Seventeen primes in arithmetic progression
Math. Comp. 31 (1977), 1030
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Abstract: Two sets of primes in arithmetic progression are listed. One is a set of 17 primes and the second is a set of six consecutive primes.
F. Faĭziev, The number of integers, expressible in the form
of a sum of two primes, and the number of 𝑘-twin pairs, Dokl.
Akad. Nauk Tadžik. SSR 12 (1969), no. 2,
12–16 (Russian, with Tajiki summary). MR 0252345
L. J. LANDER & T. R. PARKIN, "Consecutive primes in arithmetic progression," Math. Comp., v. 21, 1967, p. 489.
- E. KARST, "12 to 16 primes in arithmetical progressions," J. Recreational Math., v. 2, 1969, pp. 214-215. MR 0252345 (40:5566)
- L. J. LANDER & T. R. PARKIN, "Consecutive primes in arithmetic progression," Math. Comp., v. 21, 1967, p. 489.
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