-SERIF BOLD CAPITAL B &1D5D6 u1D5D6 1 Z A Q\bfsansC MATHEMATICAL SANS-SERIF BOLD CAPITAL C &1D5D7 u1D5D7 1 Z A Q\bfsansD MATHEMATICAL SANS-SERIF BOLD CAPITAL D &1D5D8 u1D5D8 1 Z A Q\bfsansE MATHEMATICAL SANS-SERIF BOLD CAPITAL E &1D5D9 u1D5D9 1 Z A Q\bfsansF MATHEMATICAL SANS-SERIF BOLD CAPITAL F &1D5DA u1D5DA 1 Z A Q\bfsansG MATHEMATICAL SANS-SERIF BOLD CAPITAL G &1D5DB u1D5DB 1 Z A Q\bfsansH MATHEMATICAL SANS-SERIF BOLD CAPITAL H &1D5DC u1D5DC 1 Z A Q\bfsansI MATHEMATICAL SANS-SERIF BOLD CAPITAL I &1D5DD u1D5DD 1 Z A Q\bfsansJ MATHEMATICAL SANS-SERIF BOLD CAPITAL J &1D5DE u1D5DE 1 Z A Q\bfsansK MATHEMATICAL SANS-SERIF BOLD CAPITAL K &1D5DF u1D5DF 1 Z A Q\bfsansL MATHEMATICAL SANS-SERIF BOLD CAPITAL L &1D5E0 u1D5E0 1 Z A Q\bfsansM MATHEMATICAL SANS-SERIF BOLD CAPITAL M &1D5E1 u1D5E1 1 Z A Q\bfsansN MATHEMATICAL SANS-SERIF BOLD CAPITAL N &1D5E2 u1D5E2 1 Z A Q\bfsansO MATHEMATICAL SANS-SERIF BOLD CAPITAL O &1D5E3 u1D5E3 1 Z A Q\bfsansP MATHEMATICAL SANS-SERIF BOLD CAPITAL P &1D5E4 u1D5E4 1 Z A Q\bfsansQ MATHEMATICAL SANS-SERIF BOLD CAPITAL Q &1D5E5 u1D5E5 1 Z A Q\bfsansR MATHEMATICAL SANS-SERIF BOLD CAPITAL R &1D5E6 u1D5E6 1 Z A Q\bfsansS MATHEMATICAL SANS-SERIF BOLD CAPITAL S &1D5E7 u1D5E7 1 Z A Q\bfsansT MATHEMATICAL SANS-SERIF BOLD CAPITAL T &1D5E8 u1D5E8 1 Z A Q\bfsansU MATHEMATICAL SANS-SERIF BOLD CAPITAL U &1D5E9 u1D5E9 1 Z A Q\bfsansV MATHEMATICAL SANS-SERIF BOLD CAPITAL V &1D5EA u1D5EA 1 Z A Q\bfsansW MATHEMATICAL SANS-SERIF BOLD CAPITAL W &1D5EB u1D5EB 1 Z A Q\bfsansX MATHEMATICAL SANS-SERIF BOLD CAPITAL X &1D5EC u1D5EC 1 Z A Q\bfsansY MATHEMATICAL SANS-SERIF BOLD CAPITAL Y &1D5ED u1D5ED 1 Z A Q\bfsansZ MATHEMATICAL SANS-SERIF BOLD CAPITAL Z &1D5EE u1D5EE 1 Z A Q\bfsansa MATHEMATICAL SANS-SERIF BOLD SMALL A &1D5EF u1D5EF 1 Z A Q\bfsansb MATHEMATICAL SANS-SERIF BOLD SMALL B &1D5F0 u1D5F0 1 Z A Q\bfsansc MATHEMATICAL SANS-SERIF BOLD SMALL C &1D5F1 u1D5F1 1 Z A Q\bfsansd MATHEMATICAL SANS-SERIF BOLD SMALL D &1D5F2 u1D5F2 1 Z A Q\bfsanse MATHEMATICAL SANS-SERIF BOLD SMALL E &1D5F3 u1D5F3 1 Z A Q\bfsansf MATHEMATICAL SANS-SERIF BOLD SMALL F &1D5F4 u1D5F4 1 Z A Q\bfsansg MATHEMATICAL SANS-SERIF BOLD SMALL G &1D5F5 u1D5F5 1 Z A Q\bfsansh MATHEMATICAL SANS-SERIF BOLD SMALL H &1D5F6 u1D5F6 1 Z A Q\bfsansi MATHEMATICAL SANS-SERIF BOLD SMALL I &1D5F7 u1D5F7 1 Z A Q\bfsansj MATHEMATICAL SANS-SERIF BOLD SMALL J &1D5F8 u1D5F8 1 Z A Q\bfsansk MATHEMATICAL SANS-SERIF BOLD SMALL K &1D5F9 u1D5F9 1 Z A Q\bfsansl MATHEMATICAL SANS-SERIF BOLD SMALL L &1D5FA u1D5FA 1 Z A Q\bfsansm MATHEMATICAL SANS-SERIF BOLD SMALL M &1D5FB u1D5FB 1 Z A Q\bfsansn MATHEMATICAL SANS-SERIF BOLD SMALL N &1D5FC u1D5FC 1 Z A Q\bfsanso MATHEMATICAL SANS-SERIF BOLD SMALL O &1D5FD u1D5FD 1 Z A Q\bfsansp MATHEMATICAL SANS-SERIF BOLD SMALL P &1D5FE u1D5FE 1 Z A Q\bfsansq MATHEMATICAL SANS-SERIF BOLD SMALL Q &1D5FF u1D5FF 1 Z A Q\bfsansr MATHEMATICAL SANS-SERIF BOLD SMALL R &1D600 u1D600 1 Z A Q\bfsanss MATHEMATICAL SANS-SERIF BOLD SMALL S &1D601 u1D601 1 Z A Q\bfsanst MATHEMATICAL SANS-SERIF BOLD SMALL T &1D602 u1D602 1 Z A Q\bfsansu MATHEMATICAL SANS-SERIF BOLD SMALL U &1D603 u1D603 1 Z A Q\bfsansv MATHEMATICAL SANS-SERIF BOLD SMALL V &1D604 u1D604 1 Z A Q\bfsansw MATHEMATICAL SANS-SERIF BOLD SMALL W &1D605 u1D605 1 Z A Q\bfsansx MATHEMATICAL SANS-SERIF BOLD SMALL X &1D606 u1D606 1 Z A Q\bfsansy MATHEMATICAL SANS-SERIF BOLD SMALL Y &1D607 u1D607 1 Z A Q\bfsansz MATHEMATICAL SANS-SERIF BOLD SMALL Z &1D608 u1D608 1 Z A Q\itsansA MATHEMATICAL SANS-SERIF ITALIC CAPITAL A &1D609 u1D609 1 Z A Q\itsansB MATHEMATICAL SANS-SERIF ITALIC CAPITAL B &1D60A u1D60A 1 Z A Q\itsansC MATHEMATICAL SANS-SERIF ITALIC CAPITAL C &1D60B u1D60B 1 Z A Q\itsansD MATHEMATICAL SANS-SERIF ITALIC CAPITAL D &1D60C u1D60C 1 Z A Q\itsansE MATHEMATICAL SANS-SERIF ITALIC CAPITAL E &1D60D u1D60D 1 Z A Q\itsansF MATHEMATICAL SANS-SERIF ITALIC CAPITAL F &1D60E u1D60E 1 Z A Q\itsansG MATHEMATICAL SANS-SERIF ITALIC CAPITAL G &1D60F u1D60F 1 Z A Q\itsansH MATHEMATICAL SANS-SERIF ITALIC CAPITAL H &1D610 u1D610 1 Z A Q\itsansI MATHEMATICAL SANS-SERIF ITALIC CAPITAL I &1D611 u1D611 1 Z A Q\itsansJ MATHEMATICAL SANS-SERIF ITALIC CAPITAL J &1D612 u1D612 1 Z A Q\itsansK MATHEMATICAL SANS-SERIF ITALIC CAPITAL K &1D613 u1D613 1 Z A Q\itsansL MATHEMATICAL SANS-SERIF ITALIC CAPITAL L &1D614 u1D614 1 Z A Q\itsansM MATHEMATICAL SANS-SERIF ITALIC CAPITAL M &1D615 u1D615 1 Z A Q\itsansN MATHEMATICAL SANS-SERIF ITALIC CAPITAL N &1D616 u1D616 1 Z A Q\itsansO MATHEMATICAL SANS-SERIF ITALIC CAPITAL O &1D617 u1D617 1 Z A Q\itsansP MATHEMATICAL SANS-SERIF ITALIC CAPITAL P &1D618 u1D618 1 Z A Q\itsansQ MATHEMATICAL SANS-SERIF ITALIC CAPITAL Q &1D619 u1D619 1 Z A Q\itsansR MATHEMATICAL SANS-SERIF ITALIC CAPITAL R &1D61A u1D61A 1 Z A Q\itsansS MATHEMATICAL SANS-SERIF ITALIC CAPITAL S &1D61B u1D61B 1 Z A Q\itsansT MATHEMATICAL SANS-SERIF ITALIC CAPITAL T &1D61C u1D61C 1 Z A Q\itsansU MATHEMATICAL SANS-SERIF ITALIC CAPITAL U &1D61D u1D61D 1 Z A Q\itsansV MATHEMATICAL SANS-SERIF ITALIC CAPITAL V &1D61E u1D61E 1 Z A Q\itsansW MATHEMATICAL SANS-SERIF ITALIC CAPITAL W &1D61F u1D61F 1 Z A Q\itsansX MATHEMATICAL SANS-SERIF ITALIC CAPITAL X &1D620 u1D620 1 Z A Q\itsansY MATHEMATICAL SANS-SERIF ITALIC CAPITAL Y &1D621 u1D621 1 Z A Q\itsansZ MATHEMATICAL SANS-SERIF ITALIC CAPITAL Z &1D622 u1D622 1 Z A Q\itsansa MATHEMATICAL SANS-SERIF ITALIC SMALL A &1D623 u1D623 1 Z A Q\itsansb MATHEMATICAL SANS-SERIF ITALIC SMALL B &1D624 u1D624 1 Z A Q\itsansc MATHEMATICAL SANS-SERIF ITALIC SMALL C &1D625 u1D625 1 Z A Q\itsansd MATHEMATICAL SANS-SERIF ITALIC SMALL D &1D626 u1D626 1 Z A Q\itsanse MATHEMATICAL SANS-SERIF ITALIC SMALL E &1D627 u1D627 1 Z A Q\itsansf MATHEMATICAL SANS-SERIF ITALIC SMALL F &1D628 u1D628 1 Z A Q\itsansg MATHEMATICAL SANS-SERIF ITALIC SMALL G &1D629 u1D629 1 Z A Q\itsansh MATHEMATICAL SANS-SERIF ITALIC SMALL H &1D62A u1D62A 1 Z A Q\itsansi MATHEMATICAL SANS-SERIF ITALIC SMALL I &1D62B u1D62B 1 Z A Q\itsansj MATHEMATICAL SANS-SERIF ITALIC SMALL J &1D62C u1D62C 1 Z A Q\itsansk MATHEMATICAL SANS-SERIF ITALIC SMALL K &1D62D u1D62D 1 Z A Q\itsansl MATHEMATICAL SANS-SERIF ITALIC SMALL L &1D62E u1D62E 1 Z A Q\itsansm MATHEMATICAL SANS-SERIF ITALIC SMALL M &1D62F u1D62F 1 Z A Q\itsansn MATHEMATICAL SANS-SERIF ITALIC SMALL N &1D630 u1D630 1 Z A Q\itsanso MATHEMATICAL SANS-SERIF ITALIC SMALL O &1D631 u1D631 1 Z A Q\itsansp MATHEMATICAL SANS-SERIF ITALIC SMALL P &1D632 u1D632 1 Z A Q\itsansq MATHEMATICAL SANS-SERIF ITALIC SMALL Q &1D633 u1D633 1 Z A Q\itsansr MATHEMATICAL SANS-SERIF ITALIC SMALL R &1D634 u1D634 1 Z A Q\itsanss MATHEMATICAL SANS-SERIF ITALIC SMALL S &1D635 u1D635 1 Z A Q\itsanst MATHEMATICAL SANS-SERIF ITALIC SMALL T &1D636 u1D636 1 Z A Q\itsansu MATHEMATICAL SANS-SERIF ITALIC SMALL U &1D637 u1D637 1 Z A Q\itsansv MATHEMATICAL SANS-SERIF ITALIC SMALL V &1D638 u1D638 1 Z A Q\itsansw MATHEMATICAL SANS-SERIF ITALIC SMALL W &1D639 u1D639 1 Z A Q\itsansx MATHEMATICAL SANS-SERIF ITALIC SMALL X &1D63A u1D63A 1 Z A Q\itsansy MATHEMATICAL SANS-SERIF ITALIC SMALL Y &1D63B u1D63B 1 Z A Q\itsansz MATHEMATICAL SANS-SERIF ITALIC SMALL Z &1D63C u1D63C 1 Z A Q\bfitsansA MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL A &1D63D u1D63D 1 Z A Q\bfitsansB MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL B &1D63E u1D63E 1 Z A Q\bfitsansC MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL C &1D63F u1D63F 1 Z A Q\bfitsansD MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL D &1D640 u1D640 1 Z A Q\bfitsansE MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL E &1D641 u1D641 1 Z A Q\bfitsansF MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL F &1D642 u1D642 1 Z A Q\bfitsansG MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL G &1D643 u1D643 1 Z A Q\bfitsansH MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL H &1D644 u1D644 1 Z A Q\bfitsansI MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL I &1D645 u1D645 1 Z A Q\bfitsansJ MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL J &1D646 u1D646 1 Z A Q\bfitsansK MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL K &1D647 u1D647 1 Z A Q\bfitsansL MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL L &1D648 u1D648 1 Z A Q\bfitsansM MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL M &1D649 u1D649 1 Z A Q\bfitsansN MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL N &1D64A u1D64A 1 Z A Q\bfitsansO MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL O &1D64B u1D64B 1 Z A Q\bfitsansP MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL P &1D64C u1D64C 1 Z A Q\bfitsansQ MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL Q &1D64D u1D64D 1 Z A Q\bfitsansR MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL R &1D64E u1D64E 1 Z A Q\bfitsansS MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL S &1D64F u1D64F 1 Z A Q\bfitsansT MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL T &1D650 u1D650 1 Z A Q\bfitsansU MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL U &1D651 u1D651 1 Z A Q\bfitsansV MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL V &1D652 u1D652 1 Z A Q\bfitsansW MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL W &1D653 u1D653 1 Z A Q\bfitsansX MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL X &1D654 u1D654 1 Z A Q\bfitsansY MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL Y &1D655 u1D655 1 Z A Q\bfitsansZ MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL Z &1D656 u1D656 1 Z A Q\bfitsansa MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL A &1D657 u1D657 1 Z A Q\bfitsansb MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL B &1D658 u1D658 1 Z A Q\bfitsansc MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL C &1D659 u1D659 1 Z A Q\bfitsansd MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL D &1D65A u1D65A 1 Z A Q\bfitsanse MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL E &1D65B u1D65B 1 Z A Q\bfitsansf MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL F &1D65C u1D65C 1 Z A Q\bfitsansg MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL G &1D65D u1D65D 1 Z A Q\bfitsansh MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL H &1D65E u1D65E 1 Z A Q\bfitsansi MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL I &1D65F u1D65F 1 Z A Q\bfitsansj MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL J &1D660 u1D660 1 Z A Q\bfitsansk MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL K &1D661 u1D661 1 Z A Q\bfitsansl MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL L &1D662 u1D662 1 Z A Q\bfitsansm MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL M &1D663 u1D663 1 Z A Q\bfitsansn MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL N &1D664 u1D664 1 Z A Q\bfitsanso MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL O &1D665 u1D665 1 Z A Q\bfitsansp MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL P &1D666 u1D666 1 Z A Q\bfitsansq MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL Q &1D667 u1D667 1 Z A Q\bfitsansr MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL R &1D668 u1D668 1 Z A Q\bfitsanss MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL S &1D669 u1D669 1 Z A Q\bfitsanst MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL T &1D66A u1D66A 1 Z A Q\bfitsansu MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL U &1D66B u1D66B 1 Z A Q\bfitsansv MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL V &1D66C u1D66C 1 Z A Q\bfitsansw MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL W &1D66D u1D66D 1 Z A Q\bfitsansx MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL X &1D66E u1D66E 1 Z A Q\bfitsansy MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL Y &1D66F u1D66F 1 Z A Q\bfitsansz MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL Z &1D670 u1D670 1 Z A Q\ttA MATHEMATICAL MONOSPACE CAPITAL A &1D671 u1D671 1 Z A Q\ttB MATHEMATICAL MONOSPACE CAPITAL B &1D672 u1D672 1 Z A Q\ttC MATHEMATICAL MONOSPACE CAPITAL C &1D673 u1D673 1 Z A Q\ttD MATHEMATICAL MONOSPACE CAPITAL D &1D674 u1D674 1 Z A Q\ttE MATHEMATICAL MONOSPACE CAPITAL E &1D675 u1D675 1 Z A Q\ttF MATHEMATICAL MONOSPACE CAPITAL F &1D676 u1D676 1 Z A Q\ttG MATHEMATICAL MONOSPACE CAPITAL G &1D677 u1D677 1 Z A Q\ttH MATHEMATICAL MONOSPACE CAPITAL H &1D678 u1D678 1 Z A Q\ttI MATHEMATICAL MONOSPACE CAPITAL I &1D679 u1D679 1 Z A Q\ttJ MATHEMATICAL MONOSPACE CAPITAL J &1D67A u1D67A 1 Z A Q\ttK MATHEMATICAL MONOSPACE CAPITAL K &1D67B u1D67B 1 Z A Q\ttL MATHEMATICAL MONOSPACE CAPITAL L &1D67C u1D67C 1 Z A Q\ttM MATHEMATICAL MONOSPACE CAPITAL M &1D67D u1D67D 1 Z A Q\ttN MATHEMATICAL MONOSPACE CAPITAL N &1D67E u1D67E 1 Z A Q\ttO MATHEMATICAL MONOSPACE CAPITAL O &1D67F u1D67F 1 Z A Q\ttP MATHEMATICAL MONOSPACE CAPITAL P &1D680 u1D680 1 Z A Q\ttQ MATHEMATICAL MONOSPACE CAPITAL Q &1D681 u1D681 1 Z A Q\ttR MATHEMATICAL MONOSPACE CAPITAL R &1D682 u1D682 1 Z A Q\ttS MATHEMATICAL MONOSPACE CAPITAL S &1D683 u1D683 1 Z A Q\ttT MATHEMATICAL MONOSPACE CAPITAL T &1D684 u1D684 1 Z A Q\ttU MATHEMATICAL MONOSPACE CAPITAL U &1D685 u1D685 1 Z A Q\ttV MATHEMATICAL MONOSPACE CAPITAL V &1D686 u1D686 1 Z A Q\ttW MATHEMATICAL MONOSPACE CAPITAL W &1D687 u1D687 1 Z A Q\ttX MATHEMATICAL MONOSPACE CAPITAL X &1D688 u1D688 1 Z A Q\ttY MATHEMATICAL MONOSPACE CAPITAL Y &1D689 u1D689 1 Z A Q\ttZ MATHEMATICAL MONOSPACE CAPITAL Z &1D68A u1D68A 1 Z A Q\tta MATHEMATICAL MONOSPACE SMALL A &1D68B u1D68B 1 Z A Q\ttb MATHEMATICAL MONOSPACE SMALL B &1D68C u1D68C 1 Z A Q\ttc MATHEMATICAL MONOSPACE SMALL C &1D68D u1D68D 1 Z A Q\ttd MATHEMATICAL MONOSPACE SMALL D &1D68E u1D68E 1 Z A Q\tte MATHEMATICAL MONOSPACE SMALL E &1D68F u1D68F 1 Z A Q\ttf MATHEMATICAL MONOSPACE SMALL F &1D690 u1D690 1 Z A Q\ttg MATHEMATICAL MONOSPACE SMALL G &1D691 u1D691 1 Z A Q\tth MATHEMATICAL MONOSPACE SMALL H &1D692 u1D692 1 Z A Q\tti MATHEMATICAL MONOSPACE SMALL I &1D693 u1D693 1 Z A Q\ttj MATHEMATICAL MONOSPACE SMALL J &1D694 u1D694 1 Z A Q\ttk MATHEMATICAL MONOSPACE SMALL K &1D695 u1D695 1 Z A Q\ttl MATHEMATICAL MONOSPACE SMALL L &1D696 u1D696 1 Z A Q\ttm MATHEMATICAL MONOSPACE SMALL M &1D697 u1D697 1 Z A Q\ttn MATHEMATICAL MONOSPACE SMALL N &1D698 u1D698 1 Z A Q\tto MATHEMATICAL MONOSPACE SMALL O &1D699 u1D699 1 Z A Q\ttp MATHEMATICAL MONOSPACE SMALL P &1D69A u1D69A 1 Z A Q\ttq MATHEMATICAL MONOSPACE SMALL Q &1D69B u1D69B 1 Z A Q\ttr MATHEMATICAL MONOSPACE SMALL R &1D69C u1D69C 1 Z A Q\tts MATHEMATICAL MONOSPACE SMALL S &1D69D u1D69D 1 Z A Q\ttt MATHEMATICAL MONOSPACE SMALL T &1D69E u1D69E 1 Z A Q\ttu MATHEMATICAL MONOSPACE SMALL U &1D69F u1D69F 1 Z A Q\ttv MATHEMATICAL MONOSPACE SMALL V &1D6A0 u1D6A0 1 Z A Q\ttw MATHEMATICAL MONOSPACE SMALL W &1D6A1 u1D6A1 1 Z A Q\ttx MATHEMATICAL MONOSPACE SMALL X &1D6A2 u1D6A2 1 Z A Q\tty MATHEMATICAL MONOSPACE SMALL Y &1D6A3 u1D6A3 1 Z A Q\ttz MATHEMATICAL MONOSPACE SMALL Z P1D6A4 u1D6A4 00F5 1 Z A imath ISOAMSO cfh P\imath inodot inodot \imath ScriptDotlessI MATHEMATICAL ITALIC SMALL DOTLESS I P1D6A5 E2D4 u1D6A5 00E5 6X11 1 Z A jmath ISOAMSO cfi P\jmath jnodot jnodot \jmath ScriptDotlessJ MATHEMATICAL ITALIC SMALL DOTLESS J %1D6A6 u1D6A6 0 %1D6A7 u1D6A7 0 &1D6A8 u1D6A8 1 Z A Q\bfAlpha MATHEMATICAL BOLD CAPITAL ALPHA &1D6A9 u1D6A9 1 Z A Q\bfBeta MATHEMATICAL BOLD CAPITAL BETA &1D6AA u1D6AA 1 Z A Q\bfGamma MATHEMATICAL BOLD CAPITAL GAMMA &1D6AB u1D6AB 1 Z A Q\bfDelta MATHEMATICAL BOLD CAPITAL DELTA &1D6AC u1D6AC 1 Z A Q\bfEpsilon MATHEMATICAL BOLD CAPITAL EPSILON &1D6AD u1D6AD 1 Z A Q\bfZeta MATHEMATICAL BOLD CAPITAL ZETA &1D6AE u1D6AE 1 Z A Q\bfEta MATHEMATICAL BOLD CAPITAL ETA &1D6AF u1D6AF 1 Z A Q\bfTheta MATHEMATICAL BOLD CAPITAL THETA &1D6B0 u1D6B0 1 Z A Q\bfIota MATHEMATICAL BOLD CAPITAL IOTA &1D6B1 u1D6B1 1 Z A Q\bfKappa MATHEMATICAL BOLD CAPITAL KAPPA &1D6B2 u1D6B2 1 Z A Q\bfLambda MATHEMATICAL BOLD CAPITAL LAMBDA &1D6B3 u1D6B3 1 Z A Q\bfMu MATHEMATICAL BOLD CAPITAL MU &1D6B4 u1D6B4 1 Z A Q\bfNu MATHEMATICAL BOLD CAPITAL NU &1D6B5 u1D6B5 1 Z A Q\bfXi MATHEMATICAL BOLD CAPITAL XI &1D6B6 u1D6B6 1 Z A Q\bfOmicron MATHEMATICAL BOLD CAPITAL OMICRON &1D6B7 u1D6B7 1 Z A Q\bfPi MATHEMATICAL BOLD CAPITAL PI &1D6B8 u1D6B8 1 Z A Q\bfRho MATHEMATICAL BOLD CAPITAL RHO &1D6B9 u1D6B9 1 Z A Q\bfvarTheta MATHEMATICAL BOLD CAPITAL THETA SYMBOL &1D6BA u1D6BA 1 Z A Q\bfSigma MATHEMATICAL BOLD CAPITAL SIGMA &1D6BB u1D6BB 1 Z A Q\bfTau MATHEMATICAL BOLD CAPITAL TAU &1D6BC u1D6BC 1 Z A Q\bfUpsilon MATHEMATICAL BOLD CAPITAL UPSILON &1D6BD u1D6BD 1 Z A Q\bfPhi MATHEMATICAL BOLD CAPITAL PHI &1D6BE u1D6BE 1 Z A Q\bfChi MATHEMATICAL BOLD CAPITAL CHI &1D6BF u1D6BF 1 Z A Q\bfPsi MATHEMATICAL BOLD CAPITAL PSI &1D6C0 u1D6C0 1 Z A Q\bfOmega MATHEMATICAL BOLD CAPITAL OMEGA &1D6C1 u1D6C1 1 Z N Q\bfnabla MATHEMATICAL BOLD NABLA &1D6C2 u1D6C2 1 Z A Q\bfalpha MATHEMATICAL BOLD SMALL ALPHA &1D6C3 u1D6C3 1 Z A Q\bfbeta MATHEMATICAL BOLD SMALL BETA &1D6C4 u1D6C4 1 Z A Q\bfgamma MATHEMATICAL BOLD SMALL GAMMA &1D6C5 u1D6C5 1 Z A Q\bfdelta MATHEMATICAL BOLD SMALL DELTA &1D6C6 u1D6C6 1 Z A Q\bfvarepsilon MATHEMATICAL BOLD SMALL EPSILON &1D6C7 u1D6C7 1 Z A Q\bfzeta MATHEMATICAL BOLD SMALL ZETA &1D6C8 u1D6C8 1 Z A Q\bfeta MATHEMATICAL BOLD SMALL ETA &1D6C9 u1D6C9 1 Z A Q\bftheta MATHEMATICAL BOLD SMALL THETA &1D6CA u1D6CA 1 Z A Q\bfiota MATHEMATICAL BOLD SMALL IOTA &1D6CB u1D6CB 1 Z A Q\bfkappa MATHEMATICAL BOLD SMALL KAPPA &1D6CC u1D6CC 1 Z A Q\bflambda MATHEMATICAL BOLD SMALL LAMBDA &1D6CD u1D6CD 1 Z A Q\bfmu MATHEMATICAL BOLD SMALL MU &1D6CE u1D6CE 1 Z A Q\bfnu MATHEMATICAL BOLD SMALL NU &1D6CF u1D6CF 1 Z A Q\bfxi MATHEMATICAL BOLD SMALL XI &1D6D0 u1D6D0 1 Z A Q\bfomicron MATHEMATICAL BOLD SMALL OMICRON &1D6D1 u1D6D1 1 Z A Q\bfpi MATHEMATICAL BOLD SMALL PI &1D6D2 u1D6D2 1 Z A Q\bfrho MATHEMATICAL BOLD SMALL RHO &1D6D3 u1D6D3 1 Z A Q\bfvarsigma MATHEMATICAL BOLD SMALL FINAL SIGMA &1D6D4 u1D6D4 1 Z A Q\bfsigma MATHEMATICAL BOLD SMALL SIGMA &1D6D5 u1D6D5 1 Z A Q\bftau MATHEMATICAL BOLD SMALL TAU &1D6D6 u1D6D6 1 Z A Q\bfupsilon MATHEMATICAL BOLD SMALL UPSILON &1D6D7 u1D6D7 1 Z A Q\bfvarphi MATHEMATICAL BOLD SMALL PHI &1D6D8 u1D6D8 1 Z A Q\bfchi MATHEMATICAL BOLD SMALL CHI &1D6D9 u1D6D9 1 Z A Q\bfpsi MATHEMATICAL BOLD SMALL PSI &1D6DA u1D6DA 1 Z A Q\bfomega MATHEMATICAL BOLD SMALL OMEGA &1D6DB u1D6DB 1 Z N Q\bfpartial MATHEMATICAL BOLD PARTIAL DIFFERENTIAL &1D6DC u1D6DC 1 Z A Q\bfepsilon MATHEMATICAL BOLD EPSILON SYMBOL &1D6DD u1D6DD 1 Z A Q\bfvartheta MATHEMATICAL BOLD THETA SYMBOL &1D6DE u1D6DE 1 Z A Q\bfvarkappa MATHEMATICAL BOLD KAPPA SYMBOL &1D6DF u1D6DF 1 Z A Q\bfphi MATHEMATICAL BOLD PHI SYMBOL &1D6E0 u1D6E0 1 Z A Q\bfvarrho MATHEMATICAL BOLD RHO SYMBOL &1D6E1 u1D6E1 1 Z A Q\bfvarpi MATHEMATICAL BOLD PI SYMBOL &1D6E2 u1D6E2 1 Z A Q\itAlpha MATHEMATICAL ITALIC CAPITAL ALPHA &1D6E3 u1D6E3 1 Z A Q\itBeta MATHEMATICAL ITALIC CAPITAL BETA &1D6E4 u1D6E4 1 Z A Q\itGamma MATHEMATICAL ITALIC CAPITAL GAMMA &1D6E5 u1D6E5 1 Z A Q\itDelta MATHEMATICAL ITALIC CAPITAL DELTA &1D6E6 u1D6E6 1 Z A Q\itEpsilon MATHEMATICAL ITALIC CAPITAL EPSILON &1D6E7 u1D6E7 1 Z A Q\itZeta MATHEMATICAL ITALIC CAPITAL ZETA &1D6E8 u1D6E8 1 Z A Q\itEta MATHEMATICAL ITALIC CAPITAL ETA &1D6E9 u1D6E9 1 Z A Q\itTheta MATHEMATICAL ITALIC CAPITAL THETA &1D6EA u1D6EA 1 Z A Q\itIota MATHEMATICAL ITALIC CAPITAL IOTA &1D6EB u1D6EB 1 Z A Q\itKappa MATHEMATICAL ITALIC CAPITAL KAPPA &1D6EC u1D6EC 1 Z A Q\itLambda MATHEMATICAL ITALIC CAPITAL LAMBDA &1D6ED u1D6ED 1 Z A Q\itMu MATHEMATICAL ITALIC CAPITAL MU &1D6EE u1D6EE 1 Z A Q\itNu MATHEMATICAL ITALIC CAPITAL NU &1D6EF u1D6EF 1 Z A Q\itXi MATHEMATICAL ITALIC CAPITAL XI &1D6F0 u1D6F0 1 Z A Q\itOmicron MATHEMATICAL ITALIC CAPITAL OMICRON &1D6F1 u1D6F1 1 Z A Q\itPi MATHEMATICAL ITALIC CAPITAL PI &1D6F2 u1D6F2 1 Z A Q\itRho MATHEMATICAL ITALIC CAPITAL RHO &1D6F3 u1D6F3 1 Z A Q\itvarTheta MATHEMATICAL ITALIC CAPITAL THETA SYMBOL &1D6F4 u1D6F4 1 Z A Q\itSigma MATHEMATICAL ITALIC CAPITAL SIGMA &1D6F5 u1D6F5 1 Z A Q\itTau MATHEMATICAL ITALIC CAPITAL TAU &1D6F6 u1D6F6 1 Z A Q\itUpsilon MATHEMATICAL ITALIC CAPITAL UPSILON &1D6F7 u1D6F7 1 Z A Q\itPhi MATHEMATICAL ITALIC CAPITAL PHI &1D6F8 u1D6F8 1 Z A Q\itChi MATHEMATICAL ITALIC CAPITAL CHI &1D6F9 u1D6F9 1 Z A Q\itPsi MATHEMATICAL ITALIC CAPITAL PSI &1D6FA u1D6FA 1 Z A Q\itOmega MATHEMATICAL ITALIC CAPITAL OMEGA &1D6FB u1D6FB 1 Z N Q\itnabla MATHEMATICAL ITALIC NABLA &1D6FC u1D6FC 1 Z A Q\italpha MATHEMATICAL ITALIC SMALL ALPHA &1D6FD u1D6FD 1 Z A Q\itbeta MATHEMATICAL ITALIC SMALL BETA &1D6FE u1D6FE 1 Z A Q\itgamma MATHEMATICAL ITALIC SMALL GAMMA &1D6FF u1D6FF 1 Z A Q\itdelta MATHEMATICAL ITALIC SMALL DELTA &1D700 u1D700 1 Z A Q\itvarepsilon MATHEMATICAL ITALIC SMALL EPSILON &1D701 u1D701 1 Z A Q\itzeta MATHEMATICAL ITALIC SMALL ZETA &1D702 u1D702 1 Z A Q\iteta MATHEMATICAL ITALIC SMALL ETA &1D703 u1D703 1 Z A Q\ittheta MATHEMATICAL ITALIC SMALL THETA &1D704 u1D704 1 Z A Q\itiota MATHEMATICAL ITALIC SMALL IOTA &1D705 u1D705 1 Z A Q\itkappa MATHEMATICAL ITALIC SMALL KAPPA &1D706 u1D706 1 Z A Q\itlambda MATHEMATICAL ITALIC SMALL LAMBDA &1D707 u1D707 1 Z A Q\itmu MATHEMATICAL ITALIC SMALL MU &1D708 u1D708 1 Z A Q\itnu MATHEMATICAL ITALIC SMALL NU &1D709 u1D709 1 Z A Q\itxi MATHEMATICAL ITALIC SMALL XI &1D70A u1D70A 1 Z A Q\itomicron MATHEMATICAL ITALIC SMALL OMICRON &1D70B u1D70B 1 Z A Q\itpi MATHEMATICAL ITALIC SMALL PI &1D70C u1D70C 1 Z A Q\itrho MATHEMATICAL ITALIC SMALL RHO &1D70D u1D70D 1 Z A Q\itvarsigma MATHEMATICAL ITALIC SMALL FINAL SIGMA &1D70E u1D70E 1 Z A Q\itsigma MATHEMATICAL ITALIC SMALL SIGMA &1D70F u1D70F 1 Z A Q\ittau MATHEMATICAL ITALIC SMALL TAU &1D710 u1D710 1 Z A Q\itupsilon MATHEMATICAL ITALIC SMALL UPSILON &1D711 u1D711 1 Z A Q\itphi MATHEMATICAL ITALIC SMALL PHI &1D712 u1D712 1 Z A Q\itchi MATHEMATICAL ITALIC SMALL CHI &1D713 u1D713 1 Z A Q\itpsi MATHEMATICAL ITALIC SMALL PSI &1D714 u1D714 1 Z A Q\itomega MATHEMATICAL ITALIC SMALL OMEGA &1D715 u1D715 1 Z N Q\itpartial MATHEMATICAL ITALIC PARTIAL DIFFERENTIAL &1D716 u1D716 1 Z A Q\itepsilon MATHEMATICAL ITALIC EPSILON SYMBOL &1D717 u1D717 1 Z A Q\itvartheta MATHEMATICAL ITALIC THETA SYMBOL &1D718 u1D718 1 Z A Q\itvarkappa MATHEMATICAL ITALIC KAPPA SYMBOL &1D719 u1D719 1 Z A Q\itvarphi MATHEMATICAL ITALIC PHI SYMBOL &1D71A u1D71A 1 Z A Q\itvarrho MATHEMATICAL ITALIC RHO SYMBOL &1D71B u1D71B 1 Z A Q\itvarpi MATHEMATICAL ITALIC PI SYMBOL &1D71C u1D71C 1 Z A Q\bfitAlpha MATHEMATICAL BOLD ITALIC CAPITAL ALPHA &1D71D u1D71D 1 Z A Q\bfitBeta MATHEMATICAL BOLD ITALIC CAPITAL BETA &1D71E u1D71E 1 Z A Q\bfitGamma MATHEMATICAL BOLD ITALIC CAPITAL GAMMA &1D71F u1D71F 1 Z A Q\bfitDelta MATHEMATICAL BOLD ITALIC CAPITAL DELTA &1D720 u1D720 1 Z A Q\bfitEpsilon MATHEMATICAL BOLD ITALIC CAPITAL EPSILON &1D721 u1D721 1 Z A Q\bfitZeta MATHEMATICAL BOLD ITALIC CAPITAL ZETA &1D722 u1D722 1 Z A Q\bfitEta MATHEMATICAL BOLD ITALIC CAPITAL ETA &1D723 u1D723 1 Z A Q\bfitTheta MATHEMATICAL BOLD ITALIC CAPITAL THETA &1D724 u1D724 1 Z A Q\bfitIota MATHEMATICAL BOLD ITALIC CAPITAL IOTA &1D725 u1D725 1 Z A Q\bfitKappa MATHEMATICAL BOLD ITALIC CAPITAL KAPPA &1D726 u1D726 1 Z A Q\bfitLambda MATHEMATICAL BOLD ITALIC CAPITAL LAMBDA &1D727 u1D727 1 Z A Q\bfitMu MATHEMATICAL BOLD ITALIC CAPITAL MU &1D728 u1D728 1 Z A Q\bfitNu MATHEMATICAL BOLD ITALIC CAPITAL NU &1D729 u1D729 1 Z A Q\bfitXi MATHEMATICAL BOLD ITALIC CAPITAL XI &1D72A u1D72A 1 Z A Q\bfitOmicron MATHEMATICAL BOLD ITALIC CAPITAL OMICRON &1D72B u1D72B 1 Z A Q\bfitPi MATHEMATICAL BOLD ITALIC CAPITAL PI &1D72C u1D72C 1 Z A Q\bfitRho MATHEMATICAL BOLD ITALIC CAPITAL RHO &1D72D u1D72D 1 Z A Q\bfitvarTheta MATHEMATICAL BOLD ITALIC CAPITAL THETA SYMBOL &1D72E u1D72E 1 Z A Q\bfitSigma MATHEMATICAL BOLD ITALIC CAPITAL SIGMA &1D72F u1D72F 1 Z A Q\bfitTau MATHEMATICAL BOLD ITALIC CAPITAL TAU &1D730 u1D730 1 Z A Q\bfitUpsilon MATHEMATICAL BOLD ITALIC CAPITAL UPSILON &1D731 u1D731 1 Z A Q\bfitPhi MATHEMATICAL BOLD ITALIC CAPITAL PHI &1D732 u1D732 1 Z A Q\bfitChi MATHEMATICAL BOLD ITALIC CAPITAL CHI &1D733 u1D733 1 Z A Q\bfitPsi MATHEMATICAL BOLD ITALIC CAPITAL PSI &1D734 u1D734 1 Z A Q\bfitOmega MATHEMATICAL BOLD ITALIC CAPITAL OMEGA &1D735 u1D735 1 Z N Q\bfitnabla MATHEMATICAL BOLD ITALIC NABLA &1D736 u1D736 1 Z A Q\bfitalpha MATHEMATICAL BOLD ITALIC SMALL ALPHA &1D737 u1D737 1 Z A Q\bfitbeta MATHEMATICAL BOLD ITALIC SMALL BETA &1D738 u1D738 1 Z A Q\bfitgamma MATHEMATICAL BOLD ITALIC SMALL GAMMA &1D739 u1D739 1 Z A Q\bfitdelta MATHEMATICAL BOLD ITALIC SMALL DELTA &1D73A u1D73A 1 Z A Q\bfitvarepsilon MATHEMATICAL BOLD ITALIC SMALL EPSILON &1D73B u1D73B 1 Z A Q\bfitzeta MATHEMATICAL BOLD ITALIC SMALL ZETA &1D73C u1D73C 1 Z A Q\bfiteta MATHEMATICAL BOLD ITALIC SMALL ETA &1D73D u1D73D 1 Z A Q\bfittheta MATHEMATICAL BOLD ITALIC SMALL THETA &1D73E u1D73E 1 Z A Q\bfitiota MATHEMATICAL BOLD ITALIC SMALL IOTA &1D73F u1D73F 1 Z A Q\bfitkappa MATHEMATICAL BOLD ITALIC SMALL KAPPA &1D740 u1D740 1 Z A Q\bfitlambda MATHEMATICAL BOLD ITALIC SMALL LAMBDA &1D741 u1D741 1 Z A Q\bfitmu MATHEMATICAL BOLD ITALIC SMALL MU &1D742 u1D742 1 Z A Q\bfitnu MATHEMATICAL BOLD ITALIC SMALL NU &1D743 u1D743 1 Z A Q\bfitxi MATHEMATICAL BOLD ITALIC SMALL XI &1D744 u1D744 1 Z A Q\bfitomicron MATHEMATICAL BOLD ITALIC SMALL OMICRON &1D745 u1D745 1 Z A Q\bfitpi MATHEMATICAL BOLD ITALIC SMALL PI &1D746 u1D746 1 Z A Q\bfitrho MATHEMATICAL BOLD ITALIC SMALL RHO &1D747 u1D747 1 Z A Q\bfitvarsigma MATHEMATICAL BOLD ITALIC SMALL FINAL SIGMA &1D748 u1D748 1 Z A Q\bfitsigma MATHEMATICAL BOLD ITALIC SMALL SIGMA &1D749 u1D749 1 Z A Q\bfittau MATHEMATICAL BOLD ITALIC SMALL TAU &1D74A u1D74A 1 Z A Q\bfitupsilon MATHEMATICAL BOLD ITALIC SMALL UPSILON &1D74B u1D74B 1 Z A Q\bfitphi MATHEMATICAL BOLD ITALIC SMALL PHI &1D74C u1D74C 1 Z A Q\bfitchi MATHEMATICAL BOLD ITALIC SMALL CHI &1D74D u1D74D 1 Z A Q\bfitpsi MATHEMATICAL BOLD ITALIC SMALL PSI &1D74E u1D74E 1 Z A Q\bfitomega MATHEMATICAL BOLD ITALIC SMALL OMEGA &1D74F u1D74F 1 Z N Q\bfitpartial MATHEMATICAL BOLD ITALIC PARTIAL DIFFERENTIAL &1D750 u1D750 1 Z A Q\bfitepsilon MATHEMATICAL BOLD ITALIC EPSILON SYMBOL &1D751 u1D751 1 Z A Q\bfitvartheta MATHEMATICAL BOLD ITALIC THETA SYMBOL &1D752 u1D752 1 Z A Q\bfitvarkappa MATHEMATICAL BOLD ITALIC KAPPA SYMBOL &1D753 u1D753 1 Z A Q\bfitvarphi MATHEMATICAL BOLD ITALIC PHI SYMBOL &1D754 u1D754 1 Z A Q\bfitvarrho MATHEMATICAL BOLD ITALIC RHO SYMBOL &1D755 u1D755 1 Z A Q\bfitvarpi MATHEMATICAL BOLD ITALIC PI SYMBOL &1D756 u1D756 1 Z A Q\bfsansAlpha MATHEMATICAL SANS-SERIF BOLD CAPITAL ALPHA &1D757 u1D757 1 Z A Q\bfsansBeta MATHEMATICAL SANS-SERIF BOLD CAPITAL BETA &1D758 u1D758 1 Z A Q\bfsansGamma MATHEMATICAL SANS-SERIF BOLD CAPITAL GAMMA &1D759 u1D759 1 Z A Q\bfsansDelta MATHEMATICAL SANS-SERIF BOLD CAPITAL DELTA &1D75A u1D75A 1 Z A Q\bfsansEpsilon MATHEMATICAL SANS-SERIF BOLD CAPITAL EPSILON &1D75B u1D75B 1 Z A Q\bfsansZeta MATHEMATICAL SANS-SERIF BOLD CAPITAL ZETA &1D75C u1D75C 1 Z A Q\bfsansEta MATHEMATICAL SANS-SERIF BOLD CAPITAL ETA &1D75D u1D75D 1 Z A Q\bfsansTheta MATHEMATICAL SANS-SERIF BOLD CAPITAL THETA &1D75E u1D75E 1 Z A Q\bfsansIota MATHEMATICAL SANS-SERIF BOLD CAPITAL IOTA &1D75F u1D75F 1 Z A Q\bfsansKappa MATHEMATICAL SANS-SERIF BOLD CAPITAL KAPPA &1D760 u1D760 1 Z A Q\bfsansLambda MATHEMATICAL SANS-SERIF BOLD CAPITAL LAMBDA &1D761 u1D761 1 Z A Q\bfsansMu MATHEMATICAL SANS-SERIF BOLD CAPITAL MU &1D762 u1D762 1 Z A Q\bfsansNu MATHEMATICAL SANS-SERIF BOLD CAPITAL NU &1D763 u1D763 1 Z A Q\bfsansXi MATHEMATICAL SANS-SERIF BOLD CAPITAL XI &1D764 u1D764 1 Z A Q\bfsansOmicron MATHEMATICAL SANS-SERIF BOLD CAPITAL OMICRON &1D765 u1D765 1 Z A Q\bfsansPi MATHEMATICAL SANS-SERIF BOLD CAPITAL PI &1D766 u1D766 1 Z A Q\bfsansRho MATHEMATICAL SANS-SERIF BOLD CAPITAL RHO &1D767 u1D767 1 Z A Q\bfsansvarTheta MATHEMATICAL SANS-SERIF BOLD CAPITAL THETA SYMBOL &1D768 u1D768 1 Z A Q\bfsansSigma MATHEMATICAL SANS-SERIF BOLD CAPITAL SIGMA &1D769 u1D769 1 Z A Q\bfsansTau MATHEMATICAL SANS-SERIF BOLD CAPITAL TAU &1D76A u1D76A 1 Z A Q\bfsansUpsilon MATHEMATICAL SANS-SERIF BOLD CAPITAL UPSILON &1D76B u1D76B 1 Z A Q\bfsansPhi MATHEMATICAL SANS-SERIF BOLD CAPITAL PHI &1D76C u1D76C 1 Z A Q\bfsansChi MATHEMATICAL SANS-SERIF BOLD CAPITAL CHI &1D76D u1D76D 1 Z A Q\bfsansPsi MATHEMATICAL SANS-SERIF BOLD CAPITAL PSI &1D76E u1D76E 1 Z A Q\bfsansOmega MATHEMATICAL SANS-SERIF BOLD CAPITAL OMEGA &1D76F u1D76F 1 Z N Q\bfsansnabla MATHEMATICAL SANS-SERIF BOLD NABLA &1D770 u1D770 1 Z A Q\bfsansalpha MATHEMATICAL SANS-SERIF BOLD SMALL ALPHA &1D771 u1D771 1 Z A Q\bfsansbeta MATHEMATICAL SANS-SERIF BOLD SMALL BETA &1D772 u1D772 1 Z A Q\bfsansgamma MATHEMATICAL SANS-SERIF BOLD SMALL GAMMA &1D773 u1D773 1 Z A Q\bfsansdelta MATHEMATICAL SANS-SERIF BOLD SMALL DELTA &1D774 u1D774 1 Z A Q\bfsansvarepsilon MATHEMATICAL SANS-SERIF BOLD SMALL EPSILON &1D775 u1D775 1 Z A Q\bfsanszeta MATHEMATICAL SANS-SERIF BOLD SMALL ZETA &1D776 u1D776 1 Z A Q\bfsanseta MATHEMATICAL SANS-SERIF BOLD SMALL ETA &1D777 u1D777 1 Z A Q\bfsanstheta MATHEMATICAL SANS-SERIF BOLD SMALL THETA &1D778 u1D778 1 Z A Q\bfsansiota MATHEMATICAL SANS-SERIF BOLD SMALL IOTA &1D779 u1D779 1 Z A Q\bfsanskappa MATHEMATICAL SANS-SERIF BOLD SMALL KAPPA &1D77A u1D77A 1 Z A Q\bfsanslambda MATHEMATICAL SANS-SERIF BOLD SMALL LAMBDA &1D77B u1D77B 1 Z A Q\bfsansmu MATHEMATICAL SANS-SERIF BOLD SMALL MU &1D77C u1D77C 1 Z A Q\bfsansnu MATHEMATICAL SANS-SERIF BOLD SMALL NU &1D77D u1D77D 1 Z A Q\bfsansxi MATHEMATICAL SANS-SERIF BOLD SMALL XI &1D77E u1D77E 1 Z A Q\bfsansomicron MATHEMATICAL SANS-SERIF BOLD SMALL OMICRON &1D77F u1D77F 1 Z A Q\bfsanspi MATHEMATICAL SANS-SERIF BOLD SMALL PI &1D780 u1D780 1 Z A Q\bfsansrho MATHEMATICAL SANS-SERIF BOLD SMALL RHO &1D781 u1D781 1 Z A Q\bfsansvarsigma MATHEMATICAL SANS-SERIF BOLD SMALL FINAL SIGMA &1D782 u1D782 1 Z A Q\bfsanssigma MATHEMATICAL SANS-SERIF BOLD SMALL SIGMA &1D783 u1D783 1 Z A Q\bfsanstau MATHEMATICAL SANS-SERIF BOLD SMALL TAU &1D784 u1D784 1 Z A Q\bfsansupsilon MATHEMATICAL SANS-SERIF BOLD SMALL UPSILON &1D785 u1D785 1 Z A Q\bfsansphi MATHEMATICAL SANS-SERIF BOLD SMALL PHI &1D786 u1D786 1 Z A Q\bfsanschi MATHEMATICAL SANS-SERIF BOLD SMALL CHI &1D787 u1D787 1 Z A Q\bfsanspsi MATHEMATICAL SANS-SERIF BOLD SMALL PSI &1D788 u1D788 1 Z A Q\bfsansomega MATHEMATICAL SANS-SERIF BOLD SMALL OMEGA &1D789 u1D789 1 Z N Q\bfsanspartial MATHEMATICAL SANS-SERIF BOLD PARTIAL DIFFERENTIAL &1D78A u1D78A 1 Z A Q\bfsansepsilon MATHEMATICAL SANS-SERIF BOLD EPSILON SYMBOL &1D78B u1D78B 1 Z A Q\bfsansvartheta MATHEMATICAL SANS-SERIF BOLD THETA SYMBOL &1D78C u1D78C 1 Z A Q\bfsansvarkappa MATHEMATICAL SANS-SERIF BOLD KAPPA SYMBOL &1D78D u1D78D 1 Z A Q\bfsansvarphi MATHEMATICAL SANS-SERIF BOLD PHI SYMBOL &1D78E u1D78E 1 Z A Q\bfsansvarrho MATHEMATICAL SANS-SERIF BOLD RHO SYMBOL &1D78F u1D78F 1 Z A Q\bfsansvarpi MATHEMATICAL SANS-SERIF BOLD PI SYMBOL &1D790 u1D790 1 Z A Q\bfitsansAlpha MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL ALPHA &1D791 u1D791 1 Z A Q\bfitsansBeta MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL BETA &1D792 u1D792 1 Z A Q\bfitsansGamma MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL GAMMA &1D793 u1D793 1 Z A Q\bfitsansDelta MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL DELTA &1D794 u1D794 1 Z A Q\bfitsansEpsilon MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL EPSILON &1D795 u1D795 1 Z A Q\bfitsansZeta MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL ZETA &1D796 u1D796 1 Z A Q\bfitsansEta MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL ETA &1D797 u1D797 1 Z A Q\bfitsansTheta MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL THETA &1D798 u1D798 1 Z A Q\bfitsansIota MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL IOTA &1D799 u1D799 1 Z A Q\bfitsansKappa MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL KAPPA &1D79A u1D79A 1 Z A Q\bfitsansLambda MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL LAMBDA &1D79B u1D79B 1 Z A Q\bfitsansMu MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL MU &1D79C u1D79C 1 Z A Q\bfitsansNu MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL NU &1D79D u1D79D 1 Z A Q\bfitsansXi MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL XI &1D79E u1D79E 1 Z A Q\bfitsansOmicron MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL OMICRON &1D79F u1D79F 1 Z A Q\bfitsansPi MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL PI &1D7A0 u1D7A0 1 Z A Q\bfitsansRho MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL RHO &1D7A1 u1D7A1 1 Z A Q\bfitsansvarTheta MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL THETA SYMBOL &1D7A2 u1D7A2 1 Z A Q\bfitsansSigma MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL SIGMA &1D7A3 u1D7A3 1 Z A Q\bfitsansTau MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL TAU &1D7A4 u1D7A4 1 Z A Q\bfitsansUpsilon MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL UPSILON &1D7A5 u1D7A5 1 Z A Q\bfitsansPhi MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL PHI &1D7A6 u1D7A6 1 Z A Q\bfitsansChi MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL CHI &1D7A7 u1D7A7 1 Z A Q\bfitsansPsi MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL PSI &1D7A8 u1D7A8 1 Z A Q\bfitsansOmega MATHEMATICAL SANS-SERIF BOLD ITALIC CAPITAL OMEGA &1D7A9 u1D7A9 1 Z N Q\bfitsansnabla MATHEMATICAL SANS-SERIF BOLD ITALIC NABLA &1D7AA u1D7AA 1 Z A Q\bfitsansalpha MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL ALPHA &1D7AB u1D7AB 1 Z A Q\bfitsansbeta MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL BETA &1D7AC u1D7AC 1 Z A Q\bfitsansgamma MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL GAMMA &1D7AD u1D7AD 1 Z A Q\bfitsansdelta MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL DELTA &1D7AE u1D7AE 1 Z A Q\bfitsansvarepsilon MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL EPSILON &1D7AF u1D7AF 1 Z A Q\bfitsanszeta MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL ZETA &1D7B0 u1D7B0 1 Z A Q\bfitsanseta MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL ETA &1D7B1 u1D7B1 1 Z A Q\bfitsanstheta MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL THETA &1D7B2 u1D7B2 1 Z A Q\bfitsansiota MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL IOTA &1D7B3 u1D7B3 1 Z A Q\bfitsanskappa MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL KAPPA &1D7B4 u1D7B4 1 Z A Q\bfitsanslambda MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL LAMBDA &1D7B5 u1D7B5 1 Z A Q\bfitsansmu MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL MU &1D7B6 u1D7B6 1 Z A Q\bfitsansnu MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL NU &1D7B7 u1D7B7 1 Z A Q\bfitsansxi MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL XI &1D7B8 u1D7B8 1 Z A Q\bfitsansomicron MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL OMICRON &1D7B9 u1D7B9 1 Z A Q\bfitsanspi MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL PI &1D7BA u1D7BA 1 Z A Q\bfitsansrho MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL RHO &1D7BB u1D7BB 1 Z A Q\bfitsansvarsigma MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL FINAL SIGMA &1D7BC u1D7BC 1 Z A Q\bfitsanssigma MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL SIGMA &1D7BD u1D7BD 1 Z A Q\bfitsanstau MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL TAU &1D7BE u1D7BE 1 Z A Q\bfitsansupsilon MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL UPSILON &1D7BF u1D7BF 1 Z A Q\bfitsansphi MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL PHI &1D7C0 u1D7C0 1 Z A Q\bfitsanschi MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL CHI &1D7C1 u1D7C1 1 Z A Q\bfitsanspsi MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL PSI &1D7C2 u1D7C2 1 Z A Q\bfitsansomega MATHEMATICAL SANS-SERIF BOLD ITALIC SMALL OMEGA &1D7C3 u1D7C3 1 Z N Q\bfitsanspartial MATHEMATICAL SANS-SERIF BOLD ITALIC PARTIAL DIFFERENTIAL &1D7C4 u1D7C4 1 Z A Q\bfitsansepsilon MATHEMATICAL SANS-SERIF BOLD ITALIC EPSILON SYMBOL &1D7C5 u1D7C5 1 Z A Q\bfitsansvartheta MATHEMATICAL SANS-SERIF BOLD ITALIC THETA SYMBOL &1D7C6 u1D7C6 1 Z A Q\bfitsansvarkappa MATHEMATICAL SANS-SERIF BOLD ITALIC KAPPA SYMBOL &1D7C7 u1D7C7 1 Z A Q\bfitsansvarphi MATHEMATICAL SANS-SERIF BOLD ITALIC PHI SYMBOL &1D7C8 u1D7C8 1 Z A Q\bfitsansvarrho MATHEMATICAL SANS-SERIF BOLD ITALIC RHO SYMBOL &1D7C9 u1D7C9 1 Z A Q\bfitsansvarpi MATHEMATICAL SANS-SERIF BOLD ITALIC PI SYMBOL W1D7CA u1D7CA 1 Z A Q\bfDigamma MATHEMATICAL BOLD CAPITAL DIGAMMA W1D7CB u1D7CB 1 Z A Q\bfdigamma MATHEMATICAL BOLD SMALL DIGAMMA %1D7CC u1D7CC 0 %1D7CD u1D7CD 0 &1D7CE u1D7CE 1 N N Q\bfzero MATHEMATICAL BOLD DIGIT 0 &1D7CF u1D7CF 1 N N Q\bfone MATHEMATICAL BOLD DIGIT 1 &1D7D0 u1D7D0 1 N N Q\bftwo MATHEMATICAL BOLD DIGIT 2 &1D7D1 u1D7D1 1 N N Q\bfthree MATHEMATICAL BOLD DIGIT 3 &1D7D2 u1D7D2 1 N N Q\bffour MATHEMATICAL BOLD DIGIT 4 &1D7D3 u1D7D3 1 N N Q\bffive MATHEMATICAL BOLD DIGIT 5 &1D7D4 u1D7D4 1 N N Q\bfsix MATHEMATICAL BOLD DIGIT 6 &1D7D5 u1D7D5 1 N N Q\bfseven MATHEMATICAL BOLD DIGIT 7 &1D7D6 u1D7D6 1 N N Q\bfeight MATHEMATICAL BOLD DIGIT 8 &1D7D7 u1D7D7 1 N N Q\bfnine MATHEMATICAL BOLD DIGIT 9 &1D7D8 E804 u1D7D8 6X20 1 N N opf0 A\Bbbzero MATHEMATICAL DOUBLE-STRUCK DIGIT 0 +1D7D8 E804 u1D7D8 6X20 1DN N opf0 A\bbzero MATHEMATICAL DOUBLE-STRUCK DIGIT 0 &1D7D9 E803 u1D7D9 6X21 1DN N opf1 A\Bbbone \REALONE \bbbone MATHEMATICAL DOUBLE-STRUCK DIGIT 1 +1D7D9 E803 u1D7D9 6X21 0DN N opf1 A\bbone \REALONE \bbbone MATHEMATICAL DOUBLE-STRUCK DIGIT 1 &1D7DA u1D7DA 1 N N Q\Bbbtwo MATHEMATICAL DOUBLE-STRUCK DIGIT 2 &1D7DB u1D7DB 1 N N Q\Bbbthree MATHEMATICAL DOUBLE-STRUCK DIGIT 3 &1D7DC u1D7DC 1 N N Q\Bbbfour MATHEMATICAL DOUBLE-STRUCK DIGIT 4 &1D7DD u1D7DD 1 N N Q\Bbbfive MATHEMATICAL DOUBLE-STRUCK DIGIT 5 &1D7DE u1D7DE 1 N N Q\Bbbsix MATHEMATICAL DOUBLE-STRUCK DIGIT 6 &1D7DF u1D7DF 1 N N Q\Bbbseven MATHEMATICAL DOUBLE-STRUCK DIGIT 7 &1D7E0 u1D7E0 1 N N Q\Bbbeight MATHEMATICAL DOUBLE-STRUCK DIGIT 8 &1D7E1 u1D7E1 1 N N Q\Bbbnine MATHEMATICAL DOUBLE-STRUCK DIGIT 9 &1D7E2 u1D7E2 1 N N Q\sanszero MATHEMATICAL SANS-SERIF DIGIT 0 &1D7E3 u1D7E3 1 N N Q\sansone MATHEMATICAL SANS-SERIF DIGIT 1 &1D7E4 u1D7E4 1 N N Q\sanstwo MATHEMATICAL SANS-SERIF DIGIT 2 &1D7E5 u1D7E5 1 N N Q\sansthree MATHEMATICAL SANS-SERIF DIGIT 3 &1D7E6 u1D7E6 1 N N Q\sansfour MATHEMATICAL SANS-SERIF DIGIT 4 &1D7E7 u1D7E7 1 N N Q\sansfive MATHEMATICAL SANS-SERIF DIGIT 5 &1D7E8 u1D7E8 1 N N Q\sanssix MATHEMATICAL SANS-SERIF DIGIT 6 &1D7E9 u1D7E9 1 N N Q\sansseven MATHEMATICAL SANS-SERIF DIGIT 7 &1D7EA u1D7EA 1 N N Q\sanseight MATHEMATICAL SANS-SERIF DIGIT 8 &1D7EB u1D7EB 1 N N Q\sansnine MATHEMATICAL SANS-SERIF DIGIT 9 &1D7EC u1D7EC 1 N N Q\bfsanszero MATHEMATICAL SANS-SERIF BOLD DIGIT 0 &1D7ED u1D7ED 1 N N Q\bfsansone MATHEMATICAL SANS-SERIF BOLD DIGIT 1 &1D7EE u1D7EE 1 N N Q\bfsanstwo MATHEMATICAL SANS-SERIF BOLD DIGIT 2 &1D7EF u1D7EF 1 N N Q\bfsansthree MATHEMATICAL SANS-SERIF BOLD DIGIT 3 &1D7F0 u1D7F0 1 N N Q\bfsansfour MATHEMATICAL SANS-SERIF BOLD DIGIT 4 &1D7F1 u1D7F1 1 N N Q\bfsansfive MATHEMATICAL SANS-SERIF BOLD DIGIT 5 &1D7F2 u1D7F2 1 N N Q\bfsanssix MATHEMATICAL SANS-SERIF BOLD DIGIT 6 &1D7F3 u1D7F3 1 N N Q\bfsansseven MATHEMATICAL SANS-SERIF BOLD DIGIT 7 &1D7F4 u1D7F4 1 N N Q\bfsanseight MATHEMATICAL SANS-SERIF BOLD DIGIT 8 &1D7F5 u1D7F5 1 N N Q\bfsansnine MATHEMATICAL SANS-SERIF BOLD DIGIT 9 &1D7F6 u1D7F6 1 N N Q\ttzero MATHEMATICAL MONOSPACE DIGIT 0 &1D7F7 u1D7F7 1 N N Q\ttone MATHEMATICAL MONOSPACE DIGIT 1 &1D7F8 u1D7F8 1 N N Q\tttwo MATHEMATICAL MONOSPACE DIGIT 2 &1D7F9 u1D7F9 1 N N Q\ttthree MATHEMATICAL MONOSPACE DIGIT 3 &1D7FA u1D7FA 1 N N Q\ttfour MATHEMATICAL MONOSPACE DIGIT 4 &1D7FB u1D7FB 1 N N Q\ttfive MATHEMATICAL MONOSPACE DIGIT 5 &1D7FC u1D7FC 1 N N Q\ttsix MATHEMATICAL MONOSPACE DIGIT 6 &1D7FD u1D7FD 1 N N Q\ttseven MATHEMATICAL MONOSPACE DIGIT 7 &1D7FE u1D7FE 1 N N Q\tteight MATHEMATICAL MONOSPACE DIGIT 8 &1D7FF u1D7FF 1 N N Q\ttnine MATHEMATICAL MONOSPACE DIGIT 9 & E200 27F8 uni27F8 225E 0DS R xlArr ISOAMSA P\Longleftarrow lArrr \Longleftarrow DoubleLongLeftArrow a046 long left double arrow & E201 27F5 uni27F5 225C 0DS R xlarr ISOAMSA P\longleftarrow \longleftarrow LongLeftArrow a040 long left arrow & E202 27FA uni27FA 2269 0DS R xhArr ISOAMSA P\Longleftrightarrow xhArr \Longleftrightarrow DoubleLongLeftRightArrow a051 long left and right double arr & E203 27F7 uni27F7 2267 0DS R xharr ISOAMSA P\longleftrightarrow harrr \longleftrightarrow LongLeftRightArrow a045 long left and right arr & E204 27F9 uni27F9 225F 0DS R xrArr ISOAMSA P\Longrightarrow rArrr \Longrightarrow DoubleLongRightArrow a048 long right double arr & E205 27F6 uni27F6 225D 0DS R xrarr ISOAMSA P\longrightarrow lngrarr \longrightarrow LongRightArrow a042 long right arrow & E206 290E uni290E D9B1 1X0F BX1A 0DS R lBarr ISOAMSA H\leftdbkarrow a144 left doubly broken arrow & E207 290F uni290F D9D2 1X10 BX1B 0DS R rBarr ISOAMSA A\dbkarow a143 right doubly broken arrow * E207 290F uni290F D9D2 0dS R rBarr ISOAMSA H\rightdbkarrow a143 right doubly broken arrow & E208 27FC uni27FC D9E8 0DS R xmap ISOAMSA P\longmapsto \longmapsto a210 long maps to, rightward & E209 2910 uni2910 D9D3 1X11 BX1C 0DS R RBarr ISOAMSA A\drbkarrow a147 twoheaded right broken arrow with tail & E20A 2926 uni2926 D9E0 1X23 BX32 0FS R swarhk ISOAMSA bba A\hkswarow a078 SW arrow-hooked * E20A 2926 uni2926 D9E0 0fS R swarhk ISOAMSA bba H\hkswarrow a078 SW arrow-hooked & E20B 2925 uni2925 D9DB 1X22 BX31 0FS R searhk ISOAMSA bbb A\hksearow a077 SE arrow-hooked * E20B 2925 uni2925 D9DB 0fS R searhk ISOAMSA bbb H\hksearrow a077 SE arrow-hooked & E20C 2923 uni2923 D9C5 1X20 BX2F 0FS R nwarhk ISOAMSA bbc H\hknwarrow a075 NW arrow-hooked & E20D 2924 uni2924 D9BD 1X21 BX30 0FS R nearhk ISOAMSA bbd H\hknearrow a076 NE arrow-hooked & E20E 2928 uni2928 D9BF 1X25 BX34 0FS R nesear ISOAMSA bb2 A\toea a087 NE & SE arrows & E20F 2929 uni2929 D9DD 1X26 BX35 0FS R seswar ISOAMSA bb3 A\tosa a088 SE & SW arrows & E210 292A uni292A D9E2 1X27 BX36 0FS R swnwar ISOAMSA bb4 A\towa a089 SW & NW arrows & E211 2927 uni2927 D9C7 1X24 BX33 0FS R nwnear ISOAMSA bb5 A\tona a090 NW & NE arrows & E212 2905 uni2905 D9BC 1X06 BX11 0FS R Map ISOAMSA bax H\twoheadmapsto a149 twoheaded mapsto & E214 297C uni297C D9B4 1X80 BX89 0FS R lfisht ISOAMSA bey H\leftfishtail nulst a067 left fish tail & E215 297D uni297D D9D6 1X81 BX8A 0FS R rfisht ISOAMSA bdy H\rightfishtail a068 right fish tail & E216 21F5 uni21F5 EB2F 1X00 BX00 0FS R duarr ISOAMSA bcn H\downuparrows DownArrowUpArrow a029 0xEB12 down arrow, up arrow & E217 296F uni296F D9A6 1X6B BX7C 0FS R duhar ISOAMSA bc1 H\downupharpoonsleftright ReverseUpEquilibrium h034 0xEB33 down harpoon, up harpoon & E218 296E uni296E D9E5 1X6A BX7B 0FS R udhar ISOAMSA bc2 H\updownharpoonsleftright UpEquilibrium h035 0xEB32 up harpoon, down harpoon & E219 2937 uni2937 D9D4 1X34 BX43 0FS R rdca ISOAMSA bcy H\rightdowncurvedarrow a128 right down curved arrow & E21A 2936 uni2936 F0BE 1X33 BX42 0FS R ldca ISOAMSA bcz H\leftdowncurvedarrow a127 left down curved arrow / E21B uni219D0338 D9C1 1X32 1DS R nrarrw ISOAMSA H\nrightwavyarrow a167 not right arrow-wavy & E21C 2933 uni2933 D9CB 1X30 BX3F 0FS R rarrc ISOAMSA ba1 H\rightcurvedarrow a174 5 56 right arrow-curved / E21D uni29330338 D9C0 1X31 1FS R nrarrc ISOAMSA bb1 H\nrightcurvedarrow a175 not right arrow-curved & E21E 2945 uni2945 D9CD 1X40 BX51 0DS R rarrpl ISOAMSA H\rightarrowplus a099 right arrow, plus & E21F 2946 uni2946 D9AC 1X41 BX52 0DS R larrpl ISOAMSA H\leftarrowplus a100 left arrow, plus & E220 291F uni291F D9AA 1X1C BX2B 0DS R larrbfs ISOAMSA H\diamondleftarrowbar a101 left arrow-bar, filled square & E221 2920 uni2920 D9CA 1X1D BX2C 0DS R rarrbfs ISOAMSA H\barrightarrowdiamond a102 right arrow-bar, filled square & E222 291D uni291D D9AB 1X1A BX29 0DS R larrfs ISOAMSA H\diamondleftarrow a103 left arrow, filled square & E223 291E uni291E D9CC 1X1B BX2A 0DS R rarrfs ISOAMSA H\rightarrowdiamond a104 right arrow, filled square & E224 2964 uni2964 D9D7 1X60 BX71 0DS R rHar ISOAMSA H\rightharpoonsupdown h008 right harpoon-up over right harpoon-down & E225 2962 uni2962 D9B5 1X5E BX6F 0DS R lHar ISOAMSA H\leftharpoonsupdown h009 left harpoon-up over left harpoon-down & E226 2963 uni2963 D9E7 1X5F BX70 0DS R uHar ISOAMSA H\upharpoonsleftright h036 up harpoon-left, up harpoon-right & E227 2965 uni2965 D9A5 1X61 BX72 0DS R dHar ISOAMSA H\downharpoonsleftright h037 down harpoon-left, down harpoon-right & E228 294B uni294B D9B3 1X47 BX58 0DS R ldrushar ISOAMSA H\leftrightharpoondownup h019 0xEB36 left-down-right-up harpoon & E229 294A uni294A D9BA 1X46 BX57 0DS R lurdshar ISOAMSA H\leftrightharpoonupdown h018 0xEB37 left-up-right-down harpoon & E22A 2968 uni2968 D9DA 1X64 BX75 0DS R ruluhar ISOAMSA H\rightleftharpoonsup h010 right harpoon-up over left harpoon-up & E22B 2966 uni2966 D9BB 1X62 BX73 0DS R luruhar ISOAMSA H\leftrightharpoonsup h011 left harpoon-up over right harpoon-up & E22C 2967 uni2967 D9B2 1X63 BX74 0DS R ldrdhar ISOAMSA H\leftrightharpoonsdown h012 left harpoon-down over right harpoon-down & E22D 2969 uni2969 D9D5 1X65 BX76 0DS R rdldhar ISOAMSA H\rightleftharpoonsdown h013 right harpoon-down over left harpoon-down & E22E 296A uni296A D9B6 1X66 BX77 0DS R lharul ISOAMSA H\leftharpoonupdash h014 left harpoon-up over long dash & E22F 296D uni296D D9B9 1X69 BX7A 0DS R lrhard ISOAMSA H\dashrightharpoondown h015 right harpoon-down below long dash & E230 296C uni296C D9D8 1X68 BX79 0DS R rharul ISOAMSA H\rightharpoonupdash h016 right harpoon-up over long dash & E231 296B uni296B D9B7 1X67 BX78 0DS R llhard ISOAMSA H\dashleftharpoondown h017 left harpoon-down below long dash # E232 2192 uni2192.short D9DF 0DS srarr ISOAMSA H\shortrightarrow ShortRightArrow a011 short right arrow # E233 2190 uni2190.short D9DE 0DS slarr ISOAMSA H\shortleftarrow ShortLeftArrow a013 short left arrow & E234 2972 uni2972 2236 1X71 BX7F 0DS R simrarr ISOAMSA H\similarrightarrow a105 similar, right arrow below & E235 2975 uni2975 D9C9 1X72 BX82 0DS R rarrap ISOAMSA H\rightarrowapprox a207 approximate, right arrow above & E236 2971 uni2971 D9A7 1X70 BX7E 0DS R erarr ISOAMSA H\equalrightarrow a206 equal, right arrow below & E237 2949 uni2949 D9E4 1X44 BX55 0DS R Uarrocir ISOAMSA H\twoheaduparrowcircle a216 up two-headed arrow above circle & E238 2911 uni2911 D9A3 1X12 BX1D 0DS R DDotrahd ISOAMSA H\rightdotarrow a145 right arrow with dotted stem & E239 2916 uni2916 D9CF 1X15 BX22 0DS R Rarrtl ISOAMSA H\twoheadrightarrowtail a214 xx33 right two-headed arrow with tail, bijective mapping & E23A 291A uni291A D9D0 1X17 BX26 0DS R ratail ISOAMSA H\righttail a196 right arrow-tail & E23B 291C uni291C D9D1 1X19 BX28 0DS R rAtail ISOAMSA H\rightdbltail a197 right double arrow-tail & E23C 2919 uni2919 D9AE 1X16 BX25 0DS R latail ISOAMSA H\lefttail a198 left arrow-tail & E23D 291B uni291B D9AF 1X18 BX27 0DS R lAtail ISOAMSA H\leftdbltail a199 left double arrow-tail & E23E 2938 uni2938 EBCF 1X35 BX44 0DS R cudarrl ISOAMSA Q\cwrightarcarrow a133 left, curved, down arrow & E23F 2939 uni2939 EBCE 1X36 BX45 0DS R cudarrr ISOAMSA Q\acwleftarcarrow a134 right, curved, down arrow & E240 2948 uni2948 D9A8 1X43 BX54 0DS R harrcir ISOAMSA H\leftrightarrowcircle a109 left and right arrow with a circle & E241 21FE uni21FE D9D9 1X03 BX0A 0DS R roarr ISOAMSA S\rightarrowtriangle a114 right open arrow & E242 21FD uni21FD D9B8 1X02 BX09 0DS R loarr ISOAMSA S\leftarrowtriangle a115 left open arrow & E243 21FF uni21FF D9A9 1X04 BX0B 0DS R hoarr ISOAMSA S\leftrightarrowtriangle a116 horizontal open arrow # E244 21DD uni21DD D9E9 0DS R zigrarr ISOAMSA H\rightzigzagarrow a177 0x21DD right zig-zag arrow & E245 2904 uni2904 EBBA BX10 0DS R nvHarr ISOAMSA H\nvLeftrightarrow a223 not, vert, left and right double arrow & E246 2903 uni2903 D9C4 BX0F 0DS R nvrArr ISOAMSA H\nvRightarrow a222 not, vert, right double arrow & E247 2902 uni2902 D9C3 BX0E 0DS R nvlArr ISOAMSA H\nvLeftarrow a221 not, vert, left double arrow & E248 237C uni237C D97C 1X45 BX56 0DS angzarr ISOAMSA H\rangledownzigzagarrow a209 right angle with down zig-zag arrow & E249 293C uni293C D9A1 1X39 BX48 0DS R curarrm ISOAMSA H\curvearrowrightminus a131 0xEB17 2 7E curved right arrow with minus & E24A 293D uni293D D97E 1X3A BX49 0DS R cularrp ISOAMSA H\curvearrowleftplus a132 0xEB16 2 60 curved left arrow with plus & E24B 297E uni297E D9E6 1X82 BX8B 0DS R ufisht ISOAMSA H\upfishtail a070 0xE98E up fish tail & E24C 297F uni297F D9A4 1X83 BX8C 0DS R dfisht ISOAMSA H\downfishtail a069 down fish tail & E24D 2974 uni2974 D9CE 1X74 BX81 0DS R rarrsim ISOAMSA H\rightarrowsimilar a106 right arrow, similar & E24E 2973 uni2973 D9AD 1X73 BX80 0DS R larrsim ISOAMSA H\leftarrowsimilar a107 left arrow, similar & E24F 2AF0 uni2AF0 EBDC 4X42 DX85 0 S R midcir ISOAMSA E\midcir r232 0xE996 mid, circle below & E250 2AEF uni2AEF D97D 4X41 DX84 0 S R cirmid ISOAMSA E\cirmid r233 circle, mid below & E251 2A3F uni2A3F 21AD 2X60 CX5C 0FS B amalg ISOAMSB bjd P\amalg amalg \amalg amalgamation or coproduct & E254 2A00 uni2A00 22EC 2X20 CX18 0DL L xodot ISOAMSB P\bigodot bigodot \bigodot circle dot operator & E255 2A01 uni2A01 22EA 2X21 CX19 0DL L xoplus ISOAMSB P\bigoplus bigoplus \bigoplus circle plus operator & E256 2A02 uni2A02 22EB 2X22 CX1A 0DL L xotime ISOAMSB P\bigotimes bigotimes \bigotimes circle times operator & E257 2A06 uni2A06 22B6 2X26 CX1E 0FL L xsqcup ISOAMSB bjj P\bigsqcup bigsqcup \bigsqcup square union operator & E258 2A04 uni2A04 22AF 2X24 CX1C 0FL L xuplus ISOAMSB bjl P\biguplus biguplus \biguplus union operator with plus & E259 2A3C uni2A3C DBCC 2X58 CX56 0FS B iprod ISOAMSB bk6 A\intprod interior product & E25A 2A25 uni2A25 DBDD 2X43 CX3D 0FR B plusdu ISOAMSB bta A\plusdot plus sign, dot below & E25B 2A2A uni2A2A DBCF 2X48 CX42 0FR B minusdu ISOAMSB btm A\minusdot minus sign, dot below & E25C 2A2D uni2A2D DBCD 2X49 CX47 0FS B loplus ISOAMSB bst Q\opluslhrim Oplus plus sign in left half circle & E25D 2A2E uni2A2E DBE2 2X4A CX48 0FS B roplus ISOAMSB bsv Q\oplusrhrim plus sign in right half circle & E25E 2A34 uni2A34 DBCE 2X50 CX4E 0FS B lotimes ISOAMSB bsu Q\otimeslhrim Otimes multiply sign in left half circle & E25F 2A35 uni2A35 DBE3 2X51 CX4F 0FS B rotimes ISOAMSB bsw Q\otimesrhrim multiply sign in right half circle & E260 29B5 uni29B5 DBD5 5X05 DXAE 0FS ohbar ISOAMSB bs3 Q\circlehbar circle with horizontal bar & E261 2A40 uni2A40 DB30 2X61 CX5D 0 S B capdot ISOAMSB Q\capdot intersection, with dot & E262 2ABD uni2ABD EB33 3X70 DX29 0DR R subdot ISOAMSB H\subsetdot r184 0xE917 4 26 subset, with dot & E263 2ABE uni2ABE DBE9 3X71 DX2A 0DR R supdot ISOAMSB H\supsetdot r185 0xE916 4 2A superset, with dot & E264 2A33 uni2A33 DBE5 2X4F CX4D 0 S B smashp ISOAMSB Q\smashtimes 0xE992 3 5C smash product & E265 2A5F uni2A5F DBF1 2X80 CX80 0FS B wedbar ISOAMSB bts Q\wedgebar 5 30 wedge, bar below & E266 2A22 uni2A22 DBDC 2X40 CX3A 0 R B pluscir ISOAMSB Q\ringplus plus, small circle above & E267 2A72 uni2A72 DBDE 3X0E CXA7 0 R B pluse ISOAMSB Q\pluseqq 0xE901 5 31 plus, equals & E268 2A71 uni2A71 DBCA 3X0D CXA6 0 R eplus ISOAMSB Q\eqqplus 0xE902 5 32 equal, plus & E269 2A27 uni2A27 DBE0 2X45 CX3F 0 S B plustwo ISOAMSB Q\plussubtwo plus, two; Nim-addition & E26A 2A23 uni2A23 DBDB 2X41 CX3B 0 R B plusacir ISOAMSB Q\plushat plus, circumflex accent above & E26B 2A24 uni2A24 DBE4 2X42 CX3C 0 R B simplus ISOAMSB E\simplus 0xE9A6 5 34 plus, similar above & E26C 2A26 uni2A26 DBDF 2X44 CX3E 0 R B plussim ISOAMSB E\plussim 0xE9A7 5 33 plus, similar below & E26D 2A30 uni2A30 DBEB 2X4C CX4A 0DR B timesd ISOAMSB Q\dottimes timesdot times, dot & E26E 2A46 uni2A46 EBDA 2X66 CX63 0 S B cupcap ISOAMSB Q\cupovercap union above intersection & E26F 2A47 uni2A47 DBC1 2X67 CX64 0 S B capcup ISOAMSB Q\capovercup intersection above union & E270 2A48 uni2A48 DBC6 2X68 CX65 0 S B cupbrcap ISOAMSB Q\cupbarcap union, bar, intersection & E271 2A49 uni2A49 DBBF 2X69 CX66 0 S B capbrcup ISOAMSB Q\capbarcup intersection, bar, union & E272 2A4A uni2A4A DBC7 2X6A CX67 0 S B cupcup ISOAMSB Q\twocups union, union, joined & E273 2A4B uni2A4B DBC0 2X6B CX68 0 S B capcap ISOAMSB Q\twocaps intersection, intersection, joined / E274 uni222AFE00 DBC9 2X6C 1 S B cups ISOAMSB Q\varcup union, serifs / E275 uni2229FE00 DBC2 2X6D 1 S B caps ISOAMSB Q\varcap intersection, serifs / E276 uni2294FE00 DBE8 2X70 1 S B sqcups ISOAMSB Q\varsqcup square union, serifs / E277 uni2293FE00 DBE7 2X71 1 S B sqcaps ISOAMSB Q\varsqcap square intersection, serifs & E278 2A4C uni2A4C DBC4 2X6E CX6B 0 S B ccups ISOAMSB Q\closedvarcup closed union, serifs & E279 2A4D uni2A4D DBC3 2X6F CX6C 0 S B ccaps ISOAMSB Q\closedvarcap closed intersection, serifs & E27A 2A50 uni2A50 DBC5 2X72 CX71 0 S B ccupssm ISOAMSB Q\closedvarcupsmashprod closed union, serifs, smash product & E27B 2A39 uni2A39 DBEE 2X55 CX53 0 S B triplus ISOAMSB Q\triangleplus plus in triangle & E27C 2A3A uni2A3A DBED 2X56 CX54 0 S B triminus ISOAMSB Q\triangleminus minus in triangle & E27D 2A3B uni2A3B DBF0 2X57 CX55 0 S B tritime ISOAMSB Q\triangletimes multiply in triangle & E27E 29CD uni29CD DBEF 5X23 DXC7 0 S B trisb ISOAMSB Q\triangleserifs triangle, serifs at bottom & E27F 29C4 uni29C4 DBE6 5X16 DXBE 0DR solb ISOAMSB A\boxdiag boxrds solidus in square & E280 29C5 uni29C5 DBBD 5X17 DXBF 0DR bsolb ISOAMSB S\boxbslash boxlds reverse solidus in square & E281 2A44 uni2A44 DBBE 2X64 CX61 0 S B capand ISOAMSB Q\capwedge intersection, and & E282 2A45 uni2A45 DBC8 2X65 CX62 0 S B cupor ISOAMSB Q\cupvee union, or & E283 2A42 uni2A42 DBD1 2X62 CX5F 0 S B ncup ISOAMSB Q\barcup bar, union & E284 2A43 uni2A43 DBD0 2X63 CX60 0 S B ncap ISOAMSB Q\barcap bar, intersection & E285 2A38 uni2A38 DBD2 2X54 CX52 0FS B odiv ISOAMSB bsk M\odiv 0xE985 divide in circle & E286 29BC uni29BC DBD3 5X0E DXB6 0 S odsold ISOAMSB Q\odotslashdot dot, solidus, dot in circle & E287 29BF uni29BF DB3A 5X11 DXB9 0 S ofcir ISOAMSB Q\circledbullet filled circle in circle & E288 29C0 uni29C0 DBD6 5X12 DXBA 0 R olt ISOAMSB S\olessthan less-than in circle & E289 29C1 uni29C1 DBD4 5X13 DXBB 0 R ogt ISOAMSB S\ogreaterthan greater-than in circle & E28A 29B7 uni29B7 DBD7 5X09 DXB1 0DR B opar ISOAMSB Q\circledparallel cir2barv parallel in circle & E28B 29B9 uni29B9 DBD8 5X0B DXB3 0 S B operp ISOAMSB Q\operp perpendicular in circle & E28C 2A37 uni2A37 DBD9 2X53 CX51 0 S B Otimes ISOAMSB Q\Otimes multiply sign in double circle & E28D 2A36 uni2A36 DBDA 2X52 CX50 0 S B otimesas ISOAMSB Q\otimeshat multiply sign in circle, circumflex accent & E28E 2A31 uni2A31 DBEA 2X4D CX4B 0 R B timesbar ISOAMSB E\timesbar multiply sign, bar below E28F uni223E0332.reversed DBE1 5X42 DXD8 1DS race ISOAMSB H\race reverse most positive, line below E290 uni223E0333 DBBC 5X43 DXD9 1DS acE ISOAMSB H\acE most positive, two lines below & E291 2994 uni2994 D9F5 4X26 DX7C 0FF C rpargt ISOAMSC bi0 Q\rparengtr rpargt C: right paren, greater & E292 2993 uni2993 D9EF 4X25 DX7B 0FF O lparlt ISOAMSC bi7 Q\lparenless O: left parenthesis, less & E293 23B1 uni23B1 EEE8 4X2B DX7F 0DF rmoust ISOAMSC P\rmoustache \rmoustache right moustache & E294 23B0 uni23B0 EEE7 4X2C DX80 0DF lmoust ISOAMSC P\lmoustache \lmoustache left moustache & E295 2996 uni2996 D9F0 4X28 DX7E 0 F ltrPar ISOAMSC Q\Rparenless double right parenthesis, less & E296 2995 uni2995 D9EA 4X27 DX7D 0 F gtlPar ISOAMSC Q\Lparengtr double left parenthesis, greater & E297 2991 uni2991 D9EB 4X23 DX79 0 F O langd ISOAMSC Q\langledot left angle, dot & E298 2992 uni2992 D9F1 4X24 DX7A 0 F C rangd ISOAMSC Q\rangledot right angle, dot & E299 298B uni298B D9EC 4X1D DX73 0 F O lbrke ISOAMSC Q\lbrackubar left bracket, equal & E29A 298C uni298C D9F2 4X1E DX74 0 F C rbrke ISOAMSC Q\rbrackubar right bracket, equal & E29B 298D uni298D D9EE 4X1F DX75 0 F O lbrkslu ISOAMSC Q\lbrackultick left bracket, reverse solidus top corner & E29C 298E uni298E D9F3 4X20 DX76 0 F C rbrksld ISOAMSC Q\rbracklrtick right bracket, reverse solidus bottom corner & E29D 298F uni298F D9ED 4X21 DX77 0 F O lbrksld ISOAMSC Q\lbracklltick left bracket, solidus bottom corner & E29E 2990 uni2990 D9F4 4X22 DX78 0 F C rbrkslu ISOAMSC Q\rbrackurtick right bracket, solidus top corner & E29F 2A8A uni2A8A 21F7 3X25 CXC3 0FR R gnap ISOAMSN bng A\gnapprox gnap n056 0xEA33 greater, not approximate & E2A0 2A88 uni2A88 21E3 3X23 CXBF 0FR R gne ISOAMSN bnd A\gneq gne n170 0xEA35 greater, not equals / E2A1 2269 uni2269FE00 21F5 2DR R gvnE ISOAMSN A\gvertneqq gvertnE n021 gt, vert, not double equals & E2A2 2A89 uni2A89 21F6 3X24 CXC2 0FR R lnap ISOAMSN blg A\lnapprox lnap n060 0xEA32 less, not approximate & E2A3 2A87 uni2A87 21E2 3X22 CXBE 0FR R lne ISOAMSN bld A\lneq lne n169 0xEA34 less, not equals / E2A4 2268 uni2268FE00 21F4 2DR R lvnE ISOAMSN A\lvertneqq lvertnE n022 less, vert, not double equals / E2A5 2271 uni22670338 21F1 3X29 2FR R ngE ISOAMSN bnk A\ngeqq ngE NotGreaterFullEqual n023 0xEA07 1 DF not greater, double equals / E2A6 2271 uni2A7E0338 21E1 2FR R nges ISOAMSN bnb A\ngeqslant nges NotGreaterSlantEqual n058 1 C0 not greater-or-equal, slanted / E2A7 2270 uni2A7D0338 21E0 2FR R nles ISOAMSN blb A\nleqslant nles NotLessSlantEqual n062 1 F7 not less-or-equal, slanted / E2A8 2270 uni22660338 21F0 3X28 2FR R nlE ISOAMSN blk A\nleqq nlE NotGreaterFullEqual n024 0xEA06 1 DD not less, double equals # E2AA 2224 uni2224.short 21B5 0FS R nsmid ISOAMSN be6 A\nshortmid nsmid n080 0xEA2E negated short mid # E2AB 2226 uni2226.short 21B6 0FS R nspar ISOAMSN be7 A\nshortparallel nspar n119 0xEA2F not short parallel / E2AC 2284 uni228220D2 D973 1 S R vnsub ISOAMSN Q\nvsubset n184 4 B5 not subset [vertical negation] / E2AD 2288 uni228620D2 D974 1 S R vnsube Q\nvsubseteq n187 4 A3 /nsubseteq N: not (vert) subset, equals / E2AE 2288 uni2AC50338 21C3 3X82 1FS R nsubE ISOAMSN bpi A\nsubseteqq nsubE n175 0xEA0C 5 E0 not subset, double equals / E2AF 2285 uni228320D2 D975 1 S R vnsup ISOAMSN Q\nvsupset n185 4 D6 not superset [vertical negation] / E2B0 2289 uni2AC60338 21C4 3X83 1FS R nsupE ISOAMSN bri A\nsupseteqq nsupE n176 0xEA0B 5 A1 not superset, double equals / E2B1 2289 uni228720D2 D976 1 S R vnsupe Q\nvsupseteq n188 4 A2 /nsupseteq N: not (vert) superset, equals & E2B2 2AB9 uni2AB9 21B3 3X68 DX19 0FS R prnap ISOAMSN bls A\precnapprox prnap n064 0xEA3A precedes, not approx & E2B3 2AB5 uni2AB5 21D4 3X64 DX15 0FS R prnE ISOAMSN blt A\precneqq prnE n120 0xEA40 precedes, not double equals & E2B4 2ABA uni2ABA 21B4 3X69 DX1A 0FS R scnap ISOAMSN bns A\succnapprox scnap n066 0xEA3B succeeds, not approx & E2B5 2AB6 uni2AB6 21D5 3X65 DX16 0FS R scnE ISOAMSN bnt A\succneqq scnE n121 0xEA41 succeeds, not double equals & E2B6 2ACB uni2ACB 21C1 3X7E DX3B 0FS R subnE ISOAMSN bpg A\subsetneqq subnE subne n197 0xEA44 subset, not double equals & E2B7 2ACC uni2ACC 21C2 3X7F DX3C 0FS R supnE ISOAMSN brg A\supsetneqq supnE supne n198 0xEA45 superset, not double equals / E2B8 2ACB uni2ACBFE00 21C7 3X80 1FS R vsubnE ISOAMSN bph A\varsubsetneqq vsubnE n199 0xEA46 subset not double equals, variant / E2B9 228A uni228AFE00 EF55 3X7C 1FS R vsubne ISOAMSN bpe A\varsubsetneq vsubne n189 0xEA42 subset, not equals, variant / E2BA 228B uni228BFE00 EF54 3X7D 1FS R vsupne ISOAMSN bre A\varsupsetneq vsupne n190 0xEA43 superset, not equals, variant / E2BB 2ACC uni2ACCFE00 21C8 3X81 1FS R vsupnE ISOAMSN brh A\varsupsetneqq vsupnE n200 0xEA47 superset not double equals, variant / E2BC uni224B0338 D96A 3X06 1FS R napid ISOAMSN br6 Q\napproxident n008 not approximately identical to / E2C1 2270 uni226420D2 EE65 2 R R nvle ISOAMSN Q\nvleq n158 1 A3 not, vert, less-than-or-equal / E2C2 2271 uni226520D2 EE66 2 R R nvge ISOAMSN Q\nvgeq n159 1 A6 not, vert, greater-than-or-equal / E2C3 226E uni003C20D2 EF44 2 R R nvlt ISOAMSN Q\nvless n143 1 B2 not, vert, less-than / E2C4 226F uni003E20D2 EF45 2 R R nvgt ISOAMSN Q\nvgtr n145 1 B3 not, vert, greater-than / E2C5 uni2A6D0338 D96B 3X08 2 R R ncongdot ISOAMSN Q\ncongdot n075 not congruent, dot / E2C6 2249 uni224820D2 D977 2 R R nvap ISOAMSN Q\nvapprox n167 3 B5 not, vert, approximate / E2C7 uni2A700338 D969 3X0C 2 R R napE ISOAMSN Q\napproxeqq n076 0xEA62 3 AE not approximately equal or equal to & E2C8 2AF3 uni2AF3 D97A 4X44 DX88 0 S R parsim ISOAMSN E\parsim r155 parallel, similar / E2C9 F423 uni2AA120D2 D970 1 S R nLt ISOAMSN Q\nvGt n063 not, vert, double nested less than / E2CA F428 uni2AA220D2 D96D 1 S R nGt ISOAMSN Q\nvGt n059 not, vert, double nested greater than / E2CB uni226A0338 D971 3X45 2DR R nLtv ISOAMSN X\nll NotLessLess n137 0xEA38 not much less than / E2CC uni226B0338 D96E 3X46 2DR R nGtv ISOAMSN X\ngg NotGreaterGreater n138 0xEA39 not much greater than / E2CD uni22D80338 D96F 3X47 1 S R nLl ISOAMSN Q\nlll n047 not triple less than / E2CE uni22D90338 D96C 3X48 1 S R nGg ISOAMSN Q\nggg n046 not triple greater than / E2CF 22ED uni22B520D2 D979 5X25 1 S R nvrtrie ISOAMSN Q\nvtrianglerighteq n041 not, vert, right triangle, equals / E2D0 22EC uni22B420D2 D978 5X24 1 S R nvltrie ISOAMSN Q\nvtrianglelefteq n039 not, vert, left triangle, equals & E2D1 2AEE uni2AEE D97B 4X40 DX83 0 S R rnmid ISOAMSN Q\revnmid n003 reverse nmid M E2D2 EE49 uni2AEE.short 0FR R rnsmid Q\revnshortmid short mid negated by backslash * E2D4 D6A5 u1D6A5 00E5 6X11 4FA A jmath ISOAMSO cfi P\jmath jnodot jnodot \jmath ScriptDotlessJ small letter j, no dot # E2D5 210F uni210F.var EE2F 1FN A plank ISOAMSO buh A\hbar /hbar - Planck's over 2pi & E2D6 29A4 uni29A4 DBA1 4X56 DX9B 0 S ange ISOAMSO Q\angleubar angle, equal & E2D7 29A5 uni29A5 DBB7 4X57 DX9C 0 S range ISOAMSO Q\revangleubar reverse angle, equal / E2D8 uni222020D2 DBB5 4X58 1 S nang ISOAMSO Q\nvangle not, vert, angle & E2D9 29A8 uni29A8 DBA2 4X60 DXA0 0 N angmsdaa ISOAMSO Q\measanglerutone angle-measured, arrow, up, right & E2DA 29A9 uni29A9 DBA3 4X61 DXA1 0 N angmsdab ISOAMSO Q\measanglelutonw angle-measured, arrow, up, left & E2DB 29AA uni29AA DBA4 4X62 DXA2 0 N angmsdac ISOAMSO Q\measanglerdtose angle-measured, arrow, down, right & E2DC 29AB uni29AB DBA5 4X63 DXA3 0 N angmsdad ISOAMSO Q\measangleldtosw angle-measured, arrow, down, left & E2DD 29AC uni29AC DBA6 4X64 DXA4 0 N angmsdae ISOAMSO Q\measangleurtone angle-measured, arrow, right, up & E2DE 29AD uni29AD DBA7 4X65 DXA5 0 N angmsdaf ISOAMSO Q\measangleultonw angle-measured, arrow, left, up & E2DF 29AE uni29AE DBA8 4X66 DXA6 0 N angmsdag ISOAMSO Q\measangledrtose angle-measured, arrow, right, down & E2E0 29AF uni29AF DBA9 4X67 DXA7 0 N angmsdah ISOAMSO Q\measangledltosw angle-measured, arrow, left, down & E2E1 299D uni299D DBAB 4X51 DX94 0 N angrtvbd ISOAMSO Q\rightanglemdot right angle-measured, dot & E2E2 25F9 uni25F9 DBBA 7X33 DXEA 0 N urtri ISOAMSO Q\urtriangle upper right triangle & E2E4 25F8 uni25F8 DBB9 7X32 DXE9 0 N ultri ISOAMSO Q\ultriangle upper left triangle & E2E5 25FA uni25FA DBB3 7X34 DXEB 0 N lltri ISOAMSO Q\lltriangle lower left triangle & E2E6 29C9 uni29C9 DBAD 5X1B DXC3 0 N boxbox ISOAMSO Q\boxonbox two joined squares & E2E7 29B1 uni29B1 DBB2 5X01 DXAA 0 N N demptyv ISOAMSO Q\emptysetobar circle, slash, bar above & E2E8 29B2 uni29B2 DBAF 5X02 DXAB 0 N N cemptyv ISOAMSO Q\emptysetocirc circle, slash, small circle above & E2E9 29B3 uni29B3 DBB6 5X03 DXAC 0 N N raemptyv ISOAMSO Q\emptysetoarr circle, slash, right arrow above & E2EA 29B4 uni29B4 D843 5X04 DXAD 0 N N laemptyv ISOAMSO Q\emptysetoarrl circle, slash, left arrow above & E2EB 299A uni299A DBBB 4X4B DX91 0 N vzigzag ISOAMSO E\vzigzag vertical zig-zag line W E2EC 23E2 uni23E2 DBB8 7X41 DXF5 0 N N trpezium ISOAMSO Q\trapezium trapezium % E2ED 204F uni204F DBAE 7X11 AX1E 0 P bsemi ISOAMSO Q\textsemicolonreversed reverse semi-colon & E2EE 23B5 uni23B5 2F32 7X1B AX26 0 D bbrk ISOAMSO M\underbracket UnderBracket bottom square bracket & E2EF 23B4 uni23B4 2F31 7X1A AX25 0 D tbrk ISOAMSO M\overbracket OverBracket top square bracket & E2F0 23B6 uni23B6 DBAC 7X1C AX27 0 O bbrktbrk ISOAMSO E\bbrktbrk bottom above top square bracket & E2F1 29C2 uni29C2 DBB1 5X14 DXBC 0 N cirscir ISOAMSO E\cirscir circle, small circle to the right & E2F2 29C3 uni29C3 DBB0 5X15 DXBD 0 N cirE ISOAMSO E\cirE circle, two horizontal strokes to the right & E2F4 2A86 uni2A86 2164 3X21 CXBD 0FS R gap ISOAMSR bmg A\gtrapprox gap \goa r056 0xE933 greater, approximate & E2F5 2A8C uni2A8C 2175 3X2D CXD3 0FS R gEl ISOAMSR bmk A\gtreqqless gEl r057 0xE92D 5 76 greater, double equals, less & E2F6 2A7E uni2A7E 2173 3X19 CXB3 0FR R ges ISOAMSR bmb A\geqslant ges ges ges GreaterSlantEqual r058 1 3E greater-or-equal, slanted & E2F7 2AA2 uni2AA2 EF43 3X41 CXF5 0FS R Gt ISOAMSR bml H\Gt NestedGreaterGreater r059 0xE937 1 40 /gg R: double greater-than sign & E2F8 2A85 uni2A85 2163 3X20 CXBC 0FS R lap ISOAMSR bkg A\lessapprox lap \loa r060 0xE932 less, approximate & E2F9 2A8B uni2A8B 2174 3X2C CXD2 0FS R lEg ISOAMSR bkk A\lesseqqgtr lEg r061 0xE922 5 62 less, double equals, greater & E2FA 2A7D uni2A7D 2172 3X18 CXB2 0FR R les ISOAMSR bkb A\leqslant les les les LessSlantEqual r062 1 3C less-than-or-equal, slanted & E2FB 2AA1 uni2AA1 EF42 3X40 CXF4 0FS R Lt ISOAMSR bkl H\Lt NestedLessLess r063 0xE936 1 21 /ll R: double less-than sign; absolute continuity & E2FD 2AB7 uni2AB7 21A3 3X67 DX17 0FS R prap ISOAMSR bks A\precapprox prap r064 0xE93A precedes, approximate & E2FE 2AAF uni2AAF 2265 3X61 DX0F 0FS R pre ISOAMSR bkt P\preceq pre \preceq PrecedesEqual r065 precedes, equals & E2FF 2AB8 uni2AB8 21A4 3X66 DX18 0FS R scap ISOAMSR bms A\succapprox scap r066 0xE93B succeeds, approximate & E300 2AB0 uni2AB0 2266 3X60 DX10 0FS R sce ISOAMSR bmt P\succeq sce \succeq SucceedsEqual r067 succeeds, equals # E301 2223 uni2223.short 21A7 1FS R smid ISOAMSR bd6 A\shortmid smid r080 0xE92E /shortmid R: # E302 2225 uni2225.short 2176 1FS R spar ISOAMSR bd7 A\shortparallel spar r119 0xE92F short parallel # E303 2323 uni2323.small 21A5 2DR R ssmile ISOAMSR A\smallsmile ssmile r068 small up curve & E304 2AC5 uni2AC5 215C 3X78 DX33 0FR R subE ISOAMSR bog A\subseteqq subE r175 0xE90C 5 37 subset, double equals & E305 2AC6 uni2AC6 215D 3X79 DX34 0FR R supE ISOAMSR bqg A\supseteqq supE r176 0xE90B 5 38 superset, double equals # E306 2248 uni2248.bold 2278 0FR R thkap ISOAMSR bp4?A\thickapprox thicksim r069 thick approximate & E309 2A77 uni2A77 DBFD 3X12 CXAC 0FS R eDDot ISOAMSR bqv A\ddotseq r070 equal with four dots & E30A 2ADB uni2ADB D946 3X92 DX53 0DS R mlcp ISOAMSR A\mlcp r071 transversal intersection & E30B 2A9D uni2A9D D94E 3X3A CXEE 0FS R siml ISOAMSR bkh H\simless siml \sol r072 0xE928 5 75 similar, less & E30C 2A9E uni2A9E D94C 3X3B CXEF 0FR R simg ISOAMSR bmh H\simgtr simg \sog r073 0xE929 5 69 similar, greater & E30D 2AEB uni2AEB DB34 4X0A DX65 0FS R Vbar ISOAMSR bdr H\Vbar Vbar r242 double vert, bar (under) (independence, probability theory) & E30E 2A74 uni2A74 DBF6 3X10 CXA9 0DS R Colone ISOAMSR H\Coloneq r074 double colon, equals & E30F 2AE4 uni2AE4 EF39 4X02 DX5C 0DS R Dashv ISOAMSR A\Dashv DoubleLeftTee r243 0xE97F double dash, vertical & E310 2AE8 uni2AE8 D965 4X07 DX62 0DS R vBar ISOAMSR H\vBar r244 0xE97B vert, double bar (under) & E311 2AE7 uni2AE7 DBF3 4X06 DX61 0DS R Barv ISOAMSR H\Barv r250 vert, double bar (over) & E312 2AE9 uni2AE9 D966 4X08 DX63 0DS R vBarv ISOAMSR H\vBarv r251 0xE97E double bar, vert over and under & E313 2AE6 uni2AE6 D968 4X03 DX5E 0 S R Vdashl ISOAMSR Q\varVdash r252 double vertical, dash (long) & E314 2A6D uni2A6D DBF7 3X07 CX9E 0DR R congdot ISOAMSR H\congdot r075 congruent, dot & E315 2A70 uni2A70 DBF2 3X0B CXA2 0DR R apE ISOAMSR H\approxeqq r076 0xE962 3 3F approximately equal or equal to & E316 2AAE uni2AAE DBF5 3X58 DX0E 0DS R bumpE ISOAMSR H\bumpeqq r140 0xE96D bumpy, double equals & E317 2A73 uni2A73 D925 3X0F CXA8 0DR R Esim ISOAMSR H\eqqsim r077 equal, similar & E318 2A78 uni2A78 D924 3X13 CXAD 0DS R equivDD ISOAMSR H\equivDD r078 equivalent, four dots above & E319 2A66 uni2A66 D94B 3X00 CX87 0DR R sdote ISOAMSR Q\eqdot r079 0xE918 6 39 equal, dot below & E31A 2A29 uni2A29 D945 2X47 CX41 0 S B mcomma ISOAMSR Q\commaminus minus, comma above & E31B 2AD9 uni2AD9 DB2E 3X90 DX51 0DS R forkv ISOAMSR H\forkv r081 fork, variant & E31C 2ADA uni2ADA D964 3X91 DX52 0DS R topfork ISOAMSR H\topfork r082 fork with top & E31D 2A7F uni2A7F D939 3X1A CXB4 0DS R lesdot ISOAMSR H\lesdot r083 less-than-or-equal, slanted, dot inside & E31E 2A80 uni2A80 D927 3X1B CXB5 0DS R gesdot ISOAMSR H\gesdot r084 greater-than-or-equal, slanted, dot inside & E31F 2A81 uni2A81 D93A 3X1C CXB6 0DS R lesdoto ISOAMSR H\lesdoto r085 less-than-or-equal, slanted, dot above & E320 2A82 uni2A82 D928 3X1D CXB7 0DS R gesdoto ISOAMSR H\gesdoto r086 greater-than-or-equal, slanted, dot above & E321 2A83 uni2A83 D93B 3X1E CXB8 0DS R lesdotor ISOAMSR H\lesdotor r087 less-than-or-equal, slanted, dot above right & E322 2A84 uni2A84 D929 3X1F CXB9 0DS R gesdotol ISOAMSR H\gesdotol r088 greater-than-or-equal, slanted, dot above left & E323 2A97 uni2A97 D923 3X38 CXE4 0DS R elsdot ISOAMSR H\elsdot r089 equal-or-less, slanted, dot inside & E324 2A98 uni2A98 D921 3X39 CXE5 0DS R egsdot ISOAMSR H\egsdot r090 equal-or-greater, slanted, dot inside & E325 2A79 uni2A79 D942 3X14 CXAE 0DS R ltcir ISOAMSR H\ltcir r091 less than, circle inside & E326 2A7A uni2A7A D932 3X15 CXAF 0DS R gtcir ISOAMSR H\gtcir r092 greater than, circle inside & E329 2A7B uni2A7B D944 3X16 CXB0 0DS R ltquest ISOAMSR H\ltquest r093 less than, questionmark above & E32A 2A7C uni2A7C D933 3X17 CXB1 0DS R gtquest ISOAMSR H\gtquest r094 greater than, questionmark above / E32B 22DA uni22DAFE00 D93C 3X2A 1DS R lesg ISOAMSR H\lesg r095 less, equal, slanted, greater / E32C 22DB uni22DBFE00 D92A 3X2B 1DS R gesl ISOAMSR H\gesl r096 greater, equal, slanted, less & E32D 2A91 uni2A91 D93E 3X32 CXD8 0DS R lgE ISOAMSR H\lgE r097 0xE926 5 6D less, greater, equal & E32E 2A92 uni2A92 D92D 3X33 CXD9 0DS R glE ISOAMSR H\glE r098 0xE927 5 6E greater, less, equal & E32F 2AA4 uni2AA4 D92E 3X49 DX00 0DS R glj ISOAMSR H\glj r099 0xE96E greater, less, overlapping & E330 2AA5 uni2AA5 D92C 3X4A DX01 0DS R gla ISOAMSR H\gla r100 greater, less, apart & E331 2A93 uni2A93 D93D 3X34 CXDA 0DS R lesges ISOAMSR H\lesges r101 less, equal, slanted, greater, equal, slanted & E332 2A94 uni2A94 D92B 3X35 CXDB 0DS R gesles ISOAMSR H\gesles r102 greater, equal, slanted, less, equal, slanted & E333 2A8D uni2A8D D93F 3X2E CXD4 0DS R lsime ISOAMSR H\lsime \lse r103 less, similar, equal & E334 2A8E uni2A8E D92F 3X2F CXD5 0DS R gsime ISOAMSR H\gsime \gse r104 greater, similar, equal & E335 2A8F uni2A8F D940 3X30 CXD6 0DS R lsimg ISOAMSR H\lsimg r105 0xE9F0 less, similar, greater & E336 2A90 uni2A90 D930 3X31 CXD7 0DS R gsiml ISOAMSR H\gsiml r106 0xE9F1 greater, similar, less & E337 2A9F uni2A9F D94F 3X3C CXF2 0DS R simlE ISOAMSR H\simlE r107 similar, less, equal & E338 2AA0 uni2AA0 D94D 3X3D CXF3 0DS R simgE ISOAMSR H\simgE r108 similar, greater, equal & E339 2AAA uni2AAA D950 3X50 DX06 0DS R smt ISOAMSR H\smt smt r109 smaller than & E33A 2AAB uni2AAB D935 3X51 DX07 0DS R lat ISOAMSR H\lat lat r110 larger than & E33B 2AAC uni2AAC D951 3X52 DX08 0DS R smte ISOAMSR H\smte r111 smaller than or equal & E33C 2AAD uni2AAD D936 3X53 DX09 0DS R late ISOAMSR H\late r112 larger than or equal / E33D uni2AACFE00 D952 DX0A 1DS R smtes ISOAMSR H\smtes r113 smaller than or equal, slanted / E33E uni2AADFE00 D937 DX0B 1DS R lates ISOAMSR H\lates r114 larger than or equal, slanted & E33F 2979 uni2979 D956 1X78 BX86 0DS R subrarr ISOAMSR H\subrarr r177 subset, right arrow & E340 297B uni297B D95E 1X7A BX88 0DS R suplarr ISOAMSR H\suplarr r186 superset, left arrow & E341 2ABF uni2ABF D955 3X72 DX2B 0DS R subplus ISOAMSR H\subsetplus subplus r187 subset, plus & E342 2AC0 uni2AC0 D960 3X73 DX2C 0DS R supplus ISOAMSR H\supsetplus supplus r188 superset, plus & E343 2AC1 uni2AC1 D954 3X74 DX2D 0DS R submult ISOAMSR H\submult r189 subset, multiply & E344 2AC2 uni2AC2 D95F 3X75 DX2E 0DS R supmult ISOAMSR H\supmult r190 superset, multiply & E345 2AC7 uni2AC7 D957 3X7A DX35 0DS R subsim ISOAMSR H\subsim r191 0xE915 4 25 subset, similar & E346 2AC8 uni2AC8 D961 3X7B DX36 0DS R supsim ISOAMSR H\supsim r192 0xE914 4 5E superset, similar & E347 2AD3 uni2AD3 D959 3X8A DX4B 0DS R subsup ISOAMSR H\subsup r193 0xE973 4 5F subset above superset & E348 2AD4 uni2AD4 D962 3X8B DX4C 0DS R supsub ISOAMSR H\supsub r194 0xE972 4 2B superset above subset & E349 2AD5 uni2AD5 D958 3X8C DX4D 0DS R subsub ISOAMSR H\subsub r195 0xE971 4 28 subset above subset & E34A 2AD6 uni2AD6 D963 3X8D DX4E 0DS R supsup ISOAMSR H\supsup r196 0xE970 4 29 superset above superset & E34B 2AD7 uni2AD7 D95D 3X8E DX4F 0DS R suphsub ISOAMSR H\suphsub r197 superset, subset & E34C 2AD8 uni2AD8 D95A 3X8F DX50 0DS R supdsub ISOAMSR H\supdsub r198 superset, subset, dash joining them W E34D 27C8 uni27C8 DBF4 0DS R bsolhsub ISOAMSR H\bsolhsub r199 reverse solidus, subset W E34E 27C9 uni27C9 D95C 0DS R suphsol ISOAMSR H\suphsol r200 superset, solidus & E34F 2AC3 uni2AC3 D953 3X76 DX31 0DS R subedot ISOAMSR H\subedot r201 subset, equals, dot & E350 2AC4 uni2AC4 D95B 3X77 DX32 0DS R supedot ISOAMSR H\supedot r202 superset, equals, dot & E351 2ACF uni2ACF DBF8 3X86 DX47 0DS R csub ISOAMSR H\csub r203 subset, closed & E352 2AD0 uni2AD0 DBFA 3X87 DX48 0DS R csup ISOAMSR H\csup r204 superset, closed & E353 2AD1 uni2AD1 DBF9 3X88 DX49 0DS R csube ISOAMSR H\csube r205 subset, closed, equals & E354 2AD2 uni2AD2 DBFB 3X89 DX4A 0DS R csupe ISOAMSR H\csupe r206 superset, closed, equals & E355 2AA6 uni2AA6 D941 3X4B DX02 0DS R ltcc ISOAMSR H\ltcc r115 less than, closed by curve & E356 2AA7 uni2AA7 D931 3X4C DX03 0DS R gtcc ISOAMSR H\gtcc r116 greater than, closed by curve & E357 2AA8 uni2AA8 D938 3X4D DX04 0DS R lescc ISOAMSR H\lescc r117 less than, closed by curve, equal, slanted & E358 2AA9 uni2AA9 D926 3X4E DX05 0DS R gescc ISOAMSR H\gescc r118 greater than, closed by curve, equal, slanted & E359 29CE uni29CE D948 5X26 DXCA 0DS R rtriltri ISOAMSR H\rtriltri r158 right triangle above left triangle & E35A 2AB3 uni2AB3 D84A 3X62 DX13 0DS R prE ISOAMSR X\preceqq r120 0xE940 precedes, double equals & E35B 2AB4 uni2AB4 D94A 3X63 DX14 0DS R scE ISOAMSR X\succeqq r121 0xE941 succeeds, double equals & E35C 2ABB uni2ABB D849 3X6E DX25 0DS R Pr ISOAMSR Q\Prec r122 double precedes & E35D 2ABC uni2ABC D949 3X6F DX26 0DS R Sc ISOAMSR Q\Succ r123 double succeeds & E35E 2976 uni2976 D943 1X75 BX83 0DS R ltlarr ISOAMSR H\ltlarr r124 less than, left arrow & E35F 2978 uni2978 D934 1X77 BX85 0DS R gtrarr ISOAMSR H\gtrarr r125 greater than, right arrow + E361 2218 uni2218 EF67 0 S circle ISOPUB P\circ circle, white [small circle] # E363 22A5 uni22A5 22AA 0DO N bottom ISOTECH P\bot bottom r217 bottom % E364 D453 u1D453 EE54 6X10 0 N N fnof ISOTECH Q\itf fnof function of (italic small f) % E365 21D4 uni21D4 2268 1X05 0 S R iff ISOTECH P\iff iff \iff a056 if and only if & E36A 204E uni204E EB5D 7X00 AX1B 0DN lowast ISOTECH Q\textasterisklow lowast low asterisk / E36C 220C uni220B20D2 EBBB 2X13 1 S R notniva ISOTECH Q\nvni n221 4 D4 negated (vert) contains / E36D 220C uni220D0338 CX13 1 S R notnis Q\nsmallni 5 D3 negated contains & E36E 2A55 uni2A55 DB3D 2X77 CX76 0FS B andand ISOTECH bir Q\wedgeonwedge two logical and & E36F 2A56 uni2A56 DB6F 2X78 CX77 0FS B oror ISOTECH biq Q\veeonvee two logical or / E370 2209 uni220820D2 DB63 2X06 1 S R notinva ISOTECH Q\nvin n220 4 D2 negated (vert) set membership, variant & E371 2057 uni2057 DB74 7X01 AX1C 0FP N qprime ISOTECH bm8 Q\textqprime 5 2B quadruple prime & E372 29DC uni29DC DB53 5X45 DXDB 0FN N iinfin ISOTECH bkz E\iinfin infinity sign, incomplete & E373 299C uni299C DB7D 4X50 DX93 0FN vangrt ISOTECH bk5 Q\rightanglesqr n213 0xE982 right angle, variant [with square] & E374 2A53 uni2A53 DB3C 2X75 CX74 0FS B And ISOTECH bip Q\Wedge 0xE95D 3 C1 double logical and & E375 2A54 uni2A54 DB6C 2X76 CX75 0FS B Or ISOTECH bio Q\Vee 0xE95C 3 AA double logical or & E376 2A15 uni2A15 EB34 2X34 CX2D 0 L L pointint ISOTECH E\pointint integral around a point operator # E376 2A15 uni2A15.lgdisplay EB34 2X34 CX2D 0 L L pointint ISOTECH E\pointint INTEGRAL AROUND A POINT OPERATOR # E376 2A15 uni2A15.up EB34 2X34 CX2D 0 L L pointint ISOTECH E\pointint INTEGRAL AROUND A POINT OPERATOR # E376 2A15 uni2A15.uplgdisplay EB34 2X34 CX2D 0 L L pointint ISOTECH E\pointint INTEGRAL AROUND A POINT OPERATOR # E376 2A15 uni2A15.upsmall EB34 2X34 CX2D 0 L L pointint ISOTECH E\pointint INTEGRAL AROUND A POINT OPERATOR & E377 2A16 uni2A16 EB35 2X35 CX2E 0FL L quatint ISOTECH bj4 X\sqint intsq 3 61 quaternion integral operator # E377 2A16 uni2A16.lgdisplay EB35 2X35 CX2E 0FL L quatint ISOTECH bj4 X\sqint intsq 3 61 QUATERNION INTEGRAL OPERATOR # E377 2A16 uni2A16.up EB35 2X35 CX2E 0FL L quatint ISOTECH bj4 X\sqint intsq 3 61 QUATERNION INTEGRAL OPERATOR # E377 2A16 uni2A16.uplgdisplay EB35 2X35 CX2E 0FL L quatint ISOTECH bj4 X\sqint intsq 3 61 QUATERNION INTEGRAL OPERATOR # E377 2A16 uni2A16.upsmall EB35 2X35 CX2E 0FL L quatint ISOTECH bj4 X\sqint intsq 3 61 QUATERNION INTEGRAL OPERATOR & E378 2A0C uni2A0C DB72 2X2B CX24 0DL L qint ISOTECH A\iiiint quadruple integral operator & E37B 22F7 uni22F7 22BA 2X07 CX05 0 S R notinvb ISOTECH Q\isinobar n230 0xE912 5 35 set membership with overbar & E37C 22F6 uni22F6 DB64 2X08 CX04 0 S R notinvc ISOTECH Q\varisinobar n212 negated set membership, variant & E37D 22FE uni22FE DB65 2X11 CX12 0 S R notnivb ISOTECH Q\niobar 0xE90A 5 36 contains with overbar & E37E 22FD uni22FD DB66 2X12 CX11 0 S R notnivc ISOTECH Q\varniobar n231 contains, variant % E37F 01B5 uni01B5 EE39 1 N N imped ISOTECH Q\Zbar impedance W E380 23E4 uni23E4 EE49 0 N N strns ISOTECH E\strns straightness W E381 23E5 uni23E5 EE4A 0 N N fltns ISOTECH E\fltns flatness & E382 2AFD uni2AFD EF48 4X45 0DS R parsl ISOTECH S\sslash \dslash r152 0xE981 parallel, slanted & E383 2AF1 uni2AF1 DB7A 4X43 DX86 0 N N topcir ISOTECH E\topcir top, circle below & E384 29E3 uni29E3 DB50 5X4C DXE2 0 N R eparsl ISOTECH E\eparsl r153 3 5B parallel, slanted, equal; homothetically congruent to & E385 29E4 uni29E4 DB79 5X4D DXE3 0 N R smeparsl ISOTECH E\smeparsl r154 similar, parallel, slanted, equal & E386 29E5 uni29E5 DB51 5X4E DXE4 0DS R eqvparsl ISOTECH H\eqvparsl r160 0xE994 3 7B equivalent, equal; congruent and parallel / E387 uni226120E5 DB45 3X03 2 R R bnequiv ISOTECH Q\revnequiv n160 reverse not equivalent / E388 uni003D20E5 DB44 3X02 2 R R bne ISOTECH Q\revneq n151 reverse not equal / E389 uni2AFD20E5 DB67 4X46 1 S R nparsl ISOTECH Q\varnparallel n152 not parallel, slanted / E38A uni22500338 DB5B 3X01 2 R R nedot ISOTECH Q\ndoteq n012 not equal, dot & E38B 2A6A uni2A6A DB78 3X04 CX92 0DR R simdot ISOTECH Q\dotsim r161 0xE924 5 6A similar, dot above & E38C 2A6F uni2A6F DB41 3X0A CXA1 0 R R apacir ISOTECH Q\hatapprox r141 approximate, circumflex accent & E38D 2AF2 uni2AF2 DB5C DX87 0 S R nhpar ISOTECH E\nhpar n004 not, horizontal, parallel & E38E 29DE uni29DE DB6A 5X47 DXDD 0 N N nvinfin ISOTECH Q\nvinfty not, vert, infinity & E38F 29DD uni29DD DB54 5X46 DXDC 0 N N infintie ISOTECH Q\tieinfty tie, infinity E390 G0EE uni22020338 DB68 1 O N npart ISOTECH Q\npartial not partial differential & E391 2A5A uni2A5A DB40 2X7B CX7B 0 S B andv ISOTECH Q\wedgemidvert and with middle stem & E392 2A5B uni2A5B DB71 2X7C CX7C 0 S B orv ISOTECH Q\veemidvert or with middle stem & E393 2A5D uni2A5D DB6D 2X7D CX7E 0 S B ord ISOTECH Q\midbarvee or, horizontal dash & E394 2A5C uni2A5C DB3E 2X7E CX7D 0 S B andd ISOTECH Q\midbarwedge and, horizontal dash & E395 2A10 uni2A10 DB47 2X2F CX28 0FL L cirfnint ISOTECH bjz E\cirfnint circulation function # E395 2A10 uni2A10.lgdisplay DB47 2X2F CX28 0FL L cirfnint ISOTECH bjz E\cirfnint CIRCULATION FUNCTION # E395 2A10 uni2A10.up DB47 2X2F CX28 0FL L cirfnint ISOTECH bjz E\cirfnint CIRCULATION FUNCTION # E395 2A10 uni2A10.uplgdisplay DB47 2X2F CX28 0FL L cirfnint ISOTECH bjz E\cirfnint CIRCULATION FUNCTION # E395 2A10 uni2A10.upsmall DB47 2X2F CX28 0FL L cirfnint ISOTECH bjz E\cirfnint CIRCULATION FUNCTION & E396 2A0D uni2A0D DB52 2X2C CX25 0FL L fpartint ISOTECH bju A\intbar finite part integral & E397 2A12 uni2A12 DB76 2X31 CX2A 0 L L rppolint ISOTECH E\rppolint line integration, rectangular path around pole # E397 2A12 uni2A12.lgdisplay DB76 2X31 CX2A 0DL L rppolint ISOTECH E\rppolint LINE INTEGRATION WITH RECTANGULAR PATH AROUND POLE # E397 2A12 uni2A12.up DB76 2X31 CX2A 0DL L rppolint ISOTECH E\rppolint LINE INTEGRATION WITH RECTANGULAR PATH AROUND POLE # E397 2A12 uni2A12.uplgdisplay DB76 2X31 CX2A 0DL L rppolint ISOTECH E\rppolint LINE INTEGRATION WITH RECTANGULAR PATH AROUND POLE # E397 2A12 uni2A12.upsmall DB76 2X31 CX2A 0DL L rppolint ISOTECH E\rppolint LINE INTEGRATION WITH RECTANGULAR PATH AROUND POLE & E398 2A13 uni2A13 DB77 2X32 CX2B 0 L L scpolint ISOTECH E\scpolint line integration, semi-circular path around pole # E398 2A13 uni2A13.lgdisplay DB77 2X32 CX2B 0 L L scpolint ISOTECH E\scpolint LINE INTEGRATION WITH SEMICIRCULAR PATH AROUND POLE # E398 2A13 uni2A13.up DB77 2X32 CX2B 0 L L scpolint ISOTECH E\scpolint LINE INTEGRATION WITH SEMICIRCULAR PATH AROUND POLE # E398 2A13 uni2A13.uplgdisplay DB77 2X32 CX2B 0 L L scpolint ISOTECH E\scpolint LINE INTEGRATION WITH SEMICIRCULAR PATH AROUND POLE # E398 2A13 uni2A13.upsmall DB77 2X32 CX2B 0 L L scpolint ISOTECH E\scpolint LINE INTEGRATION WITH SEMICIRCULAR PATH AROUND POLE & E399 2A14 uni2A14 DB69 2X33 CX2C 0 L L npolint ISOTECH E\npolint line integration, not including the pole # E399 2A14 uni2A14.lgdisplay DB69 2X33 CX2C 0 L L npolint ISOTECH E\npolint LINE INTEGRATION NOT INCLUDING THE POLE # E399 2A14 uni2A14.up DB69 2X33 CX2C 0 L L npolint ISOTECH E\npolint LINE INTEGRATION NOT INCLUDING THE POLE # E399 2A14 uni2A14.uplgdisplay DB69 2X33 CX2C 0 L L npolint ISOTECH E\npolint LINE INTEGRATION NOT INCLUDING THE POLE # E399 2A14 uni2A14.upsmall DB69 2X33 CX2C 0 L L npolint ISOTECH E\npolint LINE INTEGRATION NOT INCLUDING THE POLE & E39A 2A17 uni2A17 DB55 2X36 CX2F 0 L L intlarhk ISOTECH E\intlarhk integral, left arrow with hook # E39A 2A17 uni2A17.lgdisplay DB55 2X36 CX2F 0 L L intlarhk ISOTECH E\intlarhk INTEGRAL WITH LEFTWARDS ARROW WITH HOOK # E39A 2A17 uni2A17.up DB55 2X36 CX2F 0 L L intlarhk ISOTECH E\intlarhk INTEGRAL WITH LEFTWARDS ARROW WITH HOOK # E39A 2A17 uni2A17.uplgdisplay DB55 2X36 CX2F 0 L L intlarhk ISOTECH E\intlarhk INTEGRAL WITH LEFTWARDS ARROW WITH HOOK # E39A 2A17 uni2A17.upsmall DB55 2X36 CX2F 0 L L intlarhk ISOTECH E\intlarhk INTEGRAL WITH LEFTWARDS ARROW WITH HOOK & E39B 2A11 uni2A11 DB42 2X30 CX29 0 L L awint ISOTECH E\awint anti clock-wise integration # E39B 2A11 uni2A11.up DB42 2X30 CX29 0 L L awint ISOTECH E\awint ANTICLOCKWISE INTEGRATION # E39B 2A11 uni2A11.lgdisplay DB42 2X30 CX29 0 L L awint ISOTECH E\awint ANTICLOCKWISE INTEGRATION # E39B 2A11 uni2A11.uplgdisplay DB42 2X30 CX29 0 L L awint ISOTECH E\awint ANTICLOCKWISE INTEGRATION # E39B 2A11 uni2A11.upsmall DB42 2X30 CX29 0 L L awint ISOTECH E\awint ANTICLOCKWISE INTEGRATION & E39C 22F5 uni22F5 DB56 2X03 CX03 0DS R isindot ISOTECH H\isindot r226 set membership, dot above / E39D uni22F50338 DB61 2X09 1 S R notindot ISOTECH Q\nisindot n226 negated set membership, dot above & E39E 22F9 uni22F9 DB57 2X0A CX0C 0DS R isinE ISOTECH H\isinE r227 set membership, two horizontal strokes / E39F uni22F90338 DB62 2X0B 1 S R notinE ISOTECH Q\nisinE n227 negated set membership, two horizontal strokes & E3A0 22F2 uni22F2 DB4A 2X00 CX00 0DS R disin ISOTECH H\disin r228 set membership, long horizontal stroke & E3A1 22FA uni22FA DB5E 2X0D CX0E 0DS R nisd ISOTECH H\nisd r229 contains, long horizontal stroke & E3A2 22F3 uni22F3 DB59 2X02 CX01 0 S R isinsv ISOTECH Q\varisins r222 large set membership, vertical bar on horizontal stroke & E3A3 22FB uni22FB DB7E 2X0F CX0F 0 S R xnis ISOTECH Q\varnis r223 large contains, vertical bar on horizontal stroke & E3A4 22F4 uni22F4 DB58 2X01 CX02 0DS R isins ISOTECH H\isins r224 set membership, vertical bar on horizontal stroke & E3A5 22FC uni22FC DB5D 2X0E CX10 0DS R nis ISOTECH H\nis r225 contains, vertical bar on horizontal stroke W E3A6 23E6 uni23E6 DB3B 0 N N acd ISOTECH Q\accurrent ac current W E3A7 23E7 uni23E7 DB4E 0 N N elinters ISOTECH E\elinters electrical intersection & E3A8 29BB uni29BB DB6B 5X0D DXB5 0 N olcross ISOTECH E\olcross circle, cross & E3A9 29F6 uni29F6 DB4B 7X14 AX21 0DN dsol ISOTECH H\dsol solidus, bar above & E3AA 29A6 uni29A6 DB4D 4X59 DX9E 0 N dwangle ISOTECH Q\wideangledown large downward pointing angle & E3AB 29A7 uni29A7 DB7C 4X5A DX9F 0 N uwangle ISOTECH Q\wideangleup large upward pointing angle & E3AC 2AEC uni2AEC DB60 4X0B DX66 0DS R Not ISOTECH H\Not not with two horizontal strokes & E3AD 2AED uni2AED DB46 4X0C DX67 0DS R bNot ISOTECH H\bNot reverse not with two horizontal strokes & E3AE 2A57 uni2A57 DB70 2X79 CX78 0 S B orslope ISOTECH Q\bigslopedvee sloping large or & E3AF 2A58 uni2A58 DB3F 2X7A CX79 0 S B andslope ISOTECH Q\bigslopedwedge sloping large and & E3B0 2A61 uni2A61 EEDB 2X81 CX82 0 S B veebar ISOAMSB Q\varveebar 0xE95F /veebar B: logical or, bar below + E3B1 2218 uni2218 EF67 0DN cir ISOPUB* P\circ cir /circ B: circle, open % E3B2 EE24 stixEE24 F027 0DA A fjlig ISOPUB E\fjlig fjlig small fj ligature E3B4 2026 uni2026.em 2145 7X12 AX1F 0DP P mldr ISOPUB Q\emleader mldr em leader E3B5 2736 uni2736 7X42 DXF6 1DN N sext ISOPUB M\varstar sext SixPointedStar 0x2736 sextile (6-pointed star) = E3B6 0308 uni0308 2322? 0 D D Dot ISOTECH P\ddot Dot dieresis or umlaut mark & E3B7 2AEA uni2AEA DB33 4X09 DX64 0DS R barV H\barV r246 double vert, bar over & E3B8 22F8 uni22F8 DB37 2X04 CX06 0DS R isinvb H\isinvb r130 set membership, bar under / E3BC 2209 uni220A0338 EF4B 2X05 1 S R notins Q\nsmallin n224 5 B8 negated (slash) set membership / E3BD 2275 uni227320D2 EBB5 1 S R nvgsim Q\nvgtrsim not, vert, greater, similar / E3BE 2274 uni227220D2 EBB6 1 S R nvlsim Q\nvlesssim not, vert, less, similar & E3C0 29F7 uni29F7 EEC9 7X15 AX22 0DN B rsolbar H\rsolbar reversed solidus, bar through & E3C4 2AE2 uni2AE2 EBD4 4X00 DX5A 0DS R vDdash Q\vDdash r234 vertical, triple dash; ordinarily satisfies & E3C7 299F uni299F D9C8 4X53 DX96 0DN angdnr p\angdnr angdnr angle (acute), inverted & E3C8 29E1 uni29E1 D9F6 5X4A DXE0 0 S R lrtrieq Q\lrtriangleeq increases as; wedge over bar E3C9 uni223E.reversed D9F7 5X41 DXD7 1DS H\congruence 0xE949 congruence sign (lazy S) & E3CA 2A51 uni2A51 2X73 CX72 0 S B Q\wedgeodot and, with dot & E3CB 2A52 uni2A52 2X74 CX73 0 S B Q\veeodot or, with dot % E3CC 03B1 uni03B1 E27A 0 Z A Q\textalpha Latin letter small alpha % E3CD 026B uni026B E27D 0 Z A T\textltilde velarized voiced alveolar lateral approximant % E3CE uni0265.superscript E291 1 Z Q\textsupturnh modifier letter small h turned, superscript % E3CF uni0252.superscript E292 1 Z Q\textsupturnscripta modifier letter small a (one-story) turned, superscript % E3D0 03C3 uni03C3 E2B8 0 Z A Q\textsigma voiced labialized dental or alveolar fricative (obsolete) % E3D1 0067 g E2E3 0 Z A velar implosive E3D2 25AA uni25AA EB47 0 N Q\smblksquare small square, filled (square bullet) & E3D3 2A0F uni2A0F EB69 2X2E CX27 0DL L slint X\fint intslash integral, average (slashed) # E3D3 2A0F uni2A0F.lgdisplay EB69 2X2E CX27 0DL L slint X\fint intslash INTEGRAL AVERAGE WITH SLASH # E3D3 2A0F uni2A0F.up EB69 2X2E CX27 0DL L slint X\fint intslash INTEGRAL AVERAGE WITH SLASH # E3D3 2A0F uni2A0F.uplgdisplay EB69 2X2E CX27 0DL L slint X\fint intslash INTEGRAL AVERAGE WITH SLASH # E3D3 2A0F uni2A0F.upsmall EB69 2X2E CX27 0DL L slint X\fint intslash INTEGRAL AVERAGE WITH SLASH # E3D4 22BD uni22BD EBB9 0 S B barvee ISOAMSB E\barvee not or (bar over small vee) % E3D5 007C uni007C EE7C 0 F vertdel P\vert /vert - vertical bar, absolute value & E3D6 2934 uni2934 BX40 0 N Q\uprightcurvedarrow rightwards arrow curving up & E3D7 2935 uni2935 BX41 0 N Q\downrightcurvedarrow rightwards arrow curving down / E3D8 uni2A9B20D2 1 S R Q\nveqqslantless two-line slanted equal to or less-than - with vertical stroke / E3D9 uni2A9C20D2 1 S R Q\nveqqslantgtr two-line slanted equal to or greater-than with vertical stroke / E3DA uni2A9B0338 1 S R Q\neqqslantless two-line slanted equal to or less-than - with slash / E3DB uni2A9C0338 1 S R Q\neqqslantgtr two-line slanted equal to or greater-than with slash & E402 290C uni290C D9B0 1X0D BX18 0DS R lbarr ISOAMSA H\leftbkarrow a142 left broken arrow E407 uni223E.var D947 5X40 DXD6 1FS mstpos ISOAMSR bpz?H\mostpos most positive & E409 29BE uni29BE 217D 5X10 DXB8 0 N olcir ISOAMSB Q\circledwhitebullet large circle in circle / E415 2241 uni223C20D2 EEFE 1 S R nvsim ISOAMSN Q\nvsim n144 3 B2 not, vert, similar & E41A 29B0 uni29B0 EEC4 5X00 DXA9 0 N N bemptyv ISOAMSO Q\revemptyset reversed circle, slash W E43B 23E3 uni23E3 D8DC 0DN N benzenr ISOCHEM E\benzenr benzene ring, circle W E43C 2B21 uni2B21 ____ 0DN N benzen ISOCHEM W\varhexagon hexago 0xE9A5 benzene ring [hexagon open] = E450 uni0308 23C9 0 D D uml ISODIA P\ddot umlaut mark % E4F9 2423 uni2423 F0FE 7X21 AX2A 0DN N blank ISOPUB L\textvisiblespace blank SpaceIndicator 0x2423 significant blank symbol W E4FC 2B19 uni2B19 ____ 0dN N diamonfb ISOPUB Q\diamondbotblack diamfbtm diamond, filled bottom half W E4FF 2B18 uni2B18 ____ 0dN N diamonft ISOPUB Q\diamondtopblack diamftop diamond, filled top half & E500 D538 u1D538 ____ 6X30 0DZ A Aopf ISOMOPF Q\BbbA \BBA DoubleStruckCapitalA 6 41 xx41 open face capital A & E501 D539 u1D539 ____ 6X31 0DZ A Bopf ISOMOPF Q\BbbB \BBB DoubleStruckCapitalB 6 42 xx42 open face capital B % E502 2102 uni2102 EFAC 0DZ A Copf ISOMOPF Q\BbbC \BBC DoubleStruckCapitalC \bbbc 0x2102 6 43 xx43 /Bbb C, open face C + E502 2102 uni2102 EFAC 0DZ A Copf ISOMOPF Q\BbbC \complex DoubleStruckCapitalC \bbbc 0x2102 6 43 xx43 /Bbb C, open face C & E503 D53B u1D53B ____ 6X33 0DZ A Dopf ISOMOPF Q\BbbD \BBD DoubleStruckCapitalD 6 44 xx44 open face capital D & E504 D53C u1D53C ____ 6X34 0DZ A Eopf ISOMOPF Q\BbbE \BBE DoubleStruckCapitalE 6 45 xx45 open face capital E & E505 D53D u1D53D EB2D 6X35 0DZ A Fopf ISOMOPF Q\BbbF \BBF DoubleStruckCapitalF \bbbf 6 46 xx46 open face capital F & E506 D53E u1D53E ____ 6X36 0DZ A Gopf ISOMOPF Q\BbbG \BBG DoubleStruckCapitalG 6 47 xx47 open face capital G % E507 210D uni210D 22E8 0DZ A Hopf ISOMOPF Q\BbbH \BBH DoubleStruckCapitalH \bbbh 0x210D 6 48 xx48 /Bbb H, open face H + E507 210D uni210D 22E8 0DZ A Hopf ISOMOPF Q\BbbH \hilbert DoubleStruckCapitalH \bbbh 0x210D 6 48 /Bbb H, open face H & E508 D540 u1D540 ____ 6X38 0DZ A Iopf ISOMOPF Q\BbbI \BBI DoubleStruckCapitalI 6 49 xx49 open face capital I & E509 D541 u1D541 ____ 6X39 0DZ A Jopf ISOMOPF Q\BbbJ \BBJ DoubleStruckCapitalJ 6 4A xx4A open face capital J & E50A D542 u1D542 ____ 6X3A 0DZ A Kopf ISOMOPF Q\BbbK \BBK DoubleStruckCapitalK \bbbk 6 4B xx4B open face capital K & E50B D543 u1D543 ____ 6X3B 0DZ A Lopf ISOMOPF Q\BbbL \BBL DoubleStruckCapitalL 6 4C xx4C open face capital L & E50C D544 u1D544 ____ 6X3C 0DZ A Mopf ISOMOPF Q\BbbM \BBM DoubleStruckCapitalM \bbbm 6 4D xx4D open face capital M % E50D 2115 uni2115 EFAD 0DZ A Nopf ISOMOPF Q\BbbN \BBN DoubleStruckCapitalN \bbbn 0x2115 6 4E xx4E /Bbb N, open face N & E50E D546 u1D546 22E9 6X3E 0DZ A Oopf ISOMOPF Q\BbbO \BBO DoubleStruckCapitalO 6 4F xx4F open face capital O % E50F 2119 uni2119 EB21 0DZ A Popf ISOMOPF Q\BbbP \BBP DoubleStruckCapitalP \bbbp 0x2119 6 50 xx50 /Bbb P, open face P % E510 211A uni211A 22E7 0DZ A Qopf ISOMOPF Q\BbbQ \BBQ DoubleStruckCapitalQ 0x211A 6 51 xx51 /Bbb Q, open face Q % E511 211D uni211D EFAE 0DZ A Ropf ISOMOPF Q\BbbR \BBR DoubleStruckCapitalR \bbbr 0x211D 6 52 xx52 /Bbb R, open face R & E512 D54A u1D54A ____ 6X42 0DZ A Sopf ISOMOPF Q\BbbS \BBS DoubleStruckCapitalS \bbbs 6 53 xx53 open face capital S & E513 D54B u1D54B ____ 6X43 0DZ A Topf ISOMOPF Q\BbbT \BBT DoubleStruckCapitalT \bbbt 6 54 xx54 open face capital T & E514 D54C u1D54C ____ 6X44 0DZ A Uopf ISOMOPF Q\BbbU \BBU DoubleStruckCapitalU 6 55 xx55 open face capital U & E515 D54D u1D54D ____ 6X45 0DZ A Vopf ISOMOPF Q\BbbV \BBV DoubleStruckCapitalV 6 56 xx56 open face capital V & E516 D54E u1D54E ____ 6X46 0DZ A Wopf ISOMOPF Q\BbbW \BBW DoubleStruckCapitalW 6 57 xx57 open face capital W & E517 D54F u1D54F ____ 6X47 0DZ A Xopf ISOMOPF Q\BbbX \BBX DoubleStruckCapitalX 6 58 xx58 open face capital X & E518 D550 u1D550 ____ 6X48 0DZ A Yopf ISOMOPF Q\BbbY \BBY DoubleStruckCapitalY 6 59 xx59 open face capital Y % E519 2124 uni2124 EFAF 0DZ A Zopf ISOMOPF Q\BbbZ \BBZ DoubleStruckCapitalZ \bbbz 0x2124 6 5A xx5A /Bbb Z, open face Z & E51A 213F uni213F AX0C 0DZ A opfPi A\BbbPi open face capital Pi & E520 D49C u1D49C D853 6X70 0DZ A Ascr ISOMSCR Q\scrA ScriptCapitalA 2 21 script letter capital A % E521 212C uni212C DB43 0FZ A Bscr ISOMSCR cjb Q\scrB ScriptCapitalB 0x212C 2 40 MATHEMATICAL SCRIPT CAPITAL B & E522 D49E u1D49E D854 6X72 0DZ A Cscr ISOMSCR Q\scrC ScriptCapitalC 2 23 script letter capital C & E523 D49F u1D49F D855 6X73 0DZ A Dscr ISOMSCR Q\scrD ScriptCapitalD 2 24 script letter capital D % E524 2130 uni2130 D856 0DZ A Escr ISOMSCR Q\scrE ScriptCapitalE 0x2130 2 25 MATHEMATICAL SCRIPT CAPITAL E % E525 2131 uni2131 D857 0DZ A Fscr ISOMSCR Q\scrF ScriptCapitalF 0x2131 2 5E MATHEMATICAL SCRIPT CAPITAL F & E526 D4A2 u1D4A2 D858 6X76 0DZ A Gscr ISOMSCR Q\scrG ScriptCapitalG 2 26 script letter capital G % E527 210B uni210B EB22 0FZ A Hscr ISOMSCR cjh Q\scrH ScriptCapitalH 0x210B 2 2A MATHEMATICAL SCRIPT CAPITAL H % E528 2110 uni2110 EB23 0DZ A Iscr ISOMSCR Q\scrI ScriptCapitalI 0x2110 2 28 MATHEMATICAL SCRIPT CAPITAL I & E529 D4A5 u1D4A5 D859 6X79 0DZ A Jscr ISOMSCR Q\scrJ ScriptCapitalJ 2 29 script letter capital J & E52A D4A6 u1D4A6 D85A 6X7A 0DZ A Kscr ISOMSCR Q\scrK ScriptCapitalK 2 5F script letter capital K % E52B 2112 uni2112 EE44 0FZ A Lscr ISOMSCR cjl Q\scrL ScriptCapitalL 0x2112 2 2B MATHEMATICAL SCRIPT CAPITAL L % E52C 2133 uni2133 EB5E 0FZ A Mscr ISOMSCR cjm Q\scrM ScriptCapitalM 0x2133 2 7D MATHEMATICAL SCRIPT CAPITAL M & E52D D4A9 u1D4A9 D85B 6X7D 0DZ A Nscr ISOMSCR Q\scrN ScriptCapitalN 2 31 script letter capital N & E52E D4AA u1D4AA D85C 6X7E 0FZ A Oscr ISOMSCR cjo Q\scrO ScriptCapitalO 2 32 script letter capital O & E52F D4AB u1D4AB D85D 6X7F 0DZ A Pscr ISOMSCR Q\scrP ScriptCapitalP 2 33 script letter capital P & E530 D4AC u1D4AC D85E 6X80 0DZ A Qscr ISOMSCR Q\scrQ ScriptCapitalQ 2 34 script letter capital Q % E531 211B uni211B EE43 0DZ A Rscr ISOMSCR Q\scrR ScriptCapitalR 0x211B 2 35 MATHEMATICAL SCRIPT CAPITAL R & E532 D4AE u1D4AE D85F 6X82 0DZ A Sscr ISOMSCR Q\scrS ScriptCapitalS 2 36 script letter capital S & E533 D4AF u1D4AF D860 6X83 0DZ A Tscr ISOMSCR Q\scrT ScriptCapitalT 2 37 script letter capital T & E534 D4B0 u1D4B0 D861 6X84 0DZ A Uscr ISOMSCR Q\scrU ScriptCapitalU 2 38 script letter capital U & E535 D4B1 u1D4B1 D862 6X85 0DZ A Vscr ISOMSCR Q\scrV ScriptCapitalV 2 39 script letter capital V & E536 D4B2 u1D4B2 D863 6X86 0DZ A Wscr ISOMSCR Q\scrW ScriptCapitalW 2 30 script letter capital W & E537 D4B3 u1D4B3 D864 6X87 0DZ A Xscr ISOMSCR Q\scrX ScriptCapitalX 2 2D script letter capital X & E538 D4B4 u1D4B4 D865 6X88 0DZ A Yscr ISOMSCR Q\scrY ScriptCapitalY 2 3D script letter capital Y & E539 D4B5 u1D4B5 D866 6X89 0DZ A Zscr ISOMSCR Q\scrZ ScriptCapitalZ 2 5D script letter capital Z & E540 D4B6 u1D4B6 ____ 6X90 0DZ A ascr ISOMSCR Q\scra ScriptA script letter small a [cf. 0251] & E541 D4B7 u1D4B7 ____ 6X91 0DZ A bscr ISOMSCR Q\scrb ScriptB script letter small b & E542 D4B8 u1D4B8 ____ 6X92 0DZ A cscr ISOMSCR Q\scrc ScriptC script letter small c & E543 D4B9 u1D4B9 ____ 6X93 0DZ A dscr ISOMSCR Q\scrd ScriptD script letter small d % E544 212F uni212F ____ 0DZ A escr ISOMSCR Q\scre ScriptE 0x212F MATHEMATICAL SCRIPT SMALL E & E545 D4BB u1D4BB ____ 6X95 0DZ A fscr ISOMSCR Q\scrf ScriptF script letter small f % E546 210A uni210A ____ 0DZ A gscr ISOMSCR Q\scrg ScriptG 0x210A 2 3B MATHEMATICAL SCRIPT SMALL G & E547 D4BD u1D4BD ____ 6X97 0DZ A hscr ISOMSCR Q\scrh ScriptH 2 27 script letter small h & E548 D4BE u1D4BE ____ 6X98 0DZ A iscr ISOMSCR Q\scri ScriptI script letter small i & E549 D4BF u1D4BF ____ 6X99 0DZ A jscr ISOMSCR Q\scrj ScriptJ script letter small j & E54A D4C0 u1D4C0 ____ 6X9A 0DZ A kscr ISOMSCR Q\scrk ScriptK script letter small k % E54B 2113 uni2113 EF69 0FZ A ell ISOAMSO buk P\ell ell \ell ScriptL 0x2113 2 2C MATHEMATICAL SCRIPT SMALL L & E54C D4C2 u1D4C2 ____ 6X9C 0DZ A mscr ISOMSCR Q\scrm ScriptM script letter small m & E54D D4C3 u1D4C3 ____ 6X9D 0DZ A nscr ISOMSCR Q\scrn ScriptN script letter small n % E54E 2134 uni2134 DB6E 0DZ A oscr ISOMSCR Q\scro ScriptO 0x2134 MATHEMATICAL SCRIPT SMALL O & E54F D4C5 u1D4C5 ____ 6X9F 0DZ A pscr ISOMSCR Q\scrp ScriptP script letter small p & E550 D4C6 u1D4C6 ____ 6XA0 0DZ A qscr ISOMSCR Q\scrq ScriptQ script letter small q & E551 D4C7 u1D4C7 ____ 6XA1 0DZ A rscr ISOMSCR Q\scrr ScriptR script letter small r & E552 D4C8 u1D4C8 ____ 6XA2 0DZ A sscr ISOMSCR Q\scrs ScriptS script letter small s & E553 D4C9 u1D4C9 ____ 6XA3 0DZ A tscr ISOMSCR Q\scrt ScriptT script letter small t & E554 D4CA u1D4CA ____ 6XA4 0DZ A uscr ISOMSCR Q\scru ScriptU script letter small u & E555 D4CB u1D4CB ____ 6XA5 0DZ A vscr ISOMSCR Q\scrv ScriptV script letter small v & E556 D4CC u1D4CC ____ 6XA6 0DZ A wscr ISOMSCR Q\scrw ScriptW script letter small w & E557 D4CD u1D4CD ____ 6XA7 0DZ A xscr ISOMSCR Q\scrx ScriptX script letter small x & E558 D4CE u1D4CE ____ 6XA8 0DZ A yscr ISOMSCR Q\scry ScriptY script letter small y & E559 D4CF u1D4CF ____ 6XA9 0DZ A zscr ISOMSCR Q\scrz ScriptZ 2 2F script letter small z & E560 D504 u1D504 ____ 6XB0 0FZ A Afr ISOMFRK Q\frakA GothicCapitalA 2 41 fraktur letter capital A & E561 D505 u1D505 ____ 6XB1 0FZ A Bfr ISOMFRK Q\frakB GothicCapitalB 2 42 fraktur letter capital B & E562 212D uni212D EB7B 6XB2 0FZ A Cfr ISOMFRK Q\frakC GothicCapitalC 2 43 fraktur letter capital C & E563 D507 u1D507 ____ 6XB3 0FZ A Dfr ISOMFRK Q\frakD GothicCapitalD 2 44 fraktur letter capital D & E564 D508 u1D508 ____ 6XB4 0FZ A Efr ISOMFRK Q\frakE GothicCapitalE 2 45 fraktur letter capital E & E565 D509 u1D509 ____ 6XB5 0FZ A Ffr ISOMFRK Q\frakF GothicCapitalF 2 46 fraktur letter capital F & E566 D50A u1D50A EB2A 6XB6 0FZ A Gfr ISOMFRK Q\frakG GothicCapitalG 2 47 fraktur letter capital G & E567 210C uni210C ____ 6XB7 0FZ A Hfr ISOMFRK Q\frakH GothicCapitalH 2 48 fraktur letter capital H & E568 2111 uni2111 ____ 6XB8 0FZ A Ifr ISOMFRK Q\frakI GothicCapitalI 2 49 fraktur letter capital I & E569 D50D u1D50D ____ 6XB9 0FZ A Jfr ISOMFRK Q\frakJ GothicCapitalJ 2 4A fraktur letter capital J & E56A D50E u1D50E ____ 6XBA 0FZ A Kfr ISOMFRK Q\frakK GothicCapitalK 2 4B fraktur letter capital K & E56B D50F u1D50F ____ 6XBB 0FZ A Lfr ISOMFRK Q\frakL GothicCapitalL 2 4C fraktur letter capital L & E56C D510 u1D510 EB2C 6XBC 0FZ A Mfr ISOMFRK Q\frakM GothicCapitalM 2 4D fraktur letter capital M & E56D D511 u1D511 ____ 6XBD 0FZ A Nfr ISOMFRK Q\frakN GothicCapitalN 2 4E fraktur letter capital N & E56E D512 u1D512 ____ 6XBE 0FZ A Ofr ISOMFRK Q\frakO GothicCapitalO 2 4F fraktur letter capital O & E56F D513 u1D513 ____ 6XBF 0FZ A Pfr ISOMFRK Q\frakP GothicCapitalP 2 50 fraktur letter capital P & E570 D514 u1D514 ____ 6XC0 0FZ A Qfr ISOMFRK Q\frakQ GothicCapitalQ 2 51 fraktur letter capital Q & E571 211C uni211C ____ 6XC1 0FZ A Rfr ISOMFRK Q\frakR GothicCapitalR 2 52 fraktur letter capital R & E572 D516 u1D516 ____ 6XC2 0FZ A Sfr ISOMFRK Q\frakS GothicCapitalS 2 53 fraktur letter capital S & E573 D517 u1D517 ____ 6XC3 0FZ A Tfr ISOMFRK Q\frakT GothicCapitalT 2 54 fraktur letter capital T & E574 D518 u1D518 ____ 6XC4 0FZ A Ufr ISOMFRK Q\frakU GothicCapitalU 2 55 fraktur letter capital U & E575 D519 u1D519 ____ 6XC5 0FZ A Vfr ISOMFRK Q\frakV GothicCapitalV 2 56 fraktur letter capital V & E576 D51A u1D51A ____ 6XC6 0FZ A Wfr ISOMFRK Q\frakW GothicCapitalW 2 57 fraktur letter capital W & E577 D51B u1D51B ____ 6XC7 0FZ A Xfr ISOMFRK Q\frakX GothicCapitalX 2 58 fraktur letter capital X & E578 D51C u1D51C ____ 6XC8 0FZ A Yfr ISOMFRK Q\frakY GothicCapitalY 2 59 fraktur letter capital Y & E579 2128 uni2128 ____ 6XC9 0FZ A Zfr ISOMFRK Q\frakZ GothicCapitalZ 2 5A fraktur letter capital Z & E580 D51E u1D51E ____ 6XD0 0FZ A afr ISOMFRK Q\fraka GothicA 2 61 fraktur letter small a & E581 D51F u1D51F ____ 6XD1 0FZ A bfr ISOMFRK Q\frakb GothicB 2 62 fraktur letter small b & E582 D520 u1D520 ____ 6XD2 0FZ A cfr ISOMFRK Q\frakc GothicC 2 63 fraktur letter small c & E583 D521 u1D521 ____ 6XD3 0FZ A dfr ISOMFRK Q\frakd GothicD 2 64 fraktur letter small d & E584 D522 u1D522 ____ 6XD4 0FZ A efr ISOMFRK Q\frake GothicE 2 65 fraktur letter small e & E585 D523 u1D523 ____ 6XD5 0FZ A ffr ISOMFRK Q\frakf GothicF 2 66 fraktur letter small f & E586 D524 u1D524 ____ 6XD6 0FZ A gfr ISOMFRK Q\frakg GothicG 2 67 fraktur letter small g & E587 D525 u1D525 ____ 6XD7 0FZ A hfr ISOMFRK Q\frakh GothicH 2 68 fraktur letter small h & E588 D526 u1D526 ____ 6XD8 0FZ A ifr ISOMFRK Q\fraki GothicI 2 69 fraktur letter small i & E589 D527 u1D527 ____ 6XD9 0FZ A jfr ISOMFRK Q\frakj GothicJ 2 6A fraktur letter small j & E58A D528 u1D528 ____ 6XDA 0FZ A kfr ISOMFRK Q\frakk GothicK 2 6B fraktur letter small k & E58B D529 u1D529 ____ 6XDB 0FZ A lfr ISOMFRK Q\frakl GothicL 2 6C fraktur letter small l & E58C D52A u1D52A ____ 6XDC 0FZ A mfr ISOMFRK Q\frakm GothicM 2 6D fraktur letter small m & E58D D52B u1D52B ____ 6XDD 0FZ A nfr ISOMFRK Q\frakn GothicN 2 6E fraktur letter small n & E58E D52C u1D52C ____ 6XDE 0FZ A ofr ISOMFRK Q\frako GothicO 2 6F fraktur letter small o & E58F D52D u1D52D ____ 6XDF 0FZ A pfr ISOMFRK Q\frakp GothicP 2 70 fraktur letter small p & E590 D52E u1D52E ____ 6XE0 0FZ A qfr ISOMFRK Q\frakq GothicQ 2 71 fraktur letter small q & E591 D52F u1D52F ____ 6XE1 0FZ A rfr ISOMFRK Q\frakr GothicR 2 72 fraktur letter small r & E592 D530 u1D530 ____ 6XE2 0FZ A sfr ISOMFRK Q\fraks GothicS 2 73 fraktur letter small s & E593 D531 u1D531 ____ 6XE3 0FZ A tfr ISOMFRK Q\frakt GothicT 2 74 fraktur letter small t & E594 D532 u1D532 ____ 6XE4 0FZ A ufr ISOMFRK Q\fraku GothicU 2 75 fraktur letter small u & E595 D533 u1D533 ____ 6XE5 0FZ A vfr ISOMFRK Q\frakv GothicV 2 76 fraktur letter small v & E596 D534 u1D534 ____ 6XE6 0FZ A wfr ISOMFRK Q\frakw GothicW 2 77 fraktur letter small w & E597 D535 u1D535 ____ 6XE7 0FZ A xfr ISOMFRK Q\frakx GothicX 2 78 fraktur letter small x & E598 D536 u1D536 ____ 6XE8 0FZ A yfr ISOMFRK Q\fraky GothicY 2 79 fraktur letter small y & E599 D537 u1D537 ____ 6XE9 0FZ A zfr ISOMFRK Q\frakz GothicZ 2 7A fraktur letter small z & E5A0 2942 uni2942 1X3E BX4E 0FS R arrlrsl ba2 H\rightarrowshortleftarrow arrlrsl a119 0xEB01 right arrow over short left arrow & E5A1 2944 uni2944 1X3F BX50 0FS R arrsrll ba3 H\shortrightarrowleftarrow a120 0xEB02 short right arrow over left arrow & E5A2 2947 uni2947 1X42 BX53 0FS R rarrx bbl H\rightarrowx a160 right arrow through x & E5A3 2940 uni2940 EEF4?1X3B BX4C 0FS R olarr ISOAMSA bbp A\acwcirclearrow olarr larrcur a137 anticlockwise closed circle arrow & E5A4 2941 uni2941 EEF5?1X3C BX4D 0FS R orarr ISOAMSA bbq A\cwcirclearrow orarr rarrcur a138 clockwise closed circle arrow * E5A5 EC02 uni2A3DFE00 4X05 DX60 1fS R vldash bd5 A\varintprodr r247 vert, low bar to right from base & E5A8 2985 uni2985 EB38 4X15 DX6D 0FF O lopar ISOTECH bdd Q\lParen left white parenthesis & E5AA 2980 uni2980 DX68 0FF tverbar bdm A\Vvert 0xE979 triple vertical bar (fence) * E5AC EC01 uni2A3CFE00 4X04 DX5F 1fS R ldashv be5 A\varintprod r248 vert, low bar to left from base & E5AF 2986 uni2986 EB39 4X16 DX6E 0FF C ropar ISOTECH bed Q\rParen right white parenthesis & E5B0 2AF6 uni2AF6 4X49 DX8F 0FN vellipv bek Q\threedotcolon three close dots vertical (ellipsis) & E5B2 2999 uni2999 4X4A DX90 0FN vellip4 bem Q\fourvdots four close dots vertical (ellipsis) W E5B4 2B14 uni2B14 ____ 0FN N squarftr ISOPUB bfp Q\squareurblack squftopr \semaphorer square, filled top right corner W E5B5 2B15 uni2B15 ____ 0FN N squarfbl ISOPUB bfr Q\squarellblack squfbtml sqlls \semaphorel square, filled bottom left corner P E5B6 2B12 uni2B12 ____ 0FN N squarft ISOPUB bfv Q\squaretopblack sqts square, filled top half P E5B7 2B13 uni2B13 ____ 0FN N squarfb ISOPUB bfw Q\squarebotblack sqbs square, filled bottom half % E5B8 25A9 uni25A9.var 0FN N bg6 Q\squaregrayfill square with gray shading fill W E5B9 2B16 uni2B16 ____ 0fN N diamonfl ISOPUB bgg Q\diamondleftblack diamond, filled left half W E5BA 2B17 uni2B17 ____ 0fN N diamonfr ISOPUB bgh Q\diamondrightblack diamond, filled right half W E5BC 26A5 uni26A5 0FN N hmphdite bh8 V\Hermaphrodite hmphdite hermaphrodite % E5BF 2222 uni2222 4X29 0FN ltrpar bi8 H\ltrpar r212 less than, right arc & E5C5 2A08 uni2A08 2X27 CX20 0FL L xoror bis A\disjquant two logical or operator & E5C6 2A07 uni2A07 2X28 CX1F 0FL L xandand bit A\conjquant two logical and operator & E5C7 2A63 uni2A63 2X82 CX84 0FR B veeBar biy Q\veedoublebar 0xE95E 3 A4 logical or, double bar below (large vee) & E5C8 2A5E uni2A5E 2X7F CX7F 0FR B Barwed biz A\doublebarwedge 3 B0 double bar over large wedge & E5CA 29CA uni29CA 5X20 DXC4 0FN tridoto bj5 Q\triangleodot triangle, dot over & E5CF 2A95 uni2A95 2160 3X36 CXDE 0FR R els ISOAMSR bkc A\eqslantless els r126 0xE90D 5 65 equal-or-less, slanted / E5DC uni2AAF0338 21D2 3X6A 1FS R npre ISOAMSN blu A\npreceq npre \not\preceq NotPrecedesEqual n065 not precedes, single equals M E5DE uni2AB30338 1FS R nprE X\npreceqq not precedes, double equals & E5DF 2A96 uni2A96 2161 3X37 CXDF 0FR R egs ISOAMSR bmc A\eqslantgtr egs r127 0x22DD 5 72 equal-or-greater slanted / E5E4 E84E uni224220D2 2FR R nvesim bmp Q\nveqsim 0xEA0F 5 A9 not, vert, equal or similar % E5E7 EE50 stixEE50 0FN bn3 Q\chembondtwofallonerise 2 lines falling over 1 line rising % E5E8 EE51 stixEE51 0FN bn4 Q\chembondonefalltworise 1 line falling over 2 lines rising % E5E9 EE52 stixEE52 0FN bn5 Q\chembondtworiseonefall 2 lines rising over 1 line falling % E5EA EE53 stixEE53 0FN bn6 Q\chembondonerisetwofall 1 line rising over 2 lines falling M E5F0 uni2AB40338 1FS R nscE X\nsucceqq not succeeds, double equals / E5F1 uni2AB00338 21D3 3X6B 1FS R nsce ISOAMSN bnu A\nsucceq nsce \not\succeq NotSucceedsEqual n067 not succeeds, single equals W E5F2 2B20 uni2B20 DB2D 0FN N pentagon bo1 W\pentagon pentagon outline % E5F4 EE54 stixEE54 0FN bo3 Q\chembondHonedashonesolid dashed line over line % E5F6 EE55 stixEE55 0FN bo5 Q\chembondHonedashtwosolid dashed line over two lines % E5F7 EE56 stixEE56 0FN bo6 Q\chembondHtwosolidonedash two lines over dashed line % E5F8 EE57 stixEE57 0FN bo7 Q\chembondHonemed sngbnd single line, medium length % E5F9 EE58 stixEE58 0FN bo8 Q\chembondHonedotsonesolid dotted (3 dots) line over line % E5FB EE59 stixEE59 0FN boq Q\chembondHtwolong dblbnd dbd two long horizontal lines # E5FC EE5A stixEE5A 0FN bor Q\chembondHthreelong trpbnd three long horizontal lines # E5FD EE5B stixEE5B 0FN bos Q\chembondHfourlong four long horizontal lines & E5FE 29F8 uni29F8 7X16 AX23 0FL L xsol bow H\xsol bigsl large solidus & E5FF 29F9 uni29F9 7X17 AX24 0FL L xbsol box H\xbsol bigbksl xx3A large reverse solidus, Z NOTATION SCHEMA HIDING / E604 uni228F0338 3X84 2FR R nsqsub bpk X\nsqsubset NotSquareSubset n171 0xEA60 not, square subset % E605 EE5C stixEE5C 0FN bpq Q\chembondHtwomed two medium horizontal lines % E606 EE5D stixEE5D 0FN bpr Q\chembondHthreemed three medium horizontal lines % E607 EE5E stixEE5E 0FN bps Q\chembondHfourmed four medium horizontal lines % E608 EE5F stixEE5F 0FN bpt Q\chembondoneriseoneHonefall rising line, horizontal line, falling line % E609 EE60 stixEE60 0FN bpu Q\chembondonefalloneHonerise falling line, horizontal line, rising line % E60A EE61 stixEE61 0FN bpv Q\chembondoneriseonefall rising line, falling line % E60B EE62 stixEE62 0FN bpw Q\chembondonefallonerise falling line, rising line E60C 224C uni224C 21CB 3X09 CXA0 0FR R bcong ISOAMSR bq9 A\backcong bcong r128 reverse congruent E60D 224C uni224C.var D9F8 0 S Q\varbackcong 0x224C all equal to (lazy S over equals) (formerly 224C; that shape changed) & E60F 29CB uni29CB 5X21 DXC5 0FN tribar bqw Q\triangleubar 0xE990 triangle, bar under / E615 uni22900338 3X85 2FR R nsqsup brk X\nsqsupset NotSquareSuperset n172 0xEA61 not, square superset / E616 uni224E0338 3X56 2FR R nbump brn X\nBumpeq NotHumpDownHump n010 0xEA53 not bumpy equals & E619 2A2F uni2A2F 2X4B CX49 0FS B htimes bsb Q\vectimes Cross small, bold times & E61B 29B6 uni29B6 D84C 5X08 DXB0 0FR B omid ISOAMSB bsq Q\circledvert 0xE984 6 26 vertical bar in circle # E623 2205 uni2205.var 22A7 DXA8 2FR N empty ISOAMSO bu0 P\emptyset empty \emptyset empty set - zero, slash % E624 EE10 stixEE10 0FO N buc Q\Cbar capital C with stroke * E625 0326 uni0326 23D3 0FN D ucomma cah Q\textsubcomma 5 28 comma undermark % E626 00B7 periodcentered 00B7 0FN middot ISONUM can L\textperiodcentered middle dot & E629 03F5 uni03F5 FD5B 6X00 AX02 0FA A epsi ISOGRK3 cde P\upepsilon epsi egr \epsilon Epsilon r219 0x220A 1 65 /straightepsilon - small epsilon, Greek % E62D EE14 stixEE14 0FZ pa8 T\texthooktop hooktop (phonetic symbol) % E62E 0061 a E25B 0FZ A paa open front unrounded vowel % E630 EE15 stixEE15 0FZ pb8 Q\textcurlytail curly tail (phonetic symbol) % E631 0077 uni0077.subscript 0FZ pc3 Q\textsubwvar subscript w (phonetic symbol) % E632 EE18 stixEE18 E296 0FZ pc6 Q\tonebarlevelrise modifier letter level-rise contour tone bar % E633 EE19 stixEE19 E29B 0FZ pc7 Q\tonebarhighrise modifier letter high-rise tone bar % E634 EE1A stixEE1A E239 0FZ pd3 T\textretractingvar retracted (in-line diacritic) % E635 EE1B stixEE1B E297 0FZ pd6 Q\tonebarfalllevel modifier letter fall-level contour tone bar % E636 EE1C stixEE1C E29C 0FZ pd7 Q\tonebarlowrise modifier letter low-rise tone bar % E637 uni1D0B.reversed E277 1FZ A pdk Q\textrevsck Latin letter small capital K, reversed % E638 EE1D stixEE1D E298 0FZ pe6 Q\tonebarfallrisefall modifier letter fall-rise-fall contour tone bar % E639 EE1E stixEE1E E29D? 0FZ pe7 Q\tonebarrisefall modifier letter rise-fall tone bar % E63A 026E uni026E E2BC 0FZ pel T\textlyoghlig voiced lateral dental or alveolar fricative % E63C 02AF uni02AF E21F 0FZ A pgh T\textvibyy Latin letter small h, turned, with upper left and lower right hooks % E63D uni025102DE E294 1FZ A pha Q\textrhookscripta Latin letter small a (one-story) with rhotic hook % E63E 0235 uni0235 E274 0FZ A phn T\textctn Latin letter small n with curlytailed right foot % E63F 0236 uni0236 E279 0FZ A pht T\textctt Latin letter small t with curlytailed stem % E640 EE1F stixEE1F E299 0FZ A pi7 Q\tonebarrise modifier letter rise tone bar % E641 0221 uni0221 E278 0FZ A pid T\textctd Latin letter small d with curlytailed stem % E642 EE12 stixEE12 0FZ A pih T\textheng heng (phonetic symbol) % E643 2AFD uni2AFD 0FZ A pj1 Q\textdoubleslash double slash (phonetic symbol) % E644 EE20 stixEE20 E29A 0FZ pj7 Q\tonebarfall modifier letter fall tone bar % E645 uni025B02DE E293 1FZ A pje Q\textrhookepsilon Latin letter small open e with rhotic hook % E646 uni025402DE E295 1FZ A pjo Q\textrhookopeno Latin letter small open o with rhotic hook % E647 2AFB uni2AFB 0FZ A pk1 Q\texttripleslash triple slash (phonetic symbol) % E648 uni03C9.inverted E276 1FZ A pko T\textinvomega invomega Latin letter small omega, inverted % E64A 005C backslash 0FZ pl1 L\textbackslash small backslash (phonetic symbol) % E64B EE13 stixEE13 E27B 0FZ A plr T\textlhtlongi Latin letter small r-fishhook, reversed, with descender stem W E64C 035C uni035C E235 0FZ pt2 Q\texttieunderarc inferior ligature (non-spacing) & E650 21F9 uni21F9 BX04 0FS R nvharr bbr H\nvleftrightarrow a204 xx11 not, vert, left and right arrow # E654 E215 uni297D.var EBC8 1FS R prurelv bdy?H\varrightfishtail a162 right fish tail; element precedes under relation % E659 u1D5B2 6X16 0FN N bji Q\sansS S-sign (sans serif cap S) & E65B 2A05 uni2A05 2X25 CX1D 0FL L xsqcap bjk A\bigsqcap square intersection operator & E660 03D8 uni03D8 2654 AX04 0 N Q\upoldKoppa Greek koppa symbol & E661 03D9 uni03D9 AX05 0 N Q\upoldkoppa Greek small koppa symbol # E662 223C uni223C.bold 2277 0FS R thksim ISOAMSR bp1?A\thicksim thickapprox r129 thick similar % E663 03D2 uni03D2 AX01 0dA A ceu P\upUpsilon Upsi Ugr \Upsilon CurlyCapitalUpsilon 1 59 Greek capital curly Upsilon symbol (= 03D2, per Ken W) & E664 03F4 uni03F4 6X01 AX00 0FA A Thetav cej Q\upvarTheta Thgr 1 55 capital Theta, Greek, straight bar (not Fita, 04E8/27A3) % E668 0062 b E2A3 0FB A pab voiced bilabial plosive % E669 0063 c E2D8 0FB A pac voiceless palatal plosive % E66A 0064 d E2B1 0FB A pad voiced dental or alveolar plosive % E66B 0065 e E256 0FB A pae half-close front unrounded vowel % E66C 0066 f E2AC 0FB A paf voiceless labiodental fricative % E66D 0068 h E2EE 0FB A pah voiceless glottal fricative % E66E 0069 i E251 0FB A pai close front unrounded vowel % E66F 006A j E2DB 0FB A paj voiced palatal fricative or approximant % E670 006B k E2DE 0FB A pak voiceless velar plosive % E671 006C l E2BD 0FB A pal pell dental or alveolar lateral approximant % E672 006D m E2A1 0FB A pam bilabial nasal % E673 006E n E2AF 0FB A pan dental or alveolar nasal % E674 006F o E269 0FB A pao half-close back rounded vowel % E675 0070 p E2A2 0FB A pap voiceless bilabial plosive % E676 0071 q E2E6 0FB A paq voiceless uvular plosive % E677 0072 r E2C0 0FB A par alveolar trill % E678 0073 s E2B6 0FB A pas voiceless alveolar median fricative % E679 0074 t E2B0 0FB A pat voiceless dental or alveolar plosive % E67A 0075 u E265 0FB A pau close back rounded vowel % E67B 0076 v E2AD 0FB A pav voiced labiodental fricative % E67C 0077 w E2A8 0FB A paw labial-velar approximant % E67D 0078 x E2E0 0FB A pax voiceless velar fricative % E67E 0079 y E252 0FB A pay close front rounded vowel % E67F 007A z E2B7 0FB A paz voiced alveolar median fricative # E680 030F uni030F 0FB A pb6 T\textdoublegrave phonetic accent `` extra low % E681 03C7 uni03C7 E2E8 0FB A pbx T\textchi voiceless uvular fricative % E682 03B2 uni03B2 E2A5 0FB A pdb T\textbeta voiced bilabial fricative % E683 01A5 uni01A5 2378 0FB A pdp T\texthtp p with right-hooked ascender % E684 1D1C uni1D1C E275 0FB A pdu T\textscu smcapu Latin letter small capital U % E685 1D07 uni1D07 0FB A pee T\textsce small capital E (phonetic symbol) % E686 004D M 0FB A pem capital M (phonetic symbol) % E687 002F slash 0FB A pf1 Q\textslash slash (phonetic symbol) % E688 1D00 uni1D00 0FB A pfa T\textsca small capital A (phonetic symbol) % E689 029C uni029C E2F2 0FB A pfh T\textsch voiceless epiglotto-pharyngeal fricative * E68A E2D4 uni0237 2f0 A pfj Q\textdotlessj DotlessJ j, undotted (phonetic symbol) % E68B 03B8 uni03B8 E2B2 0FB A pft T\texttheta ptheta voiceless dental fricative % E68C 03BB uni03BB 0fB A pgl Q\textlambda lambda (phonetic symbol) % E68D 2260 uni2260 0FB A ph1 T\textdoublebarslash double-barred slash (phonetic symbol) = E68E 0110 uni0110 0f0 A phd Q\textcrD = pfd; crossed D (phonetic symbol) % E68F 03C9 uni03C9 0FB A pho T\textomega lower-case omega (phonetic symbol) % E6A0 EE17 stixEE17 0 Q\Pollslash slash for Polish L % E6A1 EE70 stixEE70 0 Q\pertenkzero per thousand zero (TeX Cork encoding, "18) % E6A2 2010 uni2010 0 Q\texthyphen hyphen char (TeX Cork encoding, "7F; possibly equivalent to 00AD) & E800 03F6 uni03F6 22B9 2X0C AX03 0DZ N bepsi ISOAMSR Q\upbackepsilon backeps egrb 0x220D 5 7B back epsilon & E801 213F uni213F 6X28 AX0C 0dZ A opfPi A\BbbPi open face Pi & E803 D7D9 u1D7D9 6X21 0DZ N opf1 A\bbone \REALONE \bbbone open face 1 & E804 D7D8 u1D7D8 6X20 0DZ N opf0 A\bbzero open face 0 & E805 2A03 uni2A03 2X23 CX1B 0DL L xcupdot A\bigcupdot union operator with dot & E809 2A09 uni2A09 2X29 CX21 0DL L xtimes A\bigtimes big times operator & E80A 290D uni290D EB30 1X0E BX19 0DS R rbarr ISOAMSA H\rightbkarrow a141 right broken arrow & E80B 29EB uni29EB 2221?7X40 DXF4 0DN lozf ISOPUB A\blacklozenge lozf lozenge, filled & E80D 29C6 uni29C6 5X18 DXC0 0DO astb S\boxast asterisk in box & E810 29C7 uni29C7 5X19 DXC1 0DO cirb S\boxcircle small circle in box & E812 2A32 uni2A32 2X4E CX4C 0DR B btimes A\btimes semidirect product: times sign, bottom closed & E813 2AE3 uni2AE3 4X01 DX5B 0DS R dashV A\dashV r249 0xE97C dash, double vertical & E819 29DF uni29DF 5X48 DXDE 0DS R dumap A\dualmap n013 double-ended version of multimap & E81A 2ADC uni2ADC 3X93 DX54 0DS R A\forks r142 forking (slashed, although positive) & E81B 2ADD uni2ADD 3X94 DX55 0DS R A\forksnot n142 nonforking (negative, slash absent) & E81C 2141 uni2141 6X12 AX06 0DN N Game A\Game turned capital G (sans serif) & E821 2A0E uni2A0E 2X2D CX26 0DL L Barint A\intBar integral, double barred & E822 2A19 uni2A19 2X38 CX31 0DL L capint A\intcap integral, overprinted with cap & E823 2A1A uni2A1A 2X39 CX32 0DL L cupint A\intcup integral, overprinted with cup & E824 2AF4 uni2AF4 4X47 DX8B 0DS B vert3 S\interleave 0xE930 triple vertical bar (binary operator) & E825 2A18 uni2A18 2X37 CX30 0DL L timeint A\intx integral, crossed by times sign & E82D 27FB uni27FB 0DS R xmapfrom S\longmapsfrom a211 long maps to, leftward & E82E 27FD uni27FD 0DS R xMapfrom S\Longmapsfrom a213 long maps to, double arrow leftward & E830 27FE uni27FE 0DS R xMapto S\Longmapsto a212 long maps to, double arrow right & E834 2906 uni2906 1X07 BX12 0DS R Mapfrom S\Mapsfrom a058 maps to, double arrow leftward & E835 2907 uni2907 1X08 BX13 0DS R Mapto S\Mapsto a057 maps to, double arrow right / E836 uni227E0338 3X6C 1DS R nprsim X\nprecsim NotPrecedesTilde n036 not precedes, similar / E837 uni227F0338 3X6D 1DS R nscsim X\nsuccsim NotSucceedsTilde n037 not succeeds, similar & E839 29B8 uni29B8 5X0A DXB2 0DR B obsol S\obslash reverse solidus in circle & E840 2AA3 uni2AA3 3X42 CXF6 0DS R Ltbar A\partialmeetcontraction r143 double less-than with underbar # E843 2322 uni2322.small 21A6 2DR R sfrown ISOAMSR A\smallfrown sfrown r131 small down curve * E844 2216 uni2216.var 005C 2X5A 0DR B setmn ISOAMSB P\setminus setmn \setminus Backslash reverse solidus; backward division & E846 214B uni214B 7X1D AX28 0DN N turnamp A\upand turned ampersand * E847 221D uni221D.var EF71 5X44 DXDA 0DN R vprop ISOAMSR A\varpropto vprop r132 proportional, variant * E849 0303 uni0303 23BB 0DW D wdtilde P\widetilde d15 dbigwig \widetilde tilde accent (multiple characters and non-spacing) / E84D uni224F0338 3X57 2DR R nbumpe X\nbumpeq NotHumpEqual n011 0xEA52 not bumpy single equals / E84E E84E uni22420338 3X05 2DR R nesim Q\neqsim NotEqualTilde n006 5 ED not equal or similar & EA00 29A2 uni29A2 4X54 DX99 0DN angdnl Q\turnangle angdnl angle, down and left & EA01 299E uni299E 4X52 DX95 0DN angles E\angles angles 0xE98B 6 3F angle, s inside & EA02 29A3 uni29A3 4X55 DX9A 0DN angupl Q\revangle angupl angle, up and left % EA03 EE73 stixEE73 0DO N arcdeg p\arcdeg arcdeg arc-degrees (degree with dot below) % EA04 EE74 stixEE74 0DO N arcmin p\arcmin arcmin \farcmin arc-minutes (prime with dot below) % EA06 EE75 stixEE75 0DO N arcsec p\arcsec arcsec \farcsec arc-seconds (double prime with dot below) & EA07 2943 uni2943 1X3D BX4F 0DS R arrllsr H\leftarrowshortrightarrow arrllsr a121 left arrow over short right arrow & EA08 2051 uni2051 7X13 AX20 0DN N Ast Q\textAsterisks Ast two asterisks, aligned vertically % EA09 0319 uni0319 0dN T\textretracting backmod back modifier (cf. 0319) % EA0A EE11 stixEE11 0DN p\barog barog barred open gee % EA0B uni00730336 1DN Q\sbar bars barred ess % EA0C EE76 stixEE76 0DN N bcomlink Q\bcomlink bcommlink boxed communication link P EA0D 1D85 uni1D85 0DN A Q\textpalhookl bhookl bottom hooked ell % EA10 uni03040304 2DD Q\doublemacron blmac 5 25 double macron & EA11 29F3 uni29F3 7X4A DXFE 0DN N cirferr Q\errbarblackcircle ccirerr error-barred filled circle & EA12 29F1 uni29F1 7X48 DXFC 0DN N diamerrf Q\errbarblackdiamond cdiaerr error-barred filled diamond / EA13 uni229CFE00 5X06 2DO oHbar Q\varcircledequal cir2barh two horizontal bars in circle & EA15 29BD uni29BD 5X0F DXB7 0DN oxuarr Q\uparrowoncircle cirarrup circle with up arrow through it & EA16 29EC uni29EC 7X43 DXF7 0DN N cirdarr Q\circledownarrow cirdar circle with down arrow & EA17 29ED uni29ED 7X44 DXF8 0DN N cirfdarr Q\blackcircledownarrow cirfdar filled circle with down arrow & EA19 29BA uni29BA 5X0C DXB4 0DN M\obot cirtdiv circle, horizontal bar, top divided by vertical & EA1A 2050 uni2050 5X4F DXE5 0DS R closur H\closure closure r208 top arc over bottom arc % EA1B EE77 stixEE77 0DN N comlink Q\comlink commlink communication link & EA1C 29EF uni29EF 7X46 DXFA 0DN N squferr Q\errbarblacksquare csqrerr error-barred filled square % EA1D uni03020302 7X02 2DD D Q\textdoublecircum d2circ double circumflex % EA1E uni03310331 2DD D 2lowbar Q\textdoublesubbar d2lowbar double underbar EA1F 034C uni034C 7X03 2DD D Q\textdoubletilde d2tilde double tilde % EA20 uni033103310331 7X08 2DD D Q\texttriplesubbar d3lowbar triple underbar % EA21 uni0331033103310331 7X09 2DD D Q\textquadsubbar d4lowbar quadruple underbar % EA22 25A0 uni25A0 7X39 0 N N Q\mdlgblksquare Density large closed square # EA25 223C uni223C 0DS R H\difference differ r144 difference (looks like similar, 223C?) % EA26 EE21 stixEE21 0DD p\dloang dloang left overangle (combining) % EA27 EE22 stixEE22 0DD p\dluang dluang left underangle (combining) & EA28 29EA uni29EA 7X3F DXF3 0DN N diamdarr Q\blackdiamonddownarrow dmdfar filled diamond with down arrow & EA29 2908 uni2908 1X09 BX14 0DS R darrln H\downarrowbarred dnarln a118 down arrow with bar % EA2A EE72 stixEE72 0DN N donut Q\donut dnut donut % EA2B uni03070302 7X04 2DD D p\dotcaret dotcaret accent caret over dot % EA2C EE78 stixEE78 0DO N dotday p\dotday dotday \fd days (roman d with dot below) % EA2D EE79 stixEE79 0DO N dothour p\dothour dothour \fh hours (roman h with dot below) % EA2E EE7A stixEE7A 0DO N dotmin p\dotmin dotmin \fm minutes (roman m with dot below) % EA2F EE7B stixEE7B 0DO N dotper p\dotper dotper \fp period (roman p with dot below) % EA30 EE7C stixEE7C 0DO N dotsec p\dotsec dotsec \fs seconds (roman s with dot below) % EA31 EE7D stixEE7D 0DO N dotyear p\dotyear dotyear years (roman y with dot below) % EA32 EE23 stixEE23 0DD p\druang druang right underangle (combining) % EA33 uni03040303 7X06 2DD D Q\texttildemacron dtilbar 5 21 tilde over bar over % EA34 uni03310330 7X0A 2DD D Q\textsubbartilde dubartil straight over wavy underline % EA35 uni03040308 7X05 2DD D Q\textumlautmacron dumlbar 5 4A double dot over bar over % EA36 uni03300331 7X0B 2DD D Q\textsubtildebar dutilbar wavy over straight underline % EA37 EE7E stixEE7E 0DN N eclip p\eclip eclip eclipse P EA38 1D81 uni1D81 0DN A Q\textlhookd hookd hooked d % EA39 uni00680321 1DN A Q\textlhookh hookh hooked h P EA3A 1D84 uni1D84 0DN A Q\textlhookk hookk hooked k P EA3B 1D8D uni1D8D 0DN A Q\textlhookx hookx hooked x & EA3C 2142 uni2142 6X14 AX07 0DN N Q\sansLmirrored isfL turned sans serif capital L & EA3D 29E0 uni29E0 5X49 DXDF 0DN N dalembrt p\laplac laplac D'Alembertian (square with contoured outline) & EA3E 293E uni293E 1X37 BX4A 0DS R H\cwundercurvearrow larrcurb a135 2 7C left undercurving arrow & EA3F 29D1 uni29D1 5X30 DXCF 0DS R lfbowtie H\lfbowtie lfbowtie r209 left filled bowtie & EA40 29D4 uni29D4 5X33 DXD2 0DS R lftimes H\lftimes lfilledx left filled x (cf. 22C9) P EA41 1D8A uni1D8A 0DN A Q\textlhooks lhooks left hooked s P EA42 1D8E uni1D8E 0DN A Q\textlhookz lhookz left hooked z & EA43 2983 uni2983 4X19 DX6B 0DF O locub Q\lBrace lopcub 3 6E left white brace & EA44 2922 uni2922 1X1F BX2E 0DS R neswsarr H\neswarrow nearr2 a084 0xEB05 NE-SW arrow & EA45 2921 uni2921 1X1E BX2D 0DS R nwsesarr H\nwsearrow nwarr2 a083 0xEB06 NW-SE arrow & EA46 29F2 uni29F2 7X49 DXFD 0DN N cirerr Q\errbarcircle ocirerr error-barred white circle & EA47 29F0 uni29F0 7X47 DXFB 0DN N diamerr Q\errbardiamond odiaerr error-barred white diamond & EA48 29EE uni29EE 7X45 DXF9 0DN N squerr Q\errbarsquare osqrerr error-barred white square & EA4A 29D6 uni29D6 EE5D 5X35 DXD4 0DN hrglass Q\hourglass plushr hourglass plus (white) = EA4B 2034 uni2034.notsup 0 O N Q\trprime prime3 triple prime (not superscripted) & EA4C 21F6 uni21F6 1X01 BX01 0DS R rarr3 H\rightthreearrows rarr3 a158 three right arrows & EA4D 293B uni293B 1X38 BX47 0DS R H\acwunderarcarrow rarrcurb a136 0xEB09 5 4E right undercurving arrow & EA4E 29D2 uni29D2 5X31 DXD0 0DS R rfbowtie H\rfbowtie rfbowtie r210 right filled bowtie & EA4F 29D5 uni29D5 5X34 DXD3 0DS R rftimes H\rftimes rfx right filled x (cf. 22CA) & EA50 2984 uni2984 4X1A DX6C 0DF C rocub Q\rBrace ropcub 3 6D right white brace & EA51 2143 uni2143 6X15 AX08 0DN N Q\sansLinverted rsfL reversed sans serif capital L % EA52 D5AB u1D5AB 6X13 0 N N Q\sansL sfL sans serif capital L % EA53 EE42 stixEE42 0DN N sqrt2 Q\sqrtii sqrt2 square root of 2 % EA54 EE43 stixEE43 0DN N sqrt3 Q\sqrtiii sqrt3 square root of 3 & EA55 EE2F stixEE2F 7X37 DXEC 0DN N xsqu Q\lgwhtsquare squarelg 6 75 large white square & EA56 EE0F stixEE0F 7X38 DXED 0DN N xsquf Q\lgblksquare squflg large filled square & EA57 2A0B uni2A0B 2X2A CX23 0DL L sumint Q\sumint sumint summation with integral # EA57 2A0B uni2A0B.lgdisplay 2X2A CX23 0DL L sumint Q\sumint sumint SUMMATION WITH INTEGRAL # EA57 2A0B uni2A0B.small 2X2A CX23 0DL L sumint Q\sumint sumint SUMMATION WITH INTEGRAL # EA57 2A0B uni2A0B.up 2X2A CX23 0DL L sumint Q\sumint sumint SUMMATION WITH INTEGRAL # EA57 2A0B uni2A0B.uplgdisplay 2X2A CX23 0DL L sumint Q\sumint sumint SUMMATION WITH INTEGRAL # EA57 2A0B uni2A0B.upsmall 2X2A CX23 0DL L sumint Q\sumint sumint SUMMATION WITH INTEGRAL & EA58 20E8 uni20E8 7X07 AX16 0DD D Q\threeunderdot tdundot triple underdot & EA59 297A uni297A 1X79 BX87 0DS R H\leftarrowsubset transub a151 left arrow through subset & EA5A 2A28 uni2A28 2X46 CX40 0DS B plustrif E\plustrif trifplus filled triangle with plus & EA5B 29CC uni29CC 5X22 DXC6 0DN triS Q\triangles tS S in triangle & EA5C 2909 uni2909 1X0A BX15 0DS R uarrln H\uparrowbarred uparln a117 up arrow with bar % EA5D EE7F stixEE7F 0DN N Uranus W\uranus Uranus Uranus & EA5E 2144 uni2144 6X17 AX09 0DN N S\Yup yinvert inverted sans serif Y & EA5F 29C8 uni29C8 5X1A DXC2 0DS B squb S\boxbox dbox \boxbox box within box & EA60 27D0 uni27D0 7X3E DXF2 0DN N diamdot Q\diamondcdot diadot white diamond with centered dot & EA61 29D3 uni29D3 5X32 DXD1 0DS R fbowtie H\fbowtie fbowtie r211 filled bowtie & EA62 29D7 uni29D7 5X36 DXD5 0DN fhrglass Q\blackhourglass fplushr filled hourglass % EA63 0318 uni0318 0DN T\textadvancing frntmod front modifier (cf. 0318) & EA64 2977 uni2977 1X76 BX84 0DS R H\leftarrowless tranless a155 left arrow through less than / EA65 2278 uni227620D2 EBB4 1 S R ntvlg Q\nvlessgtr n028 not, vert, less, greater / EA66 2279 uni227720D2 EBB3 1 S R ntvgl Q\nvgtrless n029 not, vert, greater, less & EAA0 2987 uni2987 DX6F 0DF O S\llparenthesis xx6B Z NOTATION LEFT IMAGE BRACKET & EAA1 2988 uni2988 DX70 0DF C S\rrparenthesis xx6D Z NOTATION RIGHT IMAGE BRACKET & EAA2 2989 uni2989 DX71 0DF O Q\llangle xx3C Z NOTATION LEFT BINDING BRACKET & EAA3 298A uni298A DX72 0DF C Q\rrangle xx3E Z NOTATION RIGHT BINDING BRACKET & EAA4 2982 uni2982 DX6A 0DF F Q\typecolon xx2D Z NOTATION TYPE COLON & EAA5 2A3E uni2A3E CX5A 0DS B Z\fcmp xx2C Z NOTATION RELATIONAL COMPOSITION & EAA6 2A1F uni2A1F CX37 0DN L Z\zcmp xx3B Z NOTATION SCHEMA COMPOSITION & EAA7 2A20 uni2A20 CX38 0DN L Z\zpipe xx39 Z NOTATION SCHEMA PIPING * EAA8 2040 uni2040 CX5B 0DS B Q\tieconcat xx5E Z NOTATION SEQUENCE CONCATENATION & EAA9 2A21 uni2A21 CX39 0DN L Z\zproject xx3D Z NOTATION SCHEMA PROJECTION & EAAA 2A64 uni2A64 CX85 0DS B Z\dsub 0xE964 xx6F Z NOTATION DOMAIN ANTIRESTRICTION & EAAB 2A65 uni2A65 CX86 0DS B Z\rsub 0xE965 xx7F Z NOTATION RANGE ANTIRESTRICTION & EAAC 22FF uni22FF CX17 0DS R Q\bagmember xx0A Z NOTATION BAG MEMBERSHIP & EAAD 2A41 uni2A41 CX5E 0DS B Q\uminus xx0D Z NOTATION BAG SUBTRACTION & EAAE 20E6 uni20E6 AX0F 0 D D Q\textoverlaydoublevert combining double vertical stroke - Z finite function W EB00 2B23 uni2B23 0dN N hhexagf Q\hexagonblack hexagfs horizontal filled hexagon [hexagon flat solid] W EB02 2B22 uni2B22 0dN N hexagf Q\varhexagonblack hexags filled hexagon [hexagon solid] & EB03 29E7 uni29E7 7X25 DXE6 0DN N thermod E\thermod thermod thermodynamic (vertical bar crossed by two horizontals) W EB04 26B2 uni26B2 0DN N neuter Q\neuter cirmid tmpneuter neuter (circle with short vertical below) & EB05 29E8 uni29E8 7X30 DXE7 0DN N dtrilf Q\downtriangleleftblack tridls ACS: tridls -- down-pointing triangle with left half black & EB06 29E9 uni29E9 7X31 DXE8 0DN N dtrirf Q\downtrianglerightblack tridrs ACS: tridrs -- down-pointing triangle with right half black & EC00 2A3D uni2A3D 2X59 CX57 0DS B iprodr ISOAMSB A\intprodr righthand interior product / EC01 2A3C uni2A3CFE00 4X04 DX5F 0DS B viprod be5 A\varintprod r248 interior product, variant + EC01 E5AC uni2A3CFE00 4X04 DX5F 0fS R ldashv be5 A\varintprod r248 vert, low bar to left from base / EC02 2A3D uni2A3DFE00 4X05 DX60 0DS B viprodr bd5 A\varintprodr r247 righthand interior product, variant + EC02 E5A5 uni2A3DFE00 4X05 DX60 0fS R vldash bd5 A\varintprodr r247 vert, low bar to right from base = EC03 0302 uni0302 23BA 0DW D wdhat P\widehat d14 dbgcaret \widehat hat accent (multiple characters and non-spacing) = EC04 030C uni030C 0DW D wdcheck M\widecheck check accent (multiple characters and non-spacing) = EC05 0330 uni0330 0DW D wdutilde Q\wideutilde \wideundertilde under tilde accent (multiple characters and non-spacing) & EC06 20E7 uni20E7 7X0C AX10 0DF D actuary Q\annuity annuity symbol, actuarial bend & EC07 29E2 uni29E2 5X4B DXE1 0DN shuffle Q\shuffle shuffle product & EC08 290A uni290A 1X0B BX16 0DS R uAarr H\Uuparrow a060 up triple arrow & EC09 290B uni290B 1X0C BX17 0DS R dAarr H\Ddownarrow a062 down triple arrow & EC0A 2140 uni2140 6X29 AX0D 0DL L opfsum Q\Bbbsum open-face sum & EC0B 2A1B uni2A1B 2X3A CX33 0DL L upint Q\upint upper integral (bar on top) & EC0C 2A1C uni2A1C 2X3B CX34 0DL L lowint Q\lowint lower integral (bar on bottom) & EC0D 2A1D uni2A1D 2X3C CX35 0DL L Join W\Join join (large bowtie, relational database theory) & EC0E 2A1E uni2A1E 2X3D CX36 0DL L xltri W\bigtriangleleft large (operator) left triangle (relational database theory) & ED00 292B uni292B 1X28 BX37 0DN rdiofdi H\rdiagovfdiag a098 rising diagonal over falling diagonal & ED01 292C uni292C 1X29 BX38 0DN fdiordi H\fdiagovrdiag a097 falling diagonal over rising diagonal & ED02 292D uni292D 1X2A BX39 0DN seonearr H\seovnearrow a091 SE arrow over NE arrow & ED03 292E uni292E 1X2B BX3A 0DN neosearr H\neovsearrow a092 NE arrow over SE arrow & ED04 292F uni292F 1X2C BX3B 0DN fdonearr H\fdiagovnearrow a095 falling diagonal over NE arrow & ED05 2930 uni2930 1X2D BX3C 0DN rdosearr H\rdiagovsearrow a096 rising diagonal over SE arrow & ED06 2931 uni2931 1X2E BX3D 0DN neonwarr H\neovnwarrow a093 NE arrow over NW arrow & ED07 2932 uni2932 1X2F BX3E 0DN nwonearr H\nwovnearrow a094 NW arrow over NE arrow & ED08 294C uni294C 1X48 BX59 0DS R urdlshar H\updownharpoonrightleft h038 up-right-down-left harpoon & ED09 294D uni294D 1X49 BX5A 0DS R uldrshar H\updownharpoonleftright h039 up-left-down-right harpoon & ED0A 21F7 uni21F7 BX02 0DS R nvlarr H\nvleftarrow LEFTWARDS ARROW WITH VERTICAL STROKE & ED0B 21F8 uni21F8 BX03 0DS R nvrarr H\nvrightarrow xx21 RIGHTWARDS ARROW WITH VERTICAL STROKE & ED0C 21FA uni21FA BX05 0 S R Q\nVleftarrow leftwards arrow with double vertical stroke & ED0E 21FB uni21FB BX06 0DS R Q\nVrightarrow xx22 Z NOTATION FINITE FUNCTION & ED0F 21FC uni21FC BX07 0DS R Q\nVleftrightarrow xx12 Z NOTATION FINITE RELATION & ED10 2900 uni2900 BX0C 0DS R Q\nvtwoheadrightarrow xx24 Z NOTATION PARTIAL SURJECTION & ED11 2901 uni2901 BX0D 0DS R Q\nVtwoheadrightarrow xx25 Z NOTATION FINITE SURJECTION & ED12 2914 uni2914 BX20 0DS R Q\nvrightarrowtail 0xEB18 xx31 Z NOTATION PARTIAL INJECTION & ED13 2915 uni2915 BX21 0DS R Q\nVrightarrowtail xx32 Z NOTATION FINITE INJECTION & ED14 2917 uni2917 BX23 0DS R Q\nvtwoheadrightarrowtail xx34 Z NOTATION SURJECTIVE INJECTION & ED15 2918 uni2918 BX24 0DS R Q\nVtwoheadrightarrowtail xx35 Z NOTATION FINITE SURJECTIVE INJECTION & ED20 293F uni293F BX4B 0 S Q\ccwundercurvearrow 2 5C anticlockwise undercurving arrow & ED21 293A uni293A BX46 0 S Q\acwoverarcarrow 0xEB08 5 4D top arc anticlockwise arrow = ED30 E370 uni220A20D2 1 S R Q\nvsmallin 5 B9 small not (vert) member = ED31 E36C uni220D20D2 1 S R Q\nvsmallni 5 D2 small not (vert) contains / ED32 uni22F60338 2 R R Q\nvarisinobar 5 DE not equal to or member / ED33 uni22FD0338 2 R R Q\nvarniobar 5 DF not equal to or contains / ED34 uni22F620D2 2 R R Q\nvvarisinobar 0xEA12 5 B0 not (vert) equals or member / ED35 uni22FD20D2 2 R R Q\nvvarniobar 0xEA0A 5 A4 not (vert) equals or contains / ED40 uni2295FE00 1 S B Q\oplusrim 6 21 circled plus (with rim) / ED41 uni2297FE00 1 S B Q\otimesrim 6 23 circled times (with rim) & ED42 2A2C uni2A2C CX44 0 S Q\minusrdots 0xE91A 6 32 rising dots minus & ED43 2A2B uni2A2B CX43 0 S Q\minusfdots 0xE919 6 33 falling dots minus & ED44 2A62 uni2A62 CX83 0 S B Q\doublebarvee 0xE900 5 2D logical or double overbar & ED45 2A60 uni2A60 CX81 0 S B Q\wedgedoublebar 5 3D logical and double underbar & ED50 2A6B uni2A6B CX94 0 S R Q\simrdots 0xE925 5 6B [not 223B] rising dots similar / ED51 uni224320D2 2 R R Q\nvsimeq 3 B3 not (vert) similar or equal / ED52 uni224520D2 2 R R Q\nvcong 3 D6 not (vert) similar over two-line equals & ED53 2A6C uni2A6C CX97 0 S R Q\simminussim 0xE91F 5 68 similar minus similar / ED54 uni2A6C0338 1 S R Q\nsimminussim 0xEA1F 5 EE not (slash) similar minus similar / ED55 uni2A6C20D2 1 S R Q\nvsimminussim 0xEA14 5 B5 not (vert) similar minus similar / ED56 uni2A7020D2 1 S R Q\nvapproxeqq 3 BE not (vert) double similar over two-line equals / ED57 uni224D20D2 1 S R Q\nvasymp 5 D4 not (vert) asymptotically equal to % ED58 uni223F.reversed 1 N Q\revsinewave 0xE9A0 5 5A reverse sine wave / ED59 uni003D20D2 2 R R Q\nveq 1 B0 not (vert) equals & ED5A 2A67 uni2A67 CX8B 0 R R Q\dotequiv 0xE92C identical with dot / ED5B uni226120D2 2 R R Q\nvequiv 3 C9 not (vert) three-line equals / ED5C uni22630338 1 S R Q\nEquiv 0xEA63 3 B8 not (slash) four-line equals (not strictly equivalent to) / ED5D uni226320D2 1 S R Q\nvEquiv 3 B9 not (vert) four-line equals & ED5E 2A76 uni2A76 CXAB 1 S R Q\eqeqeq 0xE94C three consecutive equal signs / ED60 2270 uni2A7D20D2 2 R R Q\nvleqslant 1 B5 not (vert) less-than slanted equal / ED61 2271 uni2A7E20D2 2 R R Q\nvgeqslant 1 D6 not (vert) greater-than slanted equal / ED62 uni226620D2 2 R R Q\nvleqq 0xEA1D 1 A2 not (vert) less-than or two-line equal / ED63 uni226720D2 2 R R Q\nvgeqq 0xEA1E 1 A4 not (vert) greater-than or two-line equal / ED64 uni2A950338 2 R R Q\neqslantless 0xEA10 5 E4 not (slash) equal (slant) or less-than / ED65 uni2A960338 2 R R Q\neqslantgtr 0xEA0E 5 E5 not (slash) equal (slant) or greater-than / ED66 uni2A9520D2 2 R R Q\nveqslantless 5 AB not (vert) equals (slant) or less-than / ED67 uni2A9620D2 2 R R Q\nveqslantgtr 5 A8 not (vert) equals (slant) or greater-than & ED68 2A99 uni2A99 CXE6 0 S R Q\eqqless 0xE909 5 74 two-line equals or less-than & ED69 2A9A uni2A9A CXE7 0 S R Q\eqqgtr 0xE913 5 79 two-line equals or greater-than & ED6A 2A9B uni2A9B CXE8 0DS R Q\eqqslantless two-line equals (slant) or less-than & ED6B 2A9C uni2A9C CXE9 0DS R Q\eqqslantgtr 0xE908 two-line equals (slant) or greater-than / ED6C uni2A990338 1 S R Q\neqqless 5 E6 not (slash) two-line equal or less-than / ED6D uni2A9A0338 1 S R Q\neqqgtr 5 E7 not (slash) two-line equal or greater-than / ED6E uni2A9920D2 1 S R Q\nveqqless 0xEA09 5 A0 not (vert) two-line equals or less-than / ED6F uni2A9A20D2 1 S R Q\nveqqgtr 0xEA13 5 B4 not (vert) two-line equals or greater-than / ED70 2272 uni2272FE00 1 S R Q\varlesssim 1 28 less-than or (contour) similar / ED71 2273 uni2273FE00 1 S R Q\vargtrsim 1 29 greater-than or (contour) similar / ED72 2A9D uni2A9DFE00 1 S R Q\varsimless 5 6F similar (conforming) or less-than / ED73 2A9E uni2A9EFE00 1 S R Q\varsimgtr 5 70 similar (conforming) or greater-than & ED74 2AB1 uni2AB1 DX11 0 S R Q\precneq 0xEA3C precedes, not single-line equals & ED75 2AB2 uni2AB2 DX12 0 S R Q\succneq 0xEA3D succeeds, not single-line equals / ED76 uni227A20D2 1 S R Q\nvprec 5 8C not (vert) precedes / ED77 uni227B20D2 1 S R Q\nvsucc 5 A7 not (vert) succeeds / ED78 uni227C20D2 1 S R Q\nvpreccurlyeq 5 B6 not (vert) precedes or contour equals / ED79 uni227D20D2 1 S R Q\nvsucccurlyeq 5 C4 not (vert) succeeds or contour equals / ED7A uni22DE20D2 1 S R Q\nvcurlyeqprec 0xEA3E not (vert) equals (contour) or precedes / ED7B uni22DF20D2 1 S R Q\nvcurlyeqsucc 0xEA3F not (vert) equals (contour) or succeeds / ED7C uni22DE0338 1 S R Q\ncurlyeqprec not (slash) equals (contour) or precedes / ED7D uni22DF0338 1 S R Q\ncurlyeqsucc not (slash) equals (contour) or succeeds & ED80 2AC9 uni2AC9 DX37 0 S R Q\subsetapprox 0xE958 subset approx & ED81 2ACA uni2ACA DX38 0 S R Q\supsetapprox 0xE957 superset approx / ED82 2288 uni2AC520D2 1 S R nvsubE Q\nvsubseteqq 5 A6 not (vert) subset or two-line equals / ED83 2289 uni2AC620D2 1 S R nvsupE Q\nvsupseteqq 5 A5 not (vert) superset or two-line equals & ED84 2A59 uni2A59 CX7A 0 S R Q\veeonwedge 0xE96F logical or logical and overlay & ED85 2A4E uni2A4E CX6D 0 S B Q\Sqcap 0xE921 double square cap & ED86 2A4F uni2A4F CX6E 0 S B Q\Sqcup 0xE920 double square cup & ED87 2ACD uni2ACD DX45 0 S R Q\lsqhook 0xE92A 5 71 square left open box operator & ED88 2ACE uni2ACE DX46 0 S R Q\rsqhook 0xE92B 5 77 square right open box operator & ED90 2AE0 uni2AE0 DX58 0 S R Q\shortuptack 6 3E short up tack & ED91 2ADE uni2ADE DX56 0 S R Q\shortlefttack 0xE94A 6 A2 short left tack & ED92 2ADF uni2ADF DX57 0 S R Q\shortdowntack 6 AA short down tack & ED93 2AE5 uni2AE5 DX5D 0 S R Q\DashV 0xE97D double left turnstile double vertical bar \DashV & ED94 2AE1 uni2AE1 DX59 0 N Q\perps 0xE98A 6 22 perpendicular s & ED95 299B uni299B DX92 0 N Q\measuredangleleft 0xE98D 6 7D measured angle opening left & ED96 29A0 uni29A0 4X2A DX97 0FN gtlpar bi9 p\gtlpar lpargt arcr r213 0xE98C 6 7C spherical angle opening left & ED97 29A1 uni29A1 DX98 0 N Q\sphericalangleup 0xE980 5 E9 spherical angle opening up / ED98 uni2AF40338 1 S B Q\ninterleave 0xEA30 triple vertical, slash cancellation & ED99 2AF5 uni2AF5 DX8D 0 S B Q\nhVvert 0xE993 3 5D triple vertical, horizontal cancellation & ED9A 2A68 uni2A68 CX8D 0 S Q\equivVert 0xE991 3 22 double vertical on triple horizontal rules (identical and parallel to) & ED9B 2A69 uni2A69 CX8E 0 S Q\equivVvert 0xE995 3 7D three vertical superimposed on three horizontal rules ED9C 2AF7 uni2AF7 0 S Q\lllnest triple nested less than ED9D 2AF8 uni2AF8 0 S Q\gggnest triple nested greater than & ED9E 2A0A uni2A0A CX22 0DL Q\modtwosum modulo 2 summation (from Berdnikov EuroTeX'99 paper) # ED9E 2A0A uni2A0A.lgdisplay CX22 0DL Q\modtwosum MODULO TWO SUM & ED9F 213E uni213E AX0B 0DN N opfGam Q\BbbGamma open-face capital Gamma % EDF0 EE82 stixEE82 0 N Q\dashedslash 0xE986 2 A3 dashed solidus % EDF1 EE83 stixEE83 0 N Q\dashedbackslash 0xE986 2 A2 dashed backslash % EDF2 EE84 stixEE84 0 F Q\rparenobar 3 71 right parenthesis with overbar % EDF3 2208 uni2208.narrow EF4A 0 S Q\varin 4 7B narrow member sign % EDF4 220B uni220B.narrow EF4C 0 S Q\varni 4 7D narrow contains sign % EDF5 EE85 stixEE85 0 N Q\narrowtriangledown 5 A3 narrow down-triangle % EDF6 u1D6FB.narrow 1 N Q\narrowitnabla 5 BB narrow sloped nabla % EDF7 uni002820090029 1 N Q\spaceinparens 0xE9A2 5 BC parentheses around thin space % EDF8 uni002822C50029 1 N Q\cdotinparens 0xE9A1 5 5B center dot in parentheses % EE00 213C uni213C 0dZ N opfpi Q\Bbbpi DoubledPi DOUBLE-STRUCK SMALL PI + EE00 F749 uni213C 0dZ N opfpi Q\Bbbpi DoubledPi pi - 3.14159265358979... B EE01 20EB uni20EB 0dN Q\textoverlaytwosolidus COMBINING LONG DOUBLE SOLIDUS OVERLAY + EE01 G0F5 uni20EB 0dN Q\textoverlaytwosolidus double slash to be combined with existing symbols to form double-slashed version / EE02 G0F6 u1D433_uni20EB 1dZ Q\dblslasheditA capital A italic double-slashed / EE03 G0F7 u1D438_uni20EB 1dZ Q\dblslasheditE capital E italic double-slashed / EE04 G0F8 u1D439_uni20EB 1dZ Q\dblslasheditF capital F italic double-slashed EE05 25FD uni25FD 0dN Q\mdsmwhtsquare Square medium empty square EE06 25AB uni25AB 7X3A DXEE 0dN N Q\smwhtsquare \subsquare EmptySmallSquare empty small square EE07 25AA uni25AA 7X3B DXEF 0dN N Q\smblksquare FilledSmallSquare filled small square W EE08 20EC uni20EC 0dD Q\overrightharpoondown over right harpoon down W EE09 20ED uni20ED 0dD Q\overleftharpoondown over left harpoon down W EE0A 20EE uni20EE 0dD Q\underleftarrow under left arrow W EE0B 20EF uni20EF 0dD Q\underrightarrow under right arrow W EE0C 27C7 uni27C7 DB32 0 S B ordot Q\veedot LOGICAL OR WITH DOT INSIDE EE0D stixEE0D EBC9 7X19 1DN rdiag A\diagup a086 rising diagonal EE0E stixEE0E EBCA 7X18 1DN fdiag A\diagdown a085 falling diagonal & EE0F EA56 stixEE0F 7X38 DXED 1DN N xsquf Q\lgblksquare squflg large filled square % EE10 E624 stixEE10 2fO N buc Q\Cbar capital C with stroke % EE11 EA0A stixEE11 1dN p\barog barog barred open gee % EE12 E642 stixEE12 1fZ A pih T\textheng heng (phonetic symbol) % EE13 E64B stixEE13 E27B 1fZ A plr T\textlhtlongi Latin letter small r-fishhook, reversed, with descender stem % EE14 E62D stixEE14 1fZ pa8 T\texthooktop hooktop (phonetic symbol) % EE15 E630 stixEE15 1fZ pb8 Q\textcurlytail curly tail (phonetic symbol) W EE16 035C uni035C E235 0fZ pt2 Q\texttieunderarc inferior ligature (non-spacing) % EE17 E6A0 stixEE17 0 Q\Pollslash slash for Polish L % EE18 E632 stixEE18 E296 1fZ pc6 Q\tonebarlevelrise modifier letter level-rise contour tone bar % EE19 E633 stixEE19 E29B 1fZ pc7 Q\tonebarhighrise modifier letter high-rise tone bar % EE1A E634 stixEE1A E239 1fZ pd3 T\textretractingvar retracted (in-line diacritic) % EE1B E635 stixEE1B E297 1fZ pd6 Q\tonebarfalllevel modifier letter fall-level contour tone bar % EE1C E636 stixEE1C E29C 1fZ pd7 Q\tonebarlowrise modifier letter low-rise tone bar % EE1D E638 stixEE1D E298 1fZ pe6 Q\tonebarfallrisefall modifier letter fall-rise-fall contour tone bar % EE1E E639 stixEE1E E29D? 1fZ pe7 Q\tonebarrisefall modifier letter rise-fall tone bar % EE1F E640 stixEE1F E299 1fZ A pi7 Q\tonebarrise modifier letter rise tone bar % EE20 E644 stixEE20 E29A 1fZ pj7 Q\tonebarfall modifier letter fall tone bar % EE21 EA26 stixEE21 2dD p\dloang dloang left overangle (combining) % EE22 EA27 stixEE22 2dD p\dluang dluang left underangle (combining) % EE23 EA32 stixEE23 2dD p\druang druang right underangle (combining) % EE24 E3B2 stixEE24 F027 4dA A fjlig ISOPUB E\fjlig fjlig small fj ligature EE25 stixEE25 1 E P\lhook arrowhookleft EE26 stixEE26 1 E P\rhook arrowhookright EE27 stixEE27 1 E P\mapstochar maps-to relation tail EE28 stixEE28 1 E Q\sqrtextender radical symbol vertical extender EE29 stixEE29 1 E Q\sqrtulcorner radical symbol top corner piece EE2A stixEE2A 1 E P\braceld horizontal brace, down left piece EE2B stixEE2B 1 E P\bracerd horizontal brace, down right piece EE2C stixEE2C 1 E P\bracelu horizontal brace, upper left piece EE2D stixEE2D 1 E P\braceru horizontal brace, upper right piece EE2E stixEE2E 1 E A\centerdot bold center dot (very small filled square) & EE2F EA55 stixEE2F 7X37 DXEC 1DN N xsqu Q\lgwhtsquare squarelg 6 75 large white square EE30 2736 uni2736 7X42 DXF6 1dN N sext ISOPUB M\varstar sext SixPointedStar sextile (6-pointed star) W EE31 2B19 uni2B19 ____ 0dN N diamonfb ISOPUB Q\diamondbotblack diamfbtm diamond, filled bottom half W EE32 2B18 uni2B18 ____ 0dN N diamonft ISOPUB Q\diamondtopblack diamftop diamond, filled top half W EE33 2B14 uni2B14 ____ 0fN N squarftr ISOPUB bfp Q\squareurblack squftopr \semaphorer square, filled top right corner W EE34 2B15 uni2B15 ____ 0fN N squarfbl ISOPUB bfr Q\squarellblack squfbtml sqlls \semaphorel square, filled bottom left corner B EE35 E5B6 uni2B12 ____ 1fN N squarft ISOPUB bfv Q\squaretopblack sqts square, filled top half B EE36 E5B7 uni2B13 ____ 1fN N squarfb ISOPUB bfw Q\squarebotblack sqbs square, filled bottom half W EE37 2B16 uni2B16 ____ 0fN N diamonfl ISOPUB bgg Q\diamondleftblack diamond, filled left half W EE38 2B17 uni2B17 ____ 0fN N diamonfr ISOPUB bgh Q\diamondrightblack diamond, filled right half W EE39 23E2 uni23E2 DBB8 7X41 DXF5 0 N N trpezium ISOAMSO Q\trapezium trapezium W EE3A 2B20 uni2B20 DB2D 0fN N pentagon bo1 W\pentagon pentagon outline W EE3B 23E3 uni23E3 D8DC 0dN N benzenr ISOCHEM E\benzenr benzene ring, circle W EE3C 2B21 uni2B21 ____ 0dN N benzen ISOCHEM W\varhexagon hexago 0xE9A5 benzene ring [hexagon open] W EE3D 2B23 uni2B23 0dN N hhexagf Q\hexagonblack hexagfs horizontal filled hexagon [hexagon flat solid] W EE3E 2B22 uni2B22 0dN N hexagf Q\varhexagonblack hexags filled hexagon [hexagon solid] W EE40 27C8 uni27C8 DBF4 0dS R bsolhsub ISOAMSR H\bsolhsub r199 reverse solidus, subset W EE41 27C9 uni27C9 D95C 0dS R suphsol ISOAMSR H\suphsol r200 superset, solidus % EE42 EA53 stixEE42 1dN N sqrt2 Q\sqrtii sqrt2 square root of 2 % EE43 EA54 stixEE43 1dN N sqrt3 Q\sqrtiii sqrt3 square root of 3 W EE44 23E4 uni23E4 EE49 0 N N strns ISOTECH E\strns straightness W EE45 23E5 uni23E5 EE4A 0 N N fltns ISOTECH E\fltns flatness W EE46 23E6 uni23E6 DB3B 0 N N acd ISOTECH Q\accurrent ac current W EE47 23E7 uni23E7 DB4E 0 N N elinters ISOTECH E\elinters electrical intersection M EE48 stixEE48 1DS R Q\similarleftarrow similar, left arrow below M EE49 E2D2 uni2AEE.short 1FR R rnsmid Q\revnshortmid short mid negated by backslash M EE4A uni2A7320D2 1DR R Q\nveqqsim equals sign above tilde operator, vertical negation EE4B G032 stixEE4B 2 L I\shaw \shaw "shaw": large operator with three parallel vertical lines topped by a horizontal EE4C G033 stixEE4C 1 S Q\dashontimes \xdash times sign with dash through it EE4D G034 stixEE4D 1 S I\ffourier \ffourier lowercase italic f with horizontal bar touching its upper edge EE4E G035 stixEE4E 1 S I\fftourier \fftourier lowercase italic f with horizontal bar touching its upper edge and superscripted uppercase italic T % EE50 E5E7 stixEE50 1fN bn3 Q\chembondtwofallonerise 2 lines falling over 1 line rising % EE51 E5E8 stixEE51 1fN bn4 Q\chembondonefalltworise 1 line falling over 2 lines rising % EE52 E5E9 stixEE52 1fN bn5 Q\chembondtworiseonefall 2 lines rising over 1 line falling % EE53 E5EA stixEE53 1fN bn6 Q\chembondonerisetwofall 1 line rising over 2 lines falling % EE54 E5F4 stixEE54 1fN bo3 Q\chembondHonedashonesolid dashed line over line % EE55 E5F6 stixEE55 1fN bo5 Q\chembondHonedashtwosolid dashed line over two lines % EE56 E5F7 stixEE56 1fN bo6 Q\chembondHtwosolidonedash two lines over dashed line % EE57 E5F8 stixEE57 1fN bo7 Q\chembondHonemed sngbnd single line, medium length % EE58 E5F9 stixEE58 1fN bo8 Q\chembondHonedotsonesolid dotted (3 dots) line over line # EE59 E5FB stixEE59 1fN boq Q\chembondHtwolong dblbnd dbd two long horizontal lines # EE5A E5FC stixEE5A 1fN bor Q\chembondHthreelong trpbnd three long horizontal lines # EE5B E5FD stixEE5B 1fN bos Q\chembondHfourlong four long horizontal lines % EE5C E605 stixEE5C 1fN bpq Q\chembondHtwomed two medium horizontal lines % EE5D E606 stixEE5D 1fN bpr Q\chembondHthreemed three medium horizontal lines % EE5E E607 stixEE5E 1fN bps Q\chembondHfourmed four medium horizontal lines % EE5F E608 stixEE5F 1fN bpt Q\chembondoneriseoneHonefall rising line, horizontal line, falling line % EE60 E609 stixEE60 1fN bpu Q\chembondonefalloneHonerise falling line, horizontal line, rising line % EE61 E60A stixEE61 1fN bpv Q\chembondoneriseonefall rising line, falling line % EE62 E60B stixEE62 1fN bpw Q\chembondonefallonerise falling line, rising line EE63 G055 stixEE63 1 N benzenp ISOCHEM Q\varhexagonllbonds six carbon ring, corner down, double bonds lower left etc EE64 G056 stixEE64 1 N hbenzenp ISOCHEM Q\hexagonbottombonds six carbon ring, edge down, double bonds bottom edge etc EE65 G057 stixEE65 1 N hbenzeno ISOCHEM Q\hexagontopbonds six carbon ring, edge down, double bonds top edge etc EE66 stixEE66 1FN Q\chembondonelong single long chemical bond EE67 stixEE67 1FN bo4 Q\chembondlongonesolidonedash long chemical bond, line over dashed line & EE6E F529 stixEE6E 1DN N vssquf Q\vysmblksquare FilledVerySmallSquare filled very small square (ex 25FE) & EE6F F530 stixEE6F 1DN N vssqu Q\vysmwhtsquare EmptyVerySmallSquare empty very small square (ex 25FD) % EE70 E6A1 stixEE70 0 Q\pertenkzero per thousand zero (TeX Cork encoding, "18) % EE71 E6A2 uni2010 0 Q\texthyphen hyphen char (TeX Cork encoding, "7F; possibly equivalent to 00AD) % EE72 EA2A stixEE72 1dN N donut Q\donut dnut donut % EE73 EA03 stixEE73 2dO N arcdeg p\arcdeg arcdeg arc-degrees (degree with dot below) % EE74 EA04 stixEE74 2dO N arcmin p\arcmin arcmin \farcmin arc-minutes (prime with dot below) % EE75 EA06 stixEE75 2dO N arcsec p\arcsec arcsec \farcsec arc-seconds (double prime with dot below) % EE76 EA0C stixEE76 1dN N bcomlink Q\bcomlink bcommlink boxed communication link % EE77 EA1B stixEE77 1dN N comlink Q\comlink commlink communication link % EE78 EA2C stixEE78 2dO N dotday p\dotday dotday \fd days (roman d with dot below) % EE79 EA2D stixEE79 2dO N dothour p\dothour dothour \fh hours (roman h with dot below) % EE7A EA2E stixEE7A 2dO N dotmin p\dotmin dotmin \fm minutes (roman m with dot below) % EE7B EA2F stixEE7B 2dO N dotper p\dotper dotper \fp period (roman p with dot below) % EE7C EA30 stixEE7C 2dO N dotsec p\dotsec dotsec \fs seconds (roman s with dot below) % EE7D EA31 stixEE7D 2dO N dotyear p\dotyear dotyear years (roman y with dot below) % EE7E EA37 stixEE7E 1dN N eclip p\eclip eclip eclipse % EE7F EA5D stixEE7F 1dN N Uranus W\uranus Uranus Uranus W EE80 26A5 uni26A5 0fN N hmphdite bh8 V\Hermaphrodite hmphdite hermaphrodite W EE81 26B2 uni26B2 0dN N neuter Q\neuter cirmid tmpneuter neuter (circle with short vertical below) % EE82 EDF0 stixEE82 1 N Q\dashedslash 0xE986 2 A3 dashed solidus % EE83 EDF1 stixEE83 1 N Q\dashedbackslash 0xE986 2 A2 dashed backslash % EE84 EDF2 stixEE84 1 F Q\rparenobar 3 71 right parenthesis with overbar % EE85 EDF5 stixEE85 1 N Q\narrowtriangledown 5 A3 narrow down-triangle EE86 G037 stixEE86 1 S Q\precplus \precstar precedes sign followed by plus sign EE87 G038 stixEE87 2 D I\asteraccent \asteraccent asterisk accent EE88 G040 stixEE88 1 S Q\whiteplus outline plus sign EE89 G041 stixEE89 1 S Q\diamondwithrays diamond with lines from corners EE8A G042 stixEE8A 1 S Q\squarewithrays square with lines from corners EE8B G045 stixEE8B 1 S Q\exclameq equal with exclamation over EE8C G046 stixEE8C 1 S Q\fivevdots five vertical dots EE8D G048 stixEE8D 1 S Q\topbotwithbullet I-beam shape with bullet overprinted in middle EE8E G049 stixEE8E 1 S Q\pluswithbullet plus with bullet overprinted in middle % EE90 F3B2 stixEE90 7X22 AX2C 1dN N rblank Q\varvisiblespace RoundSpaceIndicator round space indicator EE91 F601 stixEE91 7X20 AX29 1dN Q\horizontalline HorizontalLine short horizontal line % EE92 F721 stixEE92 1dN N frksmily 9\FreakedSmiley FreakedSmiley freaked smiley % EE93 F722 stixEE93 1dN N neusmily 9\NeutralSmiley NeutralSmiley neutral smiley % EE94 F723 stixEE94 1dN N litebulb 9\LightBulb LightBulb light bulb X EE95 2B1A uni2B1A 0dN N Q\dottedsquare DottedSquare dotted outline square % EE96 25A9 uni25A9 0dN N Q\squarecrossfill GraySquare gray-filled square % EE97 F753 stixEE97 1dN N cirgray Q\graycircle GrayCircle gray-filled circle % EE98 F756 stixEE98 1 N 9\KernelIcon KernelIcon KernelIcon % EE99 F757 stixEE99 1 N 9\MathematicaIcon MathematicaIcon MathematicaIcon % EE9A F764 stixEE9A 1 N 9\AliasDelimiter AliasDelimiter 0xE94E AliasDelimiter % EE9B F767 stixEE9B 1dN 9\ErrorIndicator ErrorIndicator ErrorIndicator % EE9C F768 stixEE9C 1 N 9\AliasIndicator AliasIndicator AliasIndicator % EE9D F763 stixEE9D 1dN 9\ControlKey ControlKey ControlKey % EE9E F766 stixEE9E 1dN 9\ReturnKey ReturnKey ReturnKey % EE9F F769 stixEE9F 1dN 9\EscapeKey EscapeKey EscapeKey % EEA0 F76A stixEEA0 1dN 9\CommandKey CommandKey CommandKey % EEA1 F7BE stixEEA1 1dN 9\TabKey TabKey TabKey % EEA2 F7BF stixEEA2 1dN 9\SpaceKey SpaceKey SpaceKey % EEA3 F7D0 stixEEA3 1dN 9\DeleteKey DeleteKey DeleteKey % EEA4 F7D1 stixEEA4 1dN 9\AltKey AltKey AltKey % EEA5 F7D2 stixEEA5 1dN 9\OptionKey OptionKey OptionKey % EEA6 F7D3 stixEEA6 1 N 9\KeyBar KeyBar KeyBar % EEA7 F7D4 stixEEA7 1dN 9\EnterKey EnterKey EnterKey % EEA8 F7D5 stixEEA8 1dN 9\ShiftKey ShiftKey ShiftKey % EEA9 F7D6 stixEEA9 1dN Q\ModOneKey Mod1Key Mod1Key % EEAA F7D7 stixEEAA 1dN Q\ModTwoKey Mod2Key Mod2Key % EEAB F76B stixEEAB 1 N 9\LeftModified LeftModified LeftModified % EEAC F76C stixEEAC 1 N 9\RightModified RightModified RightModified EEB0 G13A stixEEB0 1dS Q\varrowextender extender for vertical solid (normal) arrow EEB1 G13B stixEEB1 1dS Q\harrowextender extender for horizontal solid (normal) arrow EEB2 G13C stixEEB2 1dS Q\nwsearrowextender extender for se/nw solid (normal) arrow EEB3 G13D stixEEB3 1dS Q\neswarrowextender extender for sw/ne solid (normal) arrow EEB4 G13E stixEEB4 1dS Q\Varrowextender extender for vertical double arrow EEB5 G13F stixEEB5 1dS Q\Harrowextender extender for horizontal double arrow EEB6 G140 stixEEB6 1dS Q\Nwsearrowextender extender for se/nw double arrow EEB7 G141 stixEEB7 1dS Q\Neswarrowextender extender for sw/ne double arrow EEB8 G116 stixEEB8 1dS Q\nedasharrow northeast arrow with dashed stem EEB9 G117 stixEEB9 1dS Q\sedasharrow southeast arrow with dashed stem EEBA G118 stixEEBA 1dS Q\nwdasharrow northwest arrow with dashed stem EEBB G119 stixEEBB 1dS Q\swdasharrow southwest arrow with dashed stem EEBC G11A stixEEBC 1dS Q\vdasharrowextender extender for vertical dashed arrow EEBD G11B stixEEBD 1dS Q\hdasharrowextender extender for horizontal dashed arrow EEBE G11C stixEEBE 1dS Q\nwsedasharrowextender extender for se/nw dashed arrow EEBF G11D stixEEBF 1dS Q\neswdasharrowextender extender for sw/ne dashed arrow EEC0 G11E stixEEC0 1dS Q\updotarrow up arrow with dotted stem EEC1 G11F stixEEC1 1dS Q\downdotarrow down arrow with dotted stem EEC2 G120 stixEEC2 1dS Q\leftdotarrow left arrow with dotted stem EEC3 G122 stixEEC3 1dS Q\nedotarrow northeast arrow with dotted stem EEC4 G123 stixEEC4 1dS Q\sedotarrow southeast arrow with dotted stem EEC5 G124 stixEEC5 1dS Q\nwdotarrow northwest arrow with dotted stem EEC6 G125 stixEEC6 1dS Q\swdotarrow southwest arrow with dotted stem EEC7 G126 stixEEC7 1dS Q\vdotarrowextender extender for vertical dotted arrow EEC8 G127 stixEEC8 1dS Q\hdotarrowextender extender for horizontal dotted arrow EEC9 G128 stixEEC9 1dS Q\nwsedotarrowextender extender for se/nw dotted arrow EECA G129 stixEECA 1dS Q\neswdotarrowextender extender for sw/ne dotted arrow EECB G12A stixEECB 1dS Q\updotdasharrow up arrow with dot-dash stem EECD G12B stixEECD 1dS Q\downdotdasharrow down arrow with dot-dash stem EECE G12C stixEECE 1dS Q\leftdotdasharrow left arrow with dot-dash stem EECF G12D stixEECF 1dS Q\rightdotdasharrow right arrow with dot-dash stem (E238) EED0 G12E stixEED0 1dS Q\nedotdasharrow northeast arrow with dot-dash stem EED1 G12F stixEED1 1dS Q\sedotdasharrow southeast arrow with dot-dash stem EED2 G130 stixEED2 1dS Q\nwdotdasharrow northwest arrow with dot-dash stem EED3 G131 stixEED3 1dS Q\swdotdasharrow southwest arrow with dot-dash stem EED4 G132 stixEED4 1dS Q\updotdasharrowextender extender for dot-dash up arrow EED5 G133 stixEED5 1dS Q\downdotdasharrowextender extender for dot-dash down arrow EED6 G134 stixEED6 1dS Q\leftdotdasharrowextender extender for dot-dash left arrow EED7 G135 stixEED7 1dS Q\rightdotdasharrowextender extender for dot-dash right arrow EED8 G136 stixEED8 1dS Q\nwdotdasharrowextender extender for nw dot-dash arrow EED9 G137 stixEED9 1dS Q\sedotdasharrowextender extender for se dot-dash arrow EEDA G138 stixEEDA 1dS Q\nedotdasharrowextender extender for ne dot-dash arrow EEDB G139 stixEEDB 1dS Q\swdotdasharrowextender extender for sw dot-dash arrow EEDC stixEEDC 1 S Q\htrarrowextender extender for triple horizontal arrow EEDD stixEEDD 1 S Q\vtrarrowextender extender for triple vertical arrow EEDE stixEEDE 1 S Q\hqdarrowextender extender for quadruple horizontal arrow EEDF stixEEDF 1 S Q\vqdarrowextender extender for quadruple vertical arrow EEE0 G00A stixEEE0 1 1 Q\overarrowHextender horizontal extender for multiple character over accent arrows, harpoons, line EEE1 G00B stixEEE1 1 1 Q\underarrowHextender horizontal extender for multiple character under accent arrows, harpoons, line EEE2 G010 stixEEE2 1 N Q\varsqrt radical with horizontal (for single character under the radical) EEE3 G012 stixEEE3 1 1 Q\overbracelend left end of extensible overbrace (CMEX10 x3A rotated 90deg) EEE4 G013 stixEEE4 1 1 Q\overbracerend right end of extensible overbrace (CMEX10 x38 rotated 90deg) EEE5 G014 stixEEE5 1 1 Q\underbracelend left end of extensible underbrace (CMEX10 x3B rotated 90deg) EEE6 G015 stixEEE6 1 1 Q\underbracerend right end of extensible underbrace (CMEX10 x39 rotated 90deg) EEE7 G016 stixEEE7 1 1 Q\hbraceextender extensible horizontal for curly over and under braces (CMEX10 x3E rotated 90deg) EEE8 G017 stixEEE8 1 1 Q\overbracemid center of extensible overbrace (CMEX10 x3C rotated 90deg) EEE9 G018 stixEEE9 1 1 Q\underbracemid center of extensible underbrace (CMEX10 x3D rotated 90deg) EEEA G019 stixEEEA 1 1 Q\overparenlend left end of extensible overparen (CMEX10 x40 rotated 90deg) EEEB G01A stixEEEB 1 1 Q\overparenrend right end of extensible overparen (CMEX10 x30 rotated 90deg) EEEC G01B stixEEEC 1 1 Q\underparenlend left end of extensible underparen (CMEX10 x41 rotated 90deg) EEED G01C stixEEED 1 1 Q\underparenrend right end of extensible underparen (CMEX10 x31 rotated 90deg) EEEE G01D stixEEEE 1 1 Q\overbracketlend left end of extensible over square bracket (CMEX10 x34 rotated 90deg) EEEF G01E stixEEEF 1 1 Q\overbracketrend right end of extensible over square bracket (CMEX10 x32 rotated 90deg) EEF0 G01F stixEEF0 1 1 Q\underbracketlend left end of extensible under square bracket (CMEX10 x35 rotated 90deg) EEF1 G020 stixEEF1 1 1 Q\underbracketrend right end of extensible under square bracket (CMEX10 x33 rotated 90deg) EEF2 G021 stixEEF2 1 1 Q\overbracketextender extensible horizontal for over paren or square bracket (CMEX10 x42 rotated 90deg) EEF3 G022 stixEEF3 1 1 Q\underbracketextender extensible horizontal for under paren or square bracket (CMEX10 x43 rotated 90deg) & F364 205F uni205F AX2B 0 N N Q\medmathspace MediumSpace medium space (4/18 unit) % F3B2 EE90 stixEE90 7X22 AX2C 0DN N rblank Q\varvisiblespace RoundSpaceIndicator round space indicator & F3B6 2062 uni2062 AX2E 0 Q\invisibletimes InvisibleTimes INVISIBLE TIMES & F3B7 2061 uni2061 AX2D 0 Q\functionapply FunctionApply FUNCTION APPLICATION & F410 29CF uni29CF 5X27 DXCB 0DS R ltrivb H\ltrivb LeftTriangleBar r156 0xE950 left triangle, vertical bar & F411 29D0 uni29D0 5X28 DXCC 0DS R vbrtri H\vbrtri RightTriangleBar r157 0xE951 vertical bar, right triangle / F412 uni29CF0338 5X29 1DS R nltrivb Q\nltrivb NotLeftTriangleBar n156 0xEA50 not left triangle, vertical bar / F413 uni29D00338 5X2A 1DS R nvbrtri Q\nvbrtri NotRightTriangleBar n157 0xEA51 not vertical bar, right triangle / F423 F423 uni2AA10338 3X43 1DS R nsLt Q\nLt NotNestedLessLess n061 0xEA36 not double less-than sign / F428 F428 uni2AA20338 3X44 1DS R nsGt Q\nGt NotNestedGreaterGreater n057 0xEA37 not double greater-than sign & F431 2A75 uni2A75 3X11 CXAA 0DS R eqeq H\eqeq Equal r145 0xE94B two consecutive equal signs & F503 2912 uni2912 1X13 BX1E 0DS R uarrb H\baruparrow UpArrowBar a111 0xEB30 up arrow to bar & F504 2913 uni2913 1X14 BX1F 0DS R darrb H\downarrowbar DownArrowBar a113 0xEB31 down arrow to bar & F505 294E uni294E 1X4A BX5B 0DS R lurushar H\leftrightharpoonupup LeftRightVector h020 0xEB1B left-up-right-up harpoon & F507 2952 uni2952 1X4E BX5F 0DS R luharb H\barleftharpoonup LeftVectorBar h022 0xEB20 left-up harpoon to bar & F508 2953 uni2953 1X4F BX60 0DS R ruharb H\rightharpoonupbar RightVectorBar h023 0xEB21 right-up harpoon to bar & F509 295A uni295A 1X56 BX67 0DS R bluhar H\leftharpoonupbar LeftTeeVector h024 0xEB24 left-up harpoon from bar & F50A 295B uni295B 1X57 BX68 0DS R bruhar H\barrightharpoonup RightTeeVector h025 0xEB25 right-up harpoon from bar & F50B 2950 uni2950 1X4C BX5D 0DS R ldrdshar H\leftrightharpoondowndown DownLeftRightVector h021 0xEB1C left-down-right-down harpoon & F50C 2956 uni2956 1X52 BX63 0DS R ldharb H\barleftharpoondown DownLeftVectorBar h026 0xEB22 left-down harpoon to bar & F50D 2957 uni2957 1X53 BX64 0DS R rdharb H\rightharpoondownbar DownRightVectorBar h027 0xEB23 right-down harpoon to bar & F50E 295E uni295E 1X5A BX6B 0DS R bldhar H\leftharpoondownbar DownLeftTeeVector h028 0xEB26 left-down harpoon from bar & F50F 295F uni295F 1X5B BX6C 0DS R brdhar H\barrightharpoondown DownRightTeeVector h029 0xEB27 right-down harpoon from bar & F510 294F uni294F 1X4B BX5C 0DS R urdrshar H\updownharpoonrightright RightUpDownVector h040 0xEB1E up-right-down-right harpoon & F511 2954 uni2954 1X50 BX61 0DS R urharb H\barupharpoonright RightUpVectorBar h042 0xEB2A up-right harpoon to bar & F512 2955 uni2955 1X51 BX62 0DS R drharb H\downharpoonrightbar RightDownVectorBar h043 0xEB2B down-right harpoon to bar & F513 295C uni295C 1X58 BX69 0DS R burhar H\upharpoonrightbar RightUpTeeVector h044 0xEB2E up-right harpoon from bar & F514 295D uni295D 1X59 BX6A 0DS R bdrhar H\bardownharpoonright RightDownTeeVector h045 0xEB2F down-right harpoon from bar & F515 2951 uni2951 1X4D BX5E 0DS R uldlshar H\updownharpoonleftleft LeftUpDownVector h041 0xEB1D up-left-down-left harpoon & F516 2958 uni2958 1X54 BX65 0DS R ulharb H\barupharpoonleft LeftUpVectorBar h046 0xEB28 up-left harpoon to bar & F517 2959 uni2959 1X55 BX66 0DS R dlharb H\downharpoonleftbar LeftDownVectorBar h047 0xEB29 down-left harpoon to bar & F518 2960 uni2960 1X5C BX6D 0DS R bulhar H\upharpoonleftbar LeftUpTeeVector h048 0xEB2C up-left harpoon from bar & F519 2961 uni2961 1X5D BX6E 0DS R bdlhar H\bardownharpoonleft LeftDownTeeVector h049 0xEB2D down-left harpoon from bar & F51F 29F4 uni29F4 7X23 BX08 0DS H\ruledelayed RuleDelayed a153 0xE94D rule-delayed (colon right arrow) F520 25FD uni25FD 0DN Q\mdsmwhtsquare Square medium empty square & F524 2970 uni2970 1X6C BX7D 0DS R rimply H\rightimply RoundImplies a218 0xE954 right double arrow with rounded head (looks like thin superset) F527 25AB uni25AB 7X3A DXEE 0DN N Q\smwhtsquare \subsquare EmptySmallSquare empty small square F528 25AA uni25AA 7X3B DXEF 0DN N Q\smblksquare FilledSmallSquare filled small square & F529 EE6E stixEE6E 0DN N vssquf Q\vysmblksquare FilledVerySmallSquare filled very small square (ex 25FE) # F52A 2191 uni2191.short 0DS suarr H\shortuparrow ShortUpArrow a012 short up arrow # F52B 2193 uni2193.short 0DS sdarr H\shortdownarrow ShortDownArrow a014 short down arrow & F530 EE6F stixEE6F 0DN N vssqu Q\vysmwhtsquare EmptyVerySmallSquare empty very small square (ex 25FD) F601 EE91 stixEE91 7X20 AX29 1DN Q\horizontalline HorizontalLine short horizontal line F614 23B4 uni23B4 4X32 DX81 0DF ovrbrk M\overbracket OverBracket over bracket F615 23B5 uni23B5 4X33 DX82 0DF udrbrk M\underbracket UnderBracket under bracket & F6E6 D552 u1D552 6X50 0DZ A aopf Q\Bbba DoubleStruckA open face small letter a & F6E7 D553 u1D553 6X51 0DZ A bopf Q\Bbbb DoubleStruckB open face small letter b & F6E8 D554 u1D554 6X52 0DZ A copf Q\Bbbc DoubleStruckC open face small letter c & F6E9 D555 u1D555 6X53 0DZ A dopf Q\Bbbd DoubleStruckD open face small letter d & F6EA D556 u1D556 6X54 0DZ A eopf Q\Bbbe DoubleStruckE open face small letter e & F6EB D557 u1D557 6X55 0DZ A fopf Q\Bbbf DoubleStruckF open face small letter f & F6EC D558 u1D558 6X56 0DZ A gopf Q\Bbbg DoubleStruckG open face small letter g & F6ED D559 u1D559 6X57 0DZ A hopf Q\Bbbh DoubleStruckH open face small letter h & F6EE D55A u1D55A 6X58 0DZ A iopf Q\Bbbi DoubleStruckI open face small letter i & F6EF D55B u1D55B 6X59 0DZ A jopf Q\Bbbj DoubleStruckJ open face small letter j & F6F0 D55C u1D55C 6X5A 0DZ A kopf A\Bbbk DoubleStruckK open face small letter k & F6F1 D55D u1D55D 6X5B 0DZ A lopf Q\Bbbl DoubleStruckL open face small letter l & F6F2 D55E u1D55E 6X5C 0DZ A mopf Q\Bbbm DoubleStruckM open face small letter m & F6F3 D55F u1D55F 6X5D 0DZ A nopf Q\Bbbn DoubleStruckN open face small letter n & F6F4 D560 u1D560 6X5E 0DZ A oopf Q\Bbbo DoubleStruckO open face small letter o & F6F5 D561 u1D561 6X5F 0DZ A popf Q\Bbbp DoubleStruckP open face small letter p & F6F6 D562 u1D562 6X60 0DZ A qopf Q\Bbbq DoubleStruckQ open face small letter q & F6F7 D563 u1D563 6X61 0DZ A ropf Q\Bbbr DoubleStruckR open face small letter r & F6F8 D564 u1D564 6X62 0DZ A sopf Q\Bbbs DoubleStruckS open face small letter s & F6F9 D565 u1D565 6X63 0DZ A topf Q\Bbbt DoubleStruckT open face small letter t & F6FA D566 u1D566 6X64 0DZ A uopf Q\Bbbu DoubleStruckU open face small letter u & F6FB D567 u1D567 6X65 0DZ A vopf Q\Bbbv DoubleStruckV open face small letter v & F6FC D568 u1D568 6X66 0DZ A wopf Q\Bbbw DoubleStruckW open face small letter w & F6FD D569 u1D569 6X67 0DZ A xopf Q\Bbbx DoubleStruckX open face small letter x & F6FE D56A u1D56A 6X68 0DZ A yopf Q\Bbby DoubleStruckY open face small letter y & F6FF D56B u1D56B 6X69 0DZ A zopf Q\Bbbz DoubleStruckZ open face small letter z % F721 EE92 stixEE92 1DN N frksmily 9\FreakedSmiley FreakedSmiley freaked smiley % F722 EE93 stixEE93 1DN N neusmily 9\NeutralSmiley NeutralSmiley neutral smiley % F723 EE94 stixEE94 1DN N litebulb 9\LightBulb LightBulb light bulb % F725 26A0 uni26A0 0DN N triexcl Q\triangleexclam WarningSign warning sign (exclamation mark in triangle) B F749 213C uni213C 1DZ N opfpi Q\Bbbpi DoubledPi pi - 3.14159265358979... & F74A 213D uni213D 6X27 AX0A 0DZ A opfgamma Q\Bbbgamma DoubledGamma open face gamma & F74B 2145 uni2145 6X22 AX11 0D0 N Q\itBbbD CapitalDifferentialD CapitalDifferentialD & F74C 2146 uni2146 6X23 AX12 0D0 N Q\itBbbd DifferentialD DifferentialD & F74D 2147 uni2147 6X24 AX13 0D0 N Q\itBbbe ExponentialE ExponentialE & F74E 2148 uni2148 6X25 AX14 0D0 N Q\itBbbi ImaginaryI ImaginaryI & F74F 2149 uni2149 6X26 AX15 0D0 N Q\itBbbj ImaginaryJ ImaginaryJ & F750 2981 uni2981 DX69 0DN N scirclef Q\mdsmblkcircle FilledSmallCircle 0xE98F xx40 filled small circle, Z NOTATION SPOT X F751 2B1A uni2B1A 0DN N Q\dottedsquare DottedSquare dotted outline square % F752 25A9 uni25A9 0DN N Q\squarecrossfill GraySquare gray-filled square % F753 EE97 stixEE97 0DN N cirgray Q\graycircle GrayCircle gray-filled circle % F756 EE98 stixEE98 0 N 9\KernelIcon KernelIcon KernelIcon % F757 EE99 stixEE99 0 N 9\MathematicaIcon MathematicaIcon MathematicaIcon % F763 EE9D stixEE9D 0DN 9\ControlKey ControlKey ControlKey % F764 EE9A stixEE9A 0 N 9\AliasDelimiter AliasDelimiter 0xE94E AliasDelimiter % F766 EE9E stixEE9E 0DN 9\ReturnKey ReturnKey ReturnKey % F767 EE9B stixEE9B 0DN 9\ErrorIndicator ErrorIndicator ErrorIndicator % F768 EE9C stixEE9C 0 N 9\AliasIndicator AliasIndicator AliasIndicator % F769 EE9F stixEE9F 0DN 9\EscapeKey EscapeKey EscapeKey % F76A EEA0 stixEEA0 0DN 9\CommandKey CommandKey CommandKey % F76B EEAB stixEEAB 0 N 9\LeftModified LeftModified LeftModified % F76C EEAC stixEEAC 0 N 9\RightModified RightModified RightModified % F7BE EEA1 stixEEA1 0DN 9\TabKey TabKey TabKey % F7BF EEA2 stixEEA2 0DN 9\SpaceKey SpaceKey SpaceKey % F7D0 EEA3 stixEEA3 0DN 9\DeleteKey DeleteKey DeleteKey % F7D1 EEA4 stixEEA4 0DN 9\AltKey AltKey AltKey % F7D2 EEA5 stixEEA5 0DN 9\OptionKey OptionKey OptionKey % F7D3 EEA6 stixEEA6 0 N 9\KeyBar KeyBar KeyBar % F7D4 EEA7 stixEEA7 0DN 9\EnterKey EnterKey EnterKey % F7D5 EEA8 stixEEA8 0DN 9\ShiftKey ShiftKey ShiftKey % F7D6 EEA9 stixEEA9 0DN Q\ModOneKey Mod1Key Mod1Key % F7D7 EEAA stixEEAA 0DN Q\ModTwoKey Mod2Key Mod2Key %0FB00 ff F021 4DA A fflig ISOPUB fflig small ff ligature %0FB01 fi F024 4DA A filig ISOPUB filig FiLigature small fi ligature %0FB02 fl F025 4DA A fllig ISOPUB fllig FlLigature small fl ligature %0FB03 ffi F022 4DA A ffilig ISOPUB ffilig small ffi ligature %0FB04 ffl F023 4DA A ffllig ISOPUB ffllig small ffl ligature &0FE00 uniFE00 AX2F 0 VARIATION SELECTOR-1 X0FE35 23DC uni23DC 4X30 0DF ovrpar Q\overparen OverParenthesis over parenthesis X0FE36 23DD uni23DD 4X31 0DF udrpar Q\underparen UnderParenthesis under parenthesis X0FE37 23DE uni23DE 4X34 0DF ovrcub P\overbrace \overbrace OverBrace over brace X0FE38 23DF uni23DF 4X35 0DF udrcub P\underbrace \underbrace UnderBrace under brace %0FFFD uniFFFD 1DN Q\unknown UnknownGlyph unknown glyph G000 0332 uni0332 0 W Q\textsubline under line (multiple characters and non-spacing) G001 0305 uni0305 0 W Q\overbar over line (multiple characters and non-spacing) G002 20D6 uni20D6 0 W Q\wideoverleftarrow over left arrow (multiple characters and non-spacing) G003 20D7 uni20D7 0 W Q\wideoverrightarrow over right arrow (multiple characters and non-spacing) G004 20D1 uni20D1 0 W Q\widerightharpoonaccent over right harpoon up (multiple characters and non-spacing) G005 20D0 uni20D0 0 W Q\wideleftharpoonaccent over left harpoon up (multiple characters and non-spacing) W G006 20EC uni20EC 0 W Q\overrightharpoondown over right harpoon down (multiple characters and non-spacing) W G007 20ED uni20ED 0 W Q\overleftharpoondown over left harpoon down (multiple characters and non-spacing) W G008 20EE uni20EE 0 W Q\underleftarrow under left arrow (multiple characters and non-spacing) W G009 20EF uni20EF 0 W Q\underrightarrow under right arrow (multiple characters and non-spacing) G00A EEE0 stixEEE0 0 1 Q\overarrowHextender horizontal extender for multiple character over accent arrows, harpoons, line G00B EEE1 stixEEE1 0 1 Q\underarrowHextender horizontal extender for multiple character under accent arrows, harpoons, line G010 EEE2 stixEEE2 0 N Q\varsqrt radical with horizontal (for single character under the radical) G012 EEE3 stixEEE3 1 1 Q\overbracelend left end of extensible overbrace (CMEX10 x3A rotated 90deg) G013 EEE4 stixEEE4 1 1 Q\overbracerend right end of extensible overbrace (CMEX10 x38 rotated 90deg) G014 EEE5 stixEEE5 1 1 Q\underbracelend left end of extensible underbrace (CMEX10 x3B rotated 90deg) G015 EEE6 stixEEE6 1 1 Q\underbracerend right end of extensible underbrace (CMEX10 x39 rotated 90deg) G016 EEE7 stixEEE7 1 1 Q\hbraceextender extensible horizontal for curly over and under braces (CMEX10 x3E rotated 90deg) G017 EEE8 stixEEE8 1 1 Q\overbracemid center of extensible overbrace (CMEX10 x3C rotated 90deg) G018 EEE9 stixEEE9 1 1 Q\underbracemid center of extensible underbrace (CMEX10 x3D rotated 90deg) G019 EEEA stixEEEA 0 1 Q\overparenlend left end of extensible overparen (CMEX10 x40 rotated 90deg) G01A EEEB stixEEEB 0 1 Q\overparenrend right end of extensible overparen (CMEX10 x30 rotated 90deg) G01B EEEC stixEEEC 0 1 Q\underparenlend left end of extensible underparen (CMEX10 x41 rotated 90deg) G01C EEED stixEEED 0 1 Q\underparenrend right end of extensible underparen (CMEX10 x31 rotated 90deg) G01D EEEE stixEEEE 0 1 Q\overbracketlend left end of extensible over square bracket (CMEX10 x34 rotated 90deg) G01E EEEF stixEEEF 0 1 Q\overbracketrend right end of extensible over square bracket (CMEX10 x32 rotated 90deg) G01F EEF0 stixEEF0 0 1 Q\underbracketlend left end of extensible under square bracket (CMEX10 x35 rotated 90deg) G020 EEF1 stixEEF1 0 1 Q\underbracketrend right end of extensible under square bracket (CMEX10 x33 rotated 90deg) G021 EEF2 stixEEF2 0 1 Q\overbracketextender extensible horizontal for over paren or square bracket (CMEX10 x42 rotated 90deg) G022 EEF3 stixEEF3 0 1 Q\underbracketextender extensible horizontal for under paren or square bracket (CMEX10 x43 rotated 90deg) G030 21F4 uni21F4 0 S Q\circleonrightarrow \arrowoncirc right arrow through circle G031 27F4 uni27F4 0 S Q\rightarrowonoplus \arrowonoplus right arrow through oplus G032 EE4B stixEE4B 0 L I\shaw \shaw "shaw": large operator with three parallel vertical lines topped by a horizontal G033 EE4C stixEE4C 0 S Q\dashontimes \xdash times sign with dash through it G034 EE4D stixEE4D 0 S I\ffourier \ffourier lowercase italic f with horizontal bar touching its upper edge G035 EE4E stixEE4E 0 S I\fftourier \fftourier lowercase italic f with horizontal bar touching its upper edge and superscripted uppercase italic T G036 uni22112211 2 L Q\twosum \dsum two summation signs next to each other G037 EE86 stixEE86 0 S Q\precplus \precstar precedes sign followed by plus sign G038 EE87 stixEE87 0 D I\asteraccent \asteraccent asterisk accent G040 EE88 stixEE88 0 S Q\whiteplus outline plus sign G041 EE89 stixEE89 0 S Q\diamondwithrays diamond with lines from corners G042 EE8A stixEE8A 0 S Q\squarewithrays square with lines from corners G043 27D0 uni27D0 0 S Q\diamondcdot diamond with dot in middle G045 EE8B stixEE8B 0 S Q\exclameq equal with exclamation over G046 EE8C stixEE8C 0 S Q\fivevdots five vertical dots G048 EE8D stixEE8D 0 S Q\topbotwithbullet I-beam shape with bullet overprinted in middle G049 EE8E stixEE8E 0 S Q\pluswithbullet plus with bullet overprinted in middle O G04A [] 0 two squares stacked vertically O G04B [] 0 three squares stacked vertically G053 2394 uni2394 0 N hbenzen ISOCHEM W\hexagon benzene ring, edge down G054 232C uni232C 0 N benzeno ISOCHEM Q\varhexagonlrbonds six carbon ring, corner down, double bonds lower right etc G055 EE63 stixEE63 0 N benzenp ISOCHEM Q\varhexagonllbonds six carbon ring, corner down, double bonds lower left etc G056 EE64 stixEE64 0 N hbenzenp ISOCHEM Q\hexagonbottombonds six carbon ring, edge down, double bonds bottom edge etc G057 EE65 stixEE65 0 N hbenzeno ISOCHEM Q\hexagontopbonds six carbon ring, edge down, double bonds top edge etc G060 u1D434_uni0338 1DZ Q\slasheditA capital A italic slashed G061 u1D435_uni0338 1DZ Q\slasheditB capital B italic slashed G062 u1D436_uni0338 1DZ Q\slasheditC capital C italic slashed G063 u1D437_uni0338 1DZ Q\slasheditD capital D italic slashed G064 u1D438_uni0338 1DZ Q\slasheditE capital E italic slashed G065 u1D439_uni0338 1DZ Q\slasheditF capital F italic slashed G066 u1D43A_uni0338 1DZ Q\slasheditG capital G italic slashed G067 u1D43B_uni0338 1DZ Q\slasheditH capital H italic slashed G068 u1D43C_uni0338 1DZ Q\slasheditI capital I italic slashed G069 u1D43D_uni0338 1DZ Q\slasheditJ capital J italic slashed G06A u1D43E_uni0338 1DZ Q\slasheditK capital K italic slashed G06B u1D43F_uni0338 1DZ Q\slasheditL capital L italic slashed G06C u1D440_uni0338 1DZ Q\slasheditM capital M italic slashed G06D u1D441_uni0338 1DZ Q\slasheditN capital N italic slashed G06E u1D442_uni0338 1DZ Q\slasheditO capital O italic slashed G06F u1D443_uni0338 1DZ Q\slasheditP capital P italic slashed G070 u1D444_uni0338 1DZ Q\slasheditQ capital Q italic slashed G071 u1D445_uni0338 1DZ Q\slasheditR capital R italic slashed G072 u1D446_uni0338 1DZ Q\slasheditS capital S italic slashed G073 u1D447_uni0338 1DZ Q\slasheditT capital T italic slashed G074 u1D448_uni0338 1DZ Q\slasheditU capital U italic slashed G075 u1D449_uni0338 1DZ Q\slasheditV capital V italic slashed G076 u1D44A_uni0338 1DZ Q\slasheditW capital W italic slashed G077 u1D44B_uni0338 1DZ Q\slasheditX capital X italic slashed G078 u1D44C_uni0338 1DZ Q\slasheditY capital Y italic slashed G079 u1D44D_uni0338 1DZ Q\slasheditZ capital Z italic slashed G07A u1D44E_uni0338 1DZ Q\slashedita lowercase a italic slashed G07B u1D44F_uni0338 1DZ Q\slasheditb lowercase b italic slashed G07C u1D450_uni0338 1DZ Q\slasheditc lowercase c italic slashed G07D u1D451_uni0338 1DZ Q\slasheditd lowercase d italic slashed G07E u1D452_uni0338 1DZ Q\slashedite lowercase e italic slashed G07F u1D453_uni0338 1DZ Q\slasheditf lowercase f italic slashed G080 u1D454_uni0338 1DZ Q\slasheditg lowercase g italic slashed G081 uni210E0338 1DZ Q\slashedith lowercase h italic slashed G082 u1D456_uni0338 1DZ Q\slashediti lowercase i italic slashed G083 u1D457_uni0338 1DZ Q\slasheditj lowercase j italic slashed G084 u1D458_uni0338 1DZ Q\slasheditk lowercase k italic slashed G085 u1D459_uni0338 1DZ Q\slasheditl lowercase l italic slashed G086 u1D45A_uni0338 1DZ Q\slasheditm lowercase m italic slashed G087 u1D45B_uni0338 1DZ Q\slasheditn lowercase n italic slashed G088 u1D45C_uni0338 1DZ Q\slashedito lowercase o italic slashed G089 u1D45D_uni0338 1DZ Q\slasheditp lowercase p italic slashed G08A u1D45E_uni0338 1DZ Q\slasheditq lowercase q italic slashed G08B u1D45F_uni0338 1DZ Q\slasheditr lowercase r italic slashed G08C u1D460_uni0338 1DZ Q\slashedits lowercase s italic slashed G08D u1D461_uni0338 1DZ Q\slasheditt lowercase t italic slashed G08E u1D462_uni0338 1DZ Q\slasheditu lowercase u italic slashed G08F u1D463_uni0338 1DZ Q\slasheditv lowercase v italic slashed G090 u1D464_uni0338 1DZ Q\slasheditw lowercase w italic slashed G091 u1D465_uni0338 1DZ Q\slasheditx lowercase x italic slashed G092 u1D466_uni0338 1DZ Q\slashedity lowercase y italic slashed G093 u1D467_uni0338 1DZ Q\slasheditz lowercase z italic slashed G0A0 uni03910338 1DZ Q\slashedupAlpha capital Alpha, Greek slashed G0A1 uni03920338 1DZ Q\slashedupBeta capital Beta, Greek slashed G0A2 uni03930338 1DZ Q\slashedupGamma capital Gamma, Greek slashed G0A3 uni03940338 1DZ Q\slashedupDelta capital Delta, Greek slashed G0A4 uni03950338 1DZ Q\slashedupEpsilon capital Epsilon, Greek slashed G0A5 uni03960338 1DZ Q\slashedupZeta capital Zeta, Greek slashed G0A6 uni03970338 1DZ Q\slashedupEta capital Eta, Greek slashed G0A7 uni03980338 1DZ Q\slashedupTheta capital Theta, Greek slashed G0A8 uni03990338 1DZ Q\slashedupIota capital Iota, Greek slashed G0A9 uni039A0338 1DZ Q\slashedupKappa capital Kappa, Greek slashed G0AA uni039B0338 1DZ Q\slashedupLambda capital Lambda, Greek slashed G0AB uni039C0338 1DZ Q\slashedupMu capital Mu, Greek slashed G0AC uni039D0338 1DZ Q\slashedupNu capital Nu, Greek slashed G0AD uni039E0338 1DZ Q\slashedupXi capital Xi, Greek slashed G0AE uni039F0338 1DZ Q\slashedupOmicron capital Omicron, Greek slashed G0AF uni03A00338 1DZ Q\slashedupPi capital Pi, Greek slashed G0B0 uni03A10338 1DZ Q\slashedupRho capital Rho, Greek slashed G0B1 uni03A30338 1DZ Q\slashedupSigma capital Sigma, Greek slashed G0B2 uni03A40338 1DZ Q\slashedupTau capital Tau, Greek slashed G0B3 uni03A50338 1DZ Q\slashedupUpsilon capital Upsilon, Greek slashed G0B4 uni03A60338 1DZ Q\slashedupPhi capital Phi, Greek slashed G0B5 uni03A70338 1DZ Q\slashedupChi capital Chi, Greek slashed G0B6 uni03A80338 1DZ Q\slashedupPsi capital Psi, Greek slashed G0B7 uni03A90338 1DZ Q\slashedupOmega capital Omega, Greek slashed G0B8 u1D6FC_uni0338 1DZ Q\slasheditalpha small alpha, Greek slashed G0B9 u1D6FD_uni0338 1DZ Q\slasheditbeta small beta, Greek slashed G0BA u1D6FE_uni0338 1DZ Q\slasheditgamma small gamma, Greek slashed G0BB u1D6FF_uni0338 1DZ Q\slasheditdelta small delta, Greek slashed G0BC u1D700_uni0338 1DZ Q\slasheditepsilon small epsilon, Greek slashed G0BD u1D701_uni0338 1DZ Q\slasheditzeta small zeta, Greek slashed G0BE u1D702_uni0338 1DZ Q\slashediteta small eta, Greek slashed G0BF u1D703_uni0338 1DZ Q\slashedittheta small theta, Greek slashed G0C0 u1D704_uni0338 1DZ Q\slasheditiota small iota, Greek slashed G0C1 u1D705_uni0338 1DZ Q\slasheditkappa small kappa, Greek slashed G0C2 u1D706_uni0338 1DZ Q\slasheditlambda small lambda, Greek slashed G0C3 u1D707_uni0338 1DZ Q\slasheditmu small mu, Greek slashed G0C4 u1D708_uni0338 1DZ Q\slasheditnu small nu, Greek slashed G0C5 u1D709_uni0338 1DZ Q\slasheditxi small xi, Greek slashed G0C6 u1D70A_uni0338 1DZ Q\slasheditomicron small omicron, Greek slashed G0C7 u1D70B_uni0338 1DZ Q\slasheditpi small pi, Greek slashed G0C8 u1D70C_uni0338 1DZ Q\slasheditrho small rho, Greek slashed G0C9 u1D70D_uni0338 1DZ Q\slasheditvarsigma terminal sigma, Greek slashed G0CA u1D70E_uni0338 1DZ Q\slasheditsigma small sigma, Greek slashed G0CB u1D70F_uni0338 1DZ Q\slashedittau small tau, Greek slashed G0CC u1D710_uni0338 1DZ Q\slasheditupsilon small upsilon, Greek slashed G0CD u1D711_uni0338 1DZ Q\slasheditphi small phi, Greek slashed G0CE u1D712_uni0338 1DZ Q\slasheditchi small chi, Greek slashed G0CF u1D713_uni0338 1DZ Q\slasheditpsi small psi, Greek slashed G0D0 u1D714_uni0338 1DZ Q\slasheditomega small omega, Greek slashed G0D1 u1D717_uni0338 1DZ Q\slasheditvartheta curly or open theta, Greek slashed G0D2 u1D719_uni0338 1DZ Q\slasheditvarphi curly or open small phi, Greek slashed G0D3 u1D71B_uni0338 1DZ Q\slasheditvarpi rounded small pi (pomega), Greek slashed G0D4 uni03DA0338 1DZ Q\slasheditStigma capital stigma, Greek slashed G0D5 uni03DB0338 1DZ Q\slasheditstigma small stigma, Greek slashed G0D6 uni03DC0338 1DZ Q\slasheditDigamma capital digamma, Greek slashed G0D7 uni03DD0338 1DZ Q\slasheditdigamma small digamma, Greek slashed G0D8 uni03DE0338 1DZ Q\slasheditKoppa capital koppa, Greek slashed G0D9 uni03DF0338 1DZ Q\slasheditkoppa small koppa, Greek slashed G0DA uni03E00338 1DZ Q\slasheditSampi capital sampi, Greek slashed G0DB uni03E10338 1DZ Q\slasheditsampi small sampi, Greek slashed G0EC u1D718_uni0338 1DZ Q\slasheditvarkappa rounded small kappa, Greek slashed G0ED u1D71A_uni0338 1DZ Q\slasheditvarrho rounded small rho, Greek slashed G0EE E390 uni22020338 DB68 1DZ N npart ISOTECH Q\npartial partial sign, slashed; not partial differential & G0EF uni03B50338 1DZ Q\slasheditvarepsilon rounded small epsilon, Greek, slashed G0F0 0338 uni0338.var1 0DN Q\textoverlaysolidusi slash to be combined with existing symbols to form slashed versions G0F1 0338 uni0338.var2 0DN Q\textoverlaysolidusii slash to be combined with existing symbols to form slashed versions G0F2 0338 uni0338.var3 0DN Q\textoverlaysolidusiii slash to be combined with existing symbols to form slashed versions G0F3 0338 uni0338.var4 0DN Q\textoverlaysolidusiv slash to be combined with existing symbols to form slashed versions G0F4 0338 uni0338.var5 0DN Q\textoverlaysolidusv slash to be combined with existing symbols to form slashed versions B G0F5 20EB uni20EB 0DN Q\textoverlaytwosolidus double slash to be combined with existing symbols to form double-slashed version G0F6 EE02 u1D433_uni20EB 0DZ Q\dblslasheditA capital A italic double-slashed G0F7 EE03 u1D438_uni20EB 0DZ Q\dblslasheditE capital E italic double-slashed G0F8 EE04 u1D439_uni20EB 0DZ Q\dblslasheditF capital F italic double-slashed G0F9 u1D404_uni0038 1DZ Q\slashedbfE capital E roman bold slashed G0FA u1D49E_uni0038 1DZ Q\slashedscrC capital C script slashed G0FB u1D451_uni0336 1DZ Q\midbaritd small d italic with straight bar through it G0FC u1D458_uni0336 1DZ Q\midbaritk small k italic with straight bar through it G0FD u1D461_uni0336 1DZ Q\midbaritt small t italic with straight bar through it G0FE u1D704_uni0336 1DZ Q\midbaritiota small Greek iota with straight bar through it G0FF u1D706_uni0336 1DZ Q\midbaritlambda small Greek lambda with straight bar through it # G100 2032 uni2032.notsup 0DP P\prime prime or minute, not superscripted # G101 2033 uni2033.notsup 0DP Q\dprime double prime or second, not superscripted G102 EA4B uni2034.notsup 0DP Q\trprime triple prime, not superscripted # G103 2035 uni2035.notsup 0DP A\backprime reverse prime, not superscripted # G104 2036 uni2036.notsup 0DP Q\backdprime double reverse prime, not superscripted G105 019B uni019B.var 0DZ Q\lambdabar Greek small letter lambda with horizontal stroke (not slanted stroke) G106 03F5 uni03F5 0DB Q\upepsilon lowercase straight epsilon G107 03F6 uni03F6 0DB Q\upbackepsilon reversed lowercase straight epsilon # G108 2037 uni2037.notsup 0 N N Q\backtrprime triple reverse prime, not superscripted # G109 2057 uni2057.notsup DB74 7X01 AX1C 0FP N qprime ISOTECH bm8 E\qprime 5 2B QUADRUPLE PRIME, not superscripted # G10A 21D1 uni21D1.short 0 S Q\Uparrowhead double vertical arrow top piece # G10B 21D3 uni21D3.short 0 S Q\Downarrowhead double vertical arrow bottom piece # G10C 21E0 uni21E0.short 0 S Q\leftdasharrowhead arrowhead for leftwards dashed arrow # G10D 21E2 uni21E2.short 0 S Q\rightdasharrowhead arrowhead for rightwards dashed arrow * G10E 21DC uni21DC.long EBCC 0dS R xziglarr H\longleftzigzagarrow a178 0x21DC left long zig-zag arrow & G110 27D3 uni27D3 0DR Q\pullback right angle (right and lower lines) with dot ("pullback") & G111 27D4 uni27D4 0DR Q\pushout right angle (left and upper lines) with dot ("pushout") G112 21E1 uni21E1 0DS Q\updasharrow up arrow with dashed stem G113 21E3 uni21E3 0DS Q\downdasharrow down arrow with dashed stem G114 21E0 uni21E0 0DS Q\leftdasharrow left arrow with dashed stem G115 21E2 uni21E2 0DS Q\rightdasharrow right arrow with dashed stem G116 EEB8 stixEEB8 0DS Q\nedasharrow northeast arrow with dashed stem G117 EEB9 stixEEB9 0DS Q\sedasharrow southeast arrow with dashed stem G118 EEBA stixEEBA 0DS Q\nwdasharrow northwest arrow with dashed stem G119 EEBB stixEEBB 0DS Q\swdasharrow southwest arrow with dashed stem G11A EEBC stixEEBC 0DS Q\vdasharrowextender extender for vertical dashed arrow G11B EEBD stixEEBD 0DS Q\hdasharrowestender extender for horizontal dashed arrow G11C EEBE stixEEBE 0DS Q\nwsedasharrowextender extender for se/nw dashed arrow G11D EEBF stixEEBF 0DS Q\neswdasharrowextender extender for sw/ne dashed arrow G11E EEC0 stixEEC0 0DS Q\updotarrow up arrow with dotted stem G11F EEC1 stixEEC1 0DS Q\downdotarrow down arrow with dotted stem G120 EEC2 stixEEC2 0DS Q\leftdotarrow left arrow with dotted stem G121 E238 uni2911 0DS R DDotrahd ISOAMSA H\rightdotarrow right arrow with dotted stem (E238) G122 EEC3 stixEEC3 0DS Q\nedotarrow northeast arrow with dotted stem G123 EEC4 stixEEC4 0DS Q\sedotarrow southeast arrow with dotted stem G124 EEC5 stixEEC5 0DS Q\nwdotarrow northwest arrow with dotted stem G125 EEC6 stixEEC6 0DS Q\swdotarrow southwest arrow with dotted stem G126 EEC7 stixEEC7 0DS Q\vdotarrowextender extender for vertical dotted arrow G127 EEC8 stixEEC8 0DS Q\hdotarrowextender extender for horizontal dotted arrow G128 EEC9 stixEEC9 0DS Q\nwsedotarrowextender extender for se/nw dotted arrow G129 EECA stixEECA 0DS Q\neswdotarrowextender extender for sw/ne dotted arrow G12A EECB stixEECB 0DS Q\updotdasharrow up arrow with dot-dash stem G12B EECD stixEECD 0DS Q\downdotdasharrow down arrow with dot-dash stem G12C EECE stixEECE 0DS Q\leftdotdasharrow left arrow with dot-dash stem G12D EECF stixEECF 0DS Q\rightdotdasharrow right arrow with dot-dash stem (E238) G12E EED0 stixEED0 0DS Q\nedotdasharrow northeast arrow with dot-dash stem G12F EED1 stixEED1 0DS Q\sedotdasharrow southeast arrow with dot-dash stem G130 EED2 stixEED2 0DS Q\nwdotdasharrow northwest arrow with dot-dash stem G131 EED3 stixEED3 0DS Q\swdotdasharrow southwest arrow with dot-dash stem G132 EED4 stixEED4 0DS Q\updotdasharrowextender extender for dot-dash up arrow G133 EED5 stixEED5 0DS Q\downdotdasharrowextender extender for dot-dash down arrow G134 EED6 stixEED6 0DS Q\leftdotdasharrowextender extender for dot-dash left arrow G135 EED7 stixEED7 0DS Q\rightdotdasharrowextender extender for dot-dash right arrow G136 EED8 stixEED8 0DS Q\nwdotdasharrowextender extender for nw dot-dash arrow G137 EED9 stixEED9 0DS Q\sedotdasharrowextender extender for se dot-dash arrow G138 EEDA stixEEDA 0DS Q\nedotdasharrowextender extender for ne dot-dash arrow G139 EEDB stixEEDB 0DS Q\swdotdasharrowextender extender for sw dot-dash arrow G13A EEB0 stixEEB0 0DS Q\varrowextender extender for vertical solid (normal) arrow G13B EEB1 stixEEB1 0DS Q\harrowextender extender for horizontal solid (normal) arrow G13C EEB2 stixEEB2 0DS Q\nwsearrowextender extender for se/nw solid (normal) arrow G13D EEB3 stixEEB3 0DS Q\neswarrowextender extender for sw/ne solid (normal) arrow G13E EEB4 stixEEB4 0DS Q\Varrowextender extender for vertical double arrow G13F EEB5 stixEEB5 0DS Q\Harrowextender extender for horizontal double arrow G140 EEB6 stixEEB6 0DS Q\Nwsearrowextender extender for se/nw double arrow G141 EEB7 stixEEB7 0DS Q\Neswarrowextender extender for sw/ne double arrow G150 u1D538.oblique 1DZ A Q\itBbbA oblique open face capital letter A G151 u1D539.oblique 1DZ A Q\itBbbB oblique open face capital letter B G152 uni2102.oblique 1DZ A Q\itBbbC oblique open face capital letter C G153 F74B uni2145 0DZ A Q\itBbbD oblique open face capital letter D G154 u1D53C.oblique 1DZ A Q\itBbbE oblique open face capital letter E G155 u1D53D.oblique 1DZ A Q\itBbbF oblique open face capital letter F G156 u1D53E.oblique 1DZ A Q\itBbbG oblique open face capital letter G G157 uni210D.oblique 1DZ A Q\itBbbH oblique open face capital letter H G158 u1D540.oblique 1DZ A Q\itBbbI oblique open face capital letter I G159 u1D541.oblique 1DZ A Q\itBbbJ oblique open face capital letter J G15A u1D542.oblique 1DZ A Q\itBbbK oblique open face capital letter K G15B u1D543.oblique 1DZ A Q\itBbbL oblique open face capital letter L G15C u1D544.oblique 1DZ A Q\itBbbM oblique open face capital letter M G15D uni2115.oblique 1DZ A Q\itBbbN oblique open face capital letter N G15E u1D546.oblique 1DZ A Q\itBbbO oblique open face capital letter O G15F uni2119.oblique 1DZ A Q\itBbbP oblique open face capital letter P G160 uni211A.oblique 1DZ A Q\itBbbQ oblique open face capital letter Q G161 uni211D.oblique 1DZ A Q\itBbbR oblique open face capital letter R G162 u1D54A.oblique 1DZ A Q\itBbbS oblique open face capital letter S G163 u1D54B.oblique 1DZ A Q\itBbbT oblique open face capital letter T G164 u1D54C.oblique 1DZ A Q\itBbbU oblique open face capital letter U G165 u1D54D.oblique 1DZ A Q\itBbbV oblique open face capital letter V G166 u1D54E.oblique 1DZ A Q\itBbbW oblique open face capital letter W G167 u1D54F.oblique 1DZ A Q\itBbbX oblique open face capital letter X G168 u1D550.oblique 1DZ A Q\itBbbY oblique open face capital letter Y G169 uni2124.oblique 1DZ A Q\itBbbZ oblique open face capital letter Z G16A u1D552.oblique 1DZ A Q\itBbba oblique open face small letter a G16B u1D553.oblique 1DZ A Q\itBbbb oblique open face small letter b G16C u1D554.oblique 1DZ A Q\itBbbc oblique open face small letter c G16D F74C uni2146 0DZ A Q\itBbbd oblique open face small letter d G16E F74D uni2147 0DZ A Q\itBbbe oblique open face small letter e G16F u1D557.oblique 1DZ A Q\itBbbf oblique open face small letter f G170 u1D558.oblique 1DZ A Q\itBbbg oblique open face small letter g G171 u1D559.oblique 1DZ A Q\itBbbh oblique open face small letter h G172 F74E uni2148 0DZ A Q\itBbbi oblique open face small letter i G173 F74F uni2149 0DZ A Q\itBbbj oblique open face small letter j G174 u1D55C.oblique 1DZ A Q\itBbbk oblique open face small letter k G175 u1D55D.oblique 1DZ A Q\itBbbl oblique open face small letter l G176 u1D55E.oblique 1DZ A Q\itBbbm oblique open face small letter m G177 u1D55F.oblique 1DZ A Q\itBbbn oblique open face small letter n G178 u1D560.oblique 1DZ A Q\itBbbo oblique open face small letter o G179 u1D561.oblique 1DZ A Q\itBbbp oblique open face small letter p G17A u1D562.oblique 1DZ A Q\itBbbq oblique open face small letter q G17B u1D563.oblique 1DZ A Q\itBbbr oblique open face small letter r G17C u1D564.oblique 1DZ A Q\itBbbs oblique open face small letter s G17D u1D565.oblique 1DZ A Q\itBbbt oblique open face small letter t G17E u1D566.oblique 1DZ A Q\itBbbu oblique open face small letter u G17F u1D567.oblique 1DZ A Q\itBbbv oblique open face small letter v G180 u1D568.oblique 1DZ A Q\itBbbw oblique open face small letter w G181 u1D569.oblique 1DZ A Q\itBbbx oblique open face small letter x G182 u1D56A.oblique 1DZ A Q\itBbby oblique open face small letter y G183 u1D56B.oblique 1DZ A Q\itBbbz oblique open face small letter z & G190 u1D789.light 1 Z N Q\sanspartial Mathematical sans-serif partial differential & G191 u1D756.light 1 Z A Q\sansAlpha Mathematical sans-serif capital alpha & G192 u1D757.light 1 Z A Q\sansBeta Mathematical sans-serif capital beta & G193 u1D758.light 1 Z A Q\sansGamma Mathematical sans-serif capital gamma & G194 u1D759.light 1 Z A Q\sansDelta Mathematical sans-serif capital delta & G195 u1D75A.light 1 Z A Q\sansEpsilon Mathematical sans-serif capital epsilon & G196 u1D75B.light 1 Z A Q\sansZeta Mathematical sans-serif capital zeta & G197 u1D75C.light 1 Z A Q\sansEta Mathematical sans-serif capital eta & G198 u1D75D.light 1 Z A Q\sansTheta Mathematical sans-serif capital theta & G199 u1D75E.light 1 Z A Q\sansIota Mathematical sans-serif capital iota & G19A u1D75F.light 1 Z A Q\sansKappa Mathematical sans-serif capital kappa & G19B u1D760.light 1 Z A Q\sansLambda Mathematical sans-serif capital lambda & G19C u1D761.light 1 Z A Q\sansMu Mathematical sans-serif capital mu & G19D u1D762.light 1 Z A Q\sansNu Mathematical sans-serif capital nu & G19E u1D763.light 1 Z A Q\sansXi Mathematical sans-serif capital xi & G19F u1D764.light 1 Z A Q\sansOmicron Mathematical sans-serif capital omicron & G1A0 u1D765.light 1 Z A Q\sansPi Mathematical sans-serif capital pi & G1A1 u1D766.light 1 Z A Q\sansRho Mathematical sans-serif capital rho & G1A2 u1D767.light 1 Z A Q\sansvarTheta Mathematical sans-serif capital THETA symbol & G1A3 u1D768.light 1 Z A Q\sansSigma Mathematical sans-serif capital sigma & G1A4 u1D769.light 1 Z A Q\sansTau Mathematical sans-serif capital tau & G1A5 u1D76A.light 1 Z A Q\sansUpsilon Mathematical sans-serif capital upsilon & G1A6 u1D76B.light 1 Z A Q\sansPhi Mathematical sans-serif capital phi & G1A7 u1D76C.light 1 Z A Q\sansChi Mathematical sans-serif capital chi & G1A8 u1D76D.light 1 Z A Q\sansPsi Mathematical sans-serif capital psi & G1A9 u1D76E.light 1 Z A Q\sansOmega Mathematical sans-serif capital omega & G1AA u1D770.light 1 Z A Q\sansalpha Mathematical sans-serif small alpha & G1AB u1D771.light 1 Z A Q\sansbeta Mathematical sans-serif small beta & G1AC u1D772.light 1 Z A Q\sansgamma Mathematical sans-serif small gamma & G1AD u1D773.light 1 Z A Q\sansdelta Mathematical sans-serif small delta & G1AE u1D774.light 1 Z A Q\sansvarepsilon Mathematical sans-serif small epsilon & G1AF u1D775.light 1 Z A Q\sanszeta Mathematical sans-serif small zeta & G1B0 u1D776.light 1 Z A Q\sanseta Mathematical sans-serif small eta & G1B1 u1D777.light 1 Z A Q\sanstheta Mathematical sans-serif small theta & G1B2 u1D778.light 1 Z A Q\sansiota Mathematical sans-serif small iota & G1B3 u1D779.light 1 Z A Q\sanskappa Mathematical sans-serif small kappa & G1B4 u1D77A.light 1 Z A Q\sanslambda Mathematical sans-serif small lambda & G1B5 u1D77B.light 1 Z A Q\sansmu Mathematical sans-serif small mu & G1B6 u1D77C.light 1 Z A Q\sansnu Mathematical sans-serif small nu & G1B7 u1D77D.light 1 Z A Q\sansxi Mathematical sans-serif small xi & G1B8 u1D77E.light 1 Z A Q\sansomicron Mathematical sans-serif small omicron & G1B9 u1D77F.light 1 Z A Q\sanspi Mathematical sans-serif small pi & G1BA u1D780.light 1 Z A Q\sansrho Mathematical sans-serif small rho & G1BB u1D781.light 1 Z A Q\sansvarsigma Mathematical sans-serif small FINAL sigma & G1BC u1D782.light 1 Z A Q\sanssigma Mathematical sans-serif small sigma & G1BD u1D783.light 1 Z A Q\sanstau Mathematical sans-serif small tau & G1BE u1D784.light 1 Z A Q\sansupsilon Mathematical sans-serif small upsilon & G1BF u1D785.light 1 Z A Q\sansphi Mathematical sans-serif small phi & G1C0 u1D786.light 1 Z A Q\sanschi Mathematical sans-serif small chi & G1C1 u1D787.light 1 Z A Q\sanspsi Mathematical sans-serif small psi & G1C2 u1D788.light 1 Z A Q\sansomega Mathematical sans-serif small omega & G1C3 u1D78A.light 1 Z N Q\sansepsilon Mathematical sans-serif epsilon symbol & G1C4 u1D78B.light 1 Z N Q\sansvartheta Mathematical sans-serif theta symbol & G1C5 u1D78D.light 1 Z N Q\sansvarphi Mathematical sans-serif phi symbol & G1C6 u1D78E.light 1 Z N Q\sansvarrho Mathematical sans-serif rho symbol & G1C7 u1D78F.light 1 Z N Q\sansvarpi Mathematical sans-serif pi symbol & G1D0 u1D7E2.oblique 1 N N Q\itsanszero Mathematical sans-serif italic digit 0 & G1D1 u1D7E3.oblique 1 N N Q\itsansone Mathematical sans-serif italic digit 1 & G1D2 u1D7E4.oblique 1 N N Q\itsanstwo Mathematical sans-serif italic digit 2 & G1D3 u1D7E5.oblique 1 N N Q\itsansthree Mathematical sans-serif italic digit 3 & G1D4 u1D7E6.oblique 1 N N Q\itsansfour Mathematical sans-serif italic digit 4 & G1D5 u1D7E7.oblique 1 N N Q\itsansfive Mathematical sans-serif italic digit 5 & G1D6 u1D7E8.oblique 1 N N Q\itsanssix Mathematical sans-serif italic digit 6 & G1D7 u1D7E9.oblique 1 N N Q\itsansseven Mathematical sans-serif italic digit 7 & G1D8 u1D7EA.oblique 1 N N Q\itsanseight Mathematical sans-serif italic digit 8 & G1D9 u1D7EB.oblique 1 N N Q\itsansnine Mathematical sans-serif italic digit 9 & G200 u1D7C3.light 1 Z N Q\itsanspartial Mathematical sans-serif italic partial differential & G201 u1D790.light 1 Z A Q\itsansAlpha Mathematical sans-serif italic capital alpha & G202 u1D791.light 1 Z A Q\itsansBeta Mathematical sans-serif italic capital beta & G203 u1D792.light 1 Z A Q\itsansGamma Mathematical sans-serif italic capital gamma & G204 u1D793.light 1 Z A Q\itsansDelta Mathematical sans-serif italic capital delta & G205 u1D794.light 1 Z A Q\itsansEpsilon Mathematical sans-serif italic capital epsilon & G206 u1D795.light 1 Z A Q\itsansZeta Mathematical sans-serif italic capital zeta & G207 u1D796.light 1 Z A Q\itsansEta Mathematical sans-serif italic capital eta & G208 u1D797.light 1 Z A Q\itsansTheta Mathematical sans-serif italic capital theta & G209 u1D798.light 1 Z A Q\itsansIota Mathematical sans-serif italic capital iota & G20A u1D799.light 1 Z A Q\itsansKappa Mathematical sans-serif italic capital kappa & G20B u1D79A.light 1 Z A Q\itsansLambda Mathematical sans-serif italic capital lambda & G20C u1D79B.light 1 Z A Q\itsansMu Mathematical sans-serif italic capital mu & G20D u1D79C.light 1 Z A Q\itsansNu Mathematical sans-serif italic capital nu & G20E u1D79D.light 1 Z A Q\itsansXi Mathematical sans-serif italic capital xi & G20F u1D79E.light 1 Z A Q\itsansOmicron Mathematical sans-serif italic capital omicron & G210 u1D79F.light 1 Z A Q\itsansPi Mathematical sans-serif italic capital pi & G211 u1D7A0.light 1 Z A Q\itsansRho Mathematical sans-serif italic capital rho & G212 u1D7A1.light 1 Z A Q\itsansvarTheta Mathematical sans-serif italic capital theta symbol & G213 u1D7A2.light 1 Z A Q\itsansSigma Mathematical sans-serif italic capital sigma & G214 u1D7A3.light 1 Z A Q\itsansTau Mathematical sans-serif italic capital tau & G215 u1D7A4.light 1 Z A Q\itsansUpsilon Mathematical sans-serif italic capital upsilon & G216 u1D7A5.light 1 Z A Q\itsansPhi Mathematical sans-serif italic capital phi & G217 u1D7A6.light 1 Z A Q\itsansChi Mathematical sans-serif italic capital chi & G218 u1D7A7.light 1 Z A Q\itsansPsi Mathematical sans-serif italic capital psi & G219 u1D7A8.light 1 Z A Q\itsansOmega Mathematical sans-serif italic capital omega & G21A u1D7AA.light 1 Z A Q\itsansalpha Mathematical sans-serif italic small alpha & G21B u1D7AB.light 1 Z A Q\itsansbeta Mathematical sans-serif italic small beta & G21C u1D7AC.light 1 Z A Q\itsansgamma Mathematical sans-serif italic small gamma & G21D u1D7AD.light 1 Z A Q\itsansdelta Mathematical sans-serif italic small delta & G21E u1D7AE.light 1 Z A Q\itsansvarepsilon Mathematical sans-serif italic small epsilon & G21F u1D7AF.light 1 Z A Q\itsanszeta Mathematical sans-serif italic small zeta & G220 u1D7B0.light 1 Z A Q\itsanseta Mathematical sans-serif italic small eta & G221 u1D7B1.light 1 Z A Q\itsanstheta Mathematical sans-serif italic small theta & G222 u1D7B2.light 1 Z A Q\itsansiota Mathematical sans-serif italic small iota & G223 u1D7B3.light 1 Z A Q\itsanskappa Mathematical sans-serif italic small kappa & G224 u1D7B4.light 1 Z A Q\itsanslambda Mathematical sans-serif italic small lambda & G225 u1D7B5.light 1 Z A Q\itsansmu Mathematical sans-serif italic small mu & G226 u1D7B6.light 1 Z A Q\itsansnu Mathematical sans-serif italic small nu & G227 u1D7B7.light 1 Z A Q\itsansxi Mathematical sans-serif italic small xi & G228 u1D7B8.light 1 Z A Q\itsansomicron Mathematical sans-serif italic small omicron & G229 u1D7B9.light 1 Z A Q\itsanspi Mathematical sans-serif italic small pi & G22A u1D7BA.light 1 Z A Q\itsansrho Mathematical sans-serif italic small rho & G22B u1D7BB.light 1 Z A Q\itsansvarsigma Mathematical sans-serif italic small FINAL sigma & G22C u1D7BC.light 1 Z A Q\itsanssigma Mathematical sans-serif italic small sigma & G22D u1D7BD.light 1 Z A Q\itsanstau Mathematical sans-serif italic small tau & G22E u1D7BE.light 1 Z A Q\itsansupsilon Mathematical sans-serif italic small upsilon & G22F u1D7BF.light 1 Z A Q\itsansphi Mathematical sans-serif italic small phi & G230 u1D7C0.light 1 Z A Q\itsanschi Mathematical sans-serif italic small chi & G231 u1D7C1.light 1 Z A Q\itsanspsi Mathematical sans-serif italic small psi & G232 u1D7C2.light 1 Z A Q\itsansomega Mathematical sans-serif italic small omega & G233 u1D7C4.light 1 Z N Q\itsansepsilon Mathematical sans-serif italic epsilon symbol & G234 u1D7C5.light 1 Z N Q\itsansvartheta Mathematical sans-serif italic theta symbol & G235 u1D7C7.light 1 Z N Q\itsansvarphi Mathematical sans-serif italic phi symbol & G236 u1D7C8.light 1 Z N Q\itsansvarrho Mathematical sans-serif italic rho symbol & G237 u1D7C9.light 1 Z N Q\itsansvarpi Mathematical sans-serif italic pi symbol & G240 u1D7EC.oblique 1 N N Q\bfitsanszero Mathematical sans-serif bold italic digit 0 & G241 u1D7ED.oblique 1 N N Q\bfitsansone Mathematical sans-serif bold italic digit 1 & G242 u1D7EE.oblique 1 N N Q\bfitsanstwo Mathematical sans-serif bold italic digit 2 & G243 u1D7EF.oblique 1 N N Q\bfitsansthree Mathematical sans-serif bold italic digit 3 & G244 u1D7F0.oblique 1 N N Q\bfitsansfour Mathematical sans-serif bold italic digit 4 & G245 u1D7F1.oblique 1 N N Q\bfitsansfive Mathematical sans-serif bold italic digit 5 & G246 u1D7F2.oblique 1 N N Q\bfitsanssix Mathematical sans-serif bold italic digit 6 & G247 u1D7F3.oblique 1 N N Q\bfitsansseven Mathematical sans-serif bold italic digit 7 & G248 u1D7F4.oblique 1 N N Q\bfitsanseight Mathematical sans-serif bold italic digit 8 & G249 u1D7F5.oblique 1 N N Q\bfitsansnine Mathematical sans-serif bold italic digit 9 M G250 u1D538.bold 1DZ A Q\bfBbbA mathematical bold double-struck capital A M G251 u1D539.bold 1DZ A Q\bfBbbB mathematical bold double-struck capital B M G252 u1D53A.bold 1DZ A Q\bfBbbC mathematical bold double-struck capital C M G253 u1D53B.bold 1DZ A Q\bfBbbD mathematical bold double-struck capital D M G254 u1D53C.bold 1DZ A Q\bfBbbE mathematical bold double-struck capital E M G255 u1D53D.bold 1DZ A Q\bfBbbF mathematical bold double-struck capital F M G256 u1D53E.bold 1DZ A Q\bfBbbG mathematical bold double-struck capital G M G257 uni210D.bold 1DZ A Q\bfBbbH mathematical bold double-struck capital H M G258 u1D540.bold 1DZ A Q\bfBbbI mathematical bold double-struck capital I M G259 u1D541.bold 1DZ A Q\bfBbbJ mathematical bold double-struck capital J M G25A u1D542.bold 1DZ A Q\bfBbbK mathematical bold double-struck capital K M G25B u1D543.bold 1DZ A Q\bfBbbL mathematical bold double-struck capital L M G25C u1D544.bold 1DZ A Q\bfBbbM mathematical bold double-struck capital M M G25D uni2115.bold 1DZ A Q\bfBbbN mathematical bold double-struck capital N M G25E u1D546.bold 1DZ A Q\bfBbbO mathematical bold double-struck capital O M G25F uni2119.bold 1DZ A Q\bfBbbP mathematical bold double-struck capital P M G260 uni211A.bold 1DZ A Q\bfBbbQ mathematical bold double-struck capital Q M G261 uni211D.bold 1DZ A Q\bfBbbR mathematical bold double-struck capital R M G262 u1D54A.bold 1DZ A Q\bfBbbS mathematical bold double-struck capital S M G263 u1D54B.bold 1DZ A Q\bfBbbT mathematical bold double-struck capital T M G264 u1D54C.bold 1DZ A Q\bfBbbU mathematical bold double-struck capital U M G265 u1D54D.bold 1DZ A Q\bfBbbV mathematical bold double-struck capital V M G266 u1D54E.bold 1DZ A Q\bfBbbW mathematical bold double-struck capital W M G267 u1D54F.bold 1DZ A Q\bfBbbX mathematical bold double-struck capital X M G268 u1D550.bold 1DZ A Q\bfBbbY mathematical bold double-struck capital Y M G269 uni2124.bold 1DZ A Q\bfBbbZ mathematical bold double-struck capital Z M G26A u1D552.bold 1DZ A Q\bfBbba mathematical bold double-struck small letter a M G26B u1D553.bold 1DZ A Q\bfBbbb mathematical bold double-struck small letter b M G26C u1D554.bold 1DZ A Q\bfBbbc mathematical bold double-struck small letter c M G26D u1D555.bold 1DZ A Q\bfBbbd mathematical bold double-struck small letter d M G26E u1D556.bold 1DZ A Q\bfBbbe mathematical bold double-struck small letter e M G26F u1D557.bold 1DZ A Q\bfBbbf mathematical bold double-struck small letter f M G270 u1D558.bold 1DZ A Q\bfBbbg mathematical bold double-struck small letter g M G271 u1D559.bold 1DZ A Q\bfBbbh mathematical bold double-struck small letter h M G272 u1D55A.bold 1DZ A Q\bfBbbi mathematical bold double-struck small letter i M G273 u1D55B.bold 1DZ A Q\bfBbbj mathematical bold double-struck small letter j M G274 u1D55C.bold 1DZ A Q\bfBbbk mathematical bold double-struck small letter k M G275 u1D55D.bold 1DZ A Q\bfBbbl mathematical bold double-struck small letter l M G276 u1D55E.bold 1DZ A Q\bfBbbm mathematical bold double-struck small letter m M G277 u1D55F.bold 1DZ A Q\bfBbbn mathematical bold double-struck small letter n M G278 u1D560.bold 1DZ A Q\bfBbbo mathematical bold double-struck small letter o M G279 u1D561.bold 1DZ A Q\bfBbbp mathematical bold double-struck small letter p M G27A u1D562.bold 1DZ A Q\bfBbbq mathematical bold double-struck small letter q M G27B u1D563.bold 1DZ A Q\bfBbbr mathematical bold double-struck small letter r M G27C u1D564.bold 1DZ A Q\bfBbbs mathematical bold double-struck small letter s M G27D u1D565.bold 1DZ A Q\bfBbbt mathematical bold double-struck small letter t M G27E u1D566.bold 1DZ A Q\bfBbbu mathematical bold double-struck small letter u M G27F u1D567.bold 1DZ A Q\bfBbbv mathematical bold double-struck small letter v M G280 u1D568.bold 1DZ A Q\bfBbbw mathematical bold double-struck small letter w M G281 u1D569.bold 1DZ A Q\bfBbbx mathematical bold double-struck small letter x M G282 u1D56A.bold 1DZ A Q\bfBbby mathematical bold double-struck small letter y M G283 u1D56B.bold 1DZ A Q\bfBbbz mathematical bold double-struck small letter z M G284 u1D538.boldoblique 1DZ A Q\bfitBbbA mathematical bold oblique double-struck capital A M G285 u1D539.boldoblique 1DZ A Q\bfitBbbB mathematical bold oblique double-struck capital B M G286 uni2102.boldoblique 1DZ A Q\bfitBbbC mathematical bold oblique double-struck capital C M G287 uni2145.bold 1DZ A Q\bfitBbbD mathematical bold oblique double-struck capital D M G288 u1D53C.boldoblique 1DZ A Q\bfitBbbE mathematical bold oblique double-struck capital E M G289 u1D53D.boldoblique 1DZ A Q\bfitBbbF mathematical bold oblique double-struck capital F M G28A u1D53E.boldoblique 1DZ A Q\bfitBbbG mathematical bold oblique double-struck capital G M G28B uni210D.boldoblique 1DZ A Q\bfitBbbH mathematical bold oblique double-struck capital H M G28C u1D540.boldoblique 1DZ A Q\bfitBbbI mathematical bold oblique double-struck capital I M G28D u1D541.boldoblique 1DZ A Q\bfitBbbJ mathematical bold oblique double-struck capital J M G28E u1D542.boldoblique 1DZ A Q\bfitBbbK mathematical bold oblique double-struck capital K M G28F u1D543.boldoblique 1DZ A Q\bfitBbbL mathematical bold oblique double-struck capital L M G290 u1D544.boldoblique 1DZ A Q\bfitBbbM mathematical bold oblique double-struck capital M M G291 uni2115.boldoblique 1DZ A Q\bfitBbbN mathematical bold oblique double-struck capital N M G292 u1D546.boldoblique 1DZ A Q\bfitBbbO mathematical bold oblique double-struck capital O M G293 uni2119.boldoblique 1DZ A Q\bfitBbbP mathematical bold oblique double-struck capital P M G294 uni211A.boldoblique 1DZ A Q\bfitBbbQ mathematical bold oblique double-struck capital Q M G295 uni211D.boldoblique 1DZ A Q\bfitBbbR mathematical bold oblique double-struck capital R M G296 u1D54A.boldoblique 1DZ A Q\bfitBbbS mathematical bold oblique double-struck capital S M G297 u1D54B.boldoblique 1DZ A Q\bfitBbbT mathematical bold oblique double-struck capital T M G298 u1D54C.boldoblique 1DZ A Q\bfitBbbU mathematical bold oblique double-struck capital U M G299 u1D54D.boldoblique 1DZ A Q\bfitBbbV mathematical bold oblique double-struck capital V M G29A u1D54E.boldoblique 1DZ A Q\bfitBbbW mathematical bold oblique double-struck capital W M G29B u1D54F.boldoblique 1DZ A Q\bfitBbbX mathematical bold oblique double-struck capital X M G29C u1D550.boldoblique 1DZ A Q\bfitBbbY mathematical bold oblique double-struck capital Y M G29D uni2124.boldoblique 1DZ A Q\bfitBbbZ mathematical bold oblique double-struck capital Z M G29E u1D552.boldoblique 1DZ A Q\bfitBbba mathematical bold oblique 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u1D55D.boldoblique 1DZ A Q\bfitBbbl mathematical bold oblique double-struck small letter l M G2AA u1D55E.boldoblique 1DZ A Q\bfitBbbm mathematical bold oblique double-struck small letter m M G2AB u1D55F.boldoblique 1DZ A Q\bfitBbbn mathematical bold oblique double-struck small letter n M G2AC u1D560.boldoblique 1DZ A Q\bfitBbbo mathematical bold oblique double-struck small letter o M G2AD u1D561.boldoblique 1DZ A Q\bfitBbbp mathematical bold oblique double-struck small letter p M G2AE u1D562.boldoblique 1DZ A Q\bfitBbbq mathematical bold oblique double-struck small letter q M G2AF u1D563.boldoblique 1DZ A Q\bfitBbbr mathematical bold oblique double-struck small letter r M G2B0 u1D564.boldoblique 1DZ A Q\bfitBbbs mathematical bold oblique double-struck small letter s M G2B1 u1D565.boldoblique 1DZ A Q\bfitBbbt mathematical bold oblique double-struck small letter t M G2B2 u1D566.boldoblique 1DZ A Q\bfitBbbu mathematical bold oblique double-struck small letter u M G2B3 u1D567.boldoblique 1DZ A Q\bfitBbbv mathematical bold oblique double-struck small letter v M G2B4 u1D568.boldoblique 1DZ A Q\bfitBbbw mathematical bold oblique double-struck small letter w M G2B5 u1D569.boldoblique 1DZ A Q\bfitBbbx mathematical bold oblique double-struck small letter x M G2B6 u1D56A.boldoblique 1DZ A Q\bfitBbby mathematical bold oblique double-struck small letter y M G2B7 u1D56B.boldoblique 1DZ A Q\bfitBbbz mathematical bold oblique double-struck small letter z M G2B8 u1D7D8.bold 1 N N Q\bfBbbzero MATHEMATICAL BOLD DOUBLE-STRUCK DIGIT 0 M G2B9 u1D7D9.bold 1 N N Q\bfBbbone MATHEMATICAL BOLD DOUBLE-STRUCK DIGIT 1 M G2BA u1D7DA.bold 1 N N Q\bfBbbtwo MATHEMATICAL BOLD DOUBLE-STRUCK DIGIT 2 M G2BB u1D7DB.bold 1 N N Q\bfBbbthree MATHEMATICAL BOLD DOUBLE-STRUCK DIGIT 3 M G2BC u1D7DC.bold 1 N N Q\bfBbbfour MATHEMATICAL BOLD DOUBLE-STRUCK DIGIT 4 M G2BD u1D7DD.bold 1 N N Q\bfBbbfive MATHEMATICAL BOLD DOUBLE-STRUCK DIGIT 5 M G2BE u1D7DE.bold 1 N N Q\bfBbbsix MATHEMATICAL BOLD DOUBLE-STRUCK DIGIT 6 M G2BF u1D7DF.bold 1 N N Q\bfBbbseven MATHEMATICAL BOLD DOUBLE-STRUCK DIGIT 7 M G2C0 u1D7E0.bold 1 N N Q\bfBbbeight MATHEMATICAL BOLD DOUBLE-STRUCK DIGIT 8 M G2C1 u1D7E1.bold 1 N N Q\bfBbbnine MATHEMATICAL BOLD DOUBLE-STRUCK DIGIT 9 M G2C2 u1D7D8.boldoblique 1 N N Q\bfitBbbzero MATHEMATICAL BOLD OBLIQUE DOUBLE-STRUCK DIGIT 0 M G2C3 u1D7D9.boldoblique 1 N N Q\bfitBbbone MATHEMATICAL BOLD OBLIQUE DOUBLE-STRUCK DIGIT 1 M G2C4 u1D7DA.boldoblique 1 N N Q\bfitBbbtwo MATHEMATICAL BOLD OBLIQUE DOUBLE-STRUCK DIGIT 2 M G2C5 u1D7DB.boldoblique 1 N N Q\bfitBbbthree MATHEMATICAL BOLD OBLIQUE DOUBLE-STRUCK DIGIT 3 M G2C6 u1D7DC.boldoblique 1 N N Q\bfitBbbfour MATHEMATICAL BOLD OBLIQUE DOUBLE-STRUCK DIGIT 4 M G2C7 u1D7DD.boldoblique 1 N N Q\bfitBbbfive MATHEMATICAL BOLD OBLIQUE DOUBLE-STRUCK DIGIT 5 M G2C8 u1D7DE.boldoblique 1 N N Q\bfitBbbsix MATHEMATICAL BOLD OBLIQUE DOUBLE-STRUCK DIGIT 6 M G2C9 u1D7DF.boldoblique 1 N N Q\bfitBbbseven MATHEMATICAL BOLD OBLIQUE DOUBLE-STRUCK DIGIT 7 M G2CA u1D7E0.boldoblique 1 N N Q\bfitBbbeight MATHEMATICAL BOLD OBLIQUE DOUBLE-STRUCK DIGIT 8 M G2CB u1D7E1.boldoblique 1 N N Q\bfitBbbnine MATHEMATICAL BOLD OBLIQUE DOUBLE-STRUCK DIGIT 9 M000 uni0030.taboldstyle 4DA A C\textzerooldstyle old style digit 0 M001 uni0031.taboldstyle 4DA A C\textoneoldstyle old style digit 1 M002 uni0032.taboldstyle 4DA A C\texttwooldstyle old style digit 2 M003 uni0033.taboldstyle 4DA A C\textthreeoldstyle old style digit 3 M004 uni0034.taboldstyle 4DA A C\textfouroldstyle old style digit 4 M005 uni0035.taboldstyle 4DA A C\textfiveoldstyle old style digit 5 M006 uni0036.taboldstyle 4DA A C\textsixoldstyle old style digit 6 M007 uni0037.taboldstyle 4DA A C\textsevenoldstyle old style digit 7 M008 uni0038.taboldstyle 4DA A C\texteightoldstyle old style digit 8 M009 uni0039.taboldstyle 4DA A C\textnineoldstyle old style digit 9 = M00B 0180 uni0180 0FB peb T\textcrb crossed b (phonetic symbol) = M00C 0188 uni0188 0FB pfc T\texthtc c hooktop (phonetic symbol) = M00D 0195 uni0195 0FB phh T\texthvlig h-v ligature (phonetic symbol) M00E u1D49C.cal 1dZ A Acal Q\calA mathematical calligraphic capital A M00F uni212C.cal 1fZ A Bcal Q\calB mathematical calligraphic capital B M010 u1D49E.cal 1dZ A Ccal Q\calC mathematical calligraphic capital C M011 u1D49F.cal 1dZ A Dcal Q\calD mathematical calligraphic capital D M012 uni2130.cal 1dZ A Ecal Q\calE mathematical calligraphic capital E M013 uni2131.cal 1dZ A Fcal Q\calF mathematical calligraphic capital F M014 u1D4A2.cal 1dZ A Gcal Q\calG mathematical calligraphic capital G M015 uni210B.cal 1fZ A Hcal Q\calH mathematical calligraphic capital H M016 uni2110.cal 1dZ A Ical Q\calI mathematical calligraphic capital I M017 u1D4A5.cal 1dZ A Jcal Q\calJ mathematical calligraphic capital J M018 u1D4A6.cal 1dZ A Kcal Q\calK mathematical calligraphic capital K M019 uni2112.cal 1fZ A Lcal Q\calL mathematical calligraphic capital L M01A uni2133.cal 1fZ A Mcal Q\calM mathematical calligraphic capital M M01B u1D4A9.cal 1dZ A Ncal Q\calN mathematical calligraphic capital N M01C u1D4AA.cal 1fZ A Ocal Q\calO mathematical calligraphic capital O M01D u1D4AB.cal 1dZ A Pcal Q\calP mathematical calligraphic capital P M01E u1D4AC.cal 1dZ A Qcal Q\calQ mathematical calligraphic capital Q M01F uni211B.cal 1dZ A Rcal Q\calR mathematical calligraphic capital R M020 u1D4AE.cal 1dZ A Scal Q\calS mathematical calligraphic capital S M021 u1D4AF.cal 1dZ A Tcal Q\calT mathematical calligraphic capital T M022 u1D4B0.cal 1dZ A Ucal Q\calU mathematical calligraphic capital U M023 u1D4B1.cal 1dZ A Vcal Q\calV mathematical calligraphic capital V M024 u1D4B2.cal 1dZ A Wcal Q\calW mathematical calligraphic capital W M025 u1D4B3.cal 1dZ A Xcal Q\calX mathematical calligraphic capital X M026 u1D4B4.cal 1dZ A Ycal Q\calY mathematical calligraphic capital Y M027 u1D4B5.cal 1dZ A Zcal Q\calZ mathematical calligraphic capital Z M028 u1D4D0.cal 1 Z A Q\bfcalA mathematical bold calligraphic capital A M029 u1D4D1.cal 1 Z A Q\bfcalB mathematical bold calligraphic capital B M02A u1D4D2.cal 1 Z A Q\bfcalC mathematical bold calligraphic capital C M02B u1D4D3.cal 1 Z A Q\bfcalD mathematical bold calligraphic capital D M02C u1D4D4.cal 1 Z A Q\bfcalE mathematical bold calligraphic capital E M02D u1D4D5.cal 1 Z A Q\bfcalF mathematical bold calligraphic capital F M02E u1D4D6.cal 1 Z A Q\bfcalG mathematical bold calligraphic capital G M02F u1D4D7.cal 1 Z A Q\bfcalH mathematical bold calligraphic capital H M030 u1D4D8.cal 1 Z A Q\bfcalI mathematical bold calligraphic capital I M031 u1D4D9.cal 1 Z A Q\bfcalJ mathematical bold calligraphic capital J M032 u1D4DA.cal 1 Z A Q\bfcalK mathematical bold calligraphic capital K M033 u1D4DB.cal 1 Z A Q\bfcalL mathematical bold calligraphic capital L M034 u1D4DC.cal 1 Z A Q\bfcalM mathematical bold calligraphic capital M M035 u1D4DD.cal 1 Z A Q\bfcalN mathematical bold calligraphic capital N M036 u1D4DE.cal 1 Z A Q\bfcalO mathematical bold calligraphic capital O M037 u1D4DF.cal 1 Z A Q\bfcalP mathematical bold calligraphic capital P M038 u1D4E0.cal 1 Z A Q\bfcalQ mathematical bold calligraphic capital Q M039 u1D4E1.cal 1 Z A Q\bfcalR mathematical bold calligraphic capital R M03A u1D4E2.cal 1 Z A Q\bfcalS mathematical bold calligraphic capital S M03B u1D4E3.cal 1 Z A Q\bfcalT mathematical bold calligraphic capital T M03C u1D4E4.cal 1 Z A Q\bfcalU mathematical bold calligraphic capital U M03D u1D4E5.cal 1 Z A Q\bfcalV mathematical bold calligraphic capital V M03E u1D4E6.cal 1 Z A Q\bfcalW mathematical bold calligraphic capital W M03F u1D4E7.cal 1 Z A Q\bfcalX mathematical bold calligraphic capital X M040 u1D4E8.cal 1 Z A Q\bfcalY mathematical bold calligraphic capital Y M041 u1D4E9.cal 1 Z A Q\bfcalZ mathematical bold calligraphic capital Z M M050 u1D670.bold 1 Z A Q\bfttA MATHEMATICAL BOLD MONOSPACE CAPITAL A M M051 u1D671.bold 1 Z A Q\bfttB MATHEMATICAL BOLD MONOSPACE CAPITAL B M M052 u1D672.bold 1 Z A Q\bfttC MATHEMATICAL BOLD MONOSPACE CAPITAL C M M053 u1D673.bold 1 Z A Q\bfttD MATHEMATICAL BOLD MONOSPACE CAPITAL D M M054 u1D674.bold 1 Z A Q\bfttE MATHEMATICAL BOLD MONOSPACE CAPITAL E M M055 u1D675.bold 1 Z A Q\bfttF MATHEMATICAL BOLD MONOSPACE CAPITAL F M M056 u1D676.bold 1 Z A Q\bfttG MATHEMATICAL BOLD MONOSPACE CAPITAL G M M057 u1D677.bold 1 Z A Q\bfttH MATHEMATICAL BOLD MONOSPACE CAPITAL H M M058 u1D678.bold 1 Z A Q\bfttI MATHEMATICAL BOLD MONOSPACE CAPITAL I M M059 u1D679.bold 1 Z A Q\bfttJ MATHEMATICAL BOLD MONOSPACE CAPITAL J M M05A u1D67A.bold 1 Z A Q\bfttK MATHEMATICAL BOLD MONOSPACE CAPITAL K M M05B u1D67B.bold 1 Z A Q\bfttL MATHEMATICAL BOLD MONOSPACE CAPITAL L M M05C u1D67C.bold 1 Z A Q\bfttM MATHEMATICAL BOLD MONOSPACE CAPITAL M M M05D u1D67D.bold 1 Z A Q\bfttN MATHEMATICAL BOLD MONOSPACE CAPITAL N M M05E u1D67E.bold 1 Z A Q\bfttO MATHEMATICAL BOLD MONOSPACE CAPITAL O M M05F u1D67F.bold 1 Z A Q\bfttP MATHEMATICAL BOLD MONOSPACE CAPITAL P M M060 u1D680.bold 1 Z A Q\bfttQ MATHEMATICAL BOLD MONOSPACE CAPITAL Q M M061 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MONOSPACE SMALL T M M07E u1D69E.bold 1 Z A Q\bfttu MATHEMATICAL BOLD MONOSPACE SMALL U M M07F u1D69F.bold 1 Z A Q\bfttv MATHEMATICAL BOLD MONOSPACE SMALL V M M080 u1D6A0.bold 1 Z A Q\bfttw MATHEMATICAL BOLD MONOSPACE SMALL W M M081 u1D6A1.bold 1 Z A Q\bfttx MATHEMATICAL BOLD MONOSPACE SMALL X M M082 u1D6A2.bold 1 Z A Q\bftty MATHEMATICAL BOLD MONOSPACE SMALL Y M M083 u1D6A3.bold 1 Z A Q\bfttz MATHEMATICAL BOLD MONOSPACE SMALL Z M M084 u1D7F6.bold 1 N N Q\bfttzero MATHEMATICAL BOLD MONOSPACE DIGIT 0 M M085 u1D7F7.bold 1 N N Q\bfttone MATHEMATICAL BOLD MONOSPACE DIGIT 1 M M086 u1D7F8.bold 1 N N Q\bftttwo MATHEMATICAL BOLD MONOSPACE DIGIT 2 M M087 u1D7F9.bold 1 N N Q\bfttthree MATHEMATICAL BOLD MONOSPACE DIGIT 3 M M088 u1D7FA.bold 1 N N Q\bfttfour MATHEMATICAL BOLD MONOSPACE DIGIT 4 M M089 u1D7FB.bold 1 N N Q\bfttfive MATHEMATICAL BOLD MONOSPACE DIGIT 5 M M08A u1D7FC.bold 1 N N Q\bfttsix MATHEMATICAL BOLD MONOSPACE DIGIT 6 M M08B u1D7FD.bold 1 N N Q\bfttseven MATHEMATICAL BOLD MONOSPACE DIGIT 7 M M08C u1D7FE.bold 1 N N Q\bftteight MATHEMATICAL BOLD MONOSPACE DIGIT 8 M M08D u1D7FF.bold 1 N N Q\bfttnine MATHEMATICAL BOLD MONOSPACE DIGIT 9