1,2

Equals A096029(n) + A096030(n) + 1, for entries after the first. - Lekraj Beedassy (blekraj(AT)yahoo.com), Jul 21 2004

A. J. C. Cunningham, Quadratic Partitions. Hodgson, London, 1904, p. 1.

N. J. A. Sloane, A Handbook of Integer Sequences, Academic Press, 1973 (includes this sequence).

N. J. A. Sloane and Simon Plouffe, The Encyclopedia of Integer Sequences, Academic Press, 1995 (includes this sequence).

J. Todd, A problem on arc tangent relations, Amer. Math. Monthly, 56 (1949), 517-528.

T. D. Noe, Table of n, a(n) for n=1..1000

K. Matthews, Serret's algorithm Server

Eric Weisstein's World of Mathematics, Fermat's 4n Plus 1 Theorem

The following table shows the relationship

between several closely related sequences:

Here p = A002144 = primes == 1 mod 4, p = a^2+b^2 with a < b;

a = A002331, b = A002330, t_1 = ab/2 = A070151;

p^2 = c^2+d^2 with c < d; c = A002366, d = A002365,

t_2 = 2ab = A145046, t_3 = b^2-a^2 = A070079,

with {c,d} = {t_2, t_3}, t_4 = cd/2 = ab(b^2-a^2).

---------------------------------

.p..a..b..t_1..c...d.t_2.t_3..t_4

---------------------------------

.5..1..2...1...3...4...4...3....6

13..2..3...3...5..12..12...5...30

17..1..4...2...8..15...8..15...60

29..2..5...5..20..21..20..21..210

37..1..6...3..12..35..12..35..210

41..4..5..10...9..40..40...9..180

53..2..7...7..28..45..28..45..630

.................................

a := []; for x from 0 to 50 do for y from x to 50 do p := x^2+y^2; if isprime(p) then a := [op(a), [p, x, y]]; fi; od: od: writeto(trans); for i from 1 to 158 do lprint(a[i]); od: # then sort the triples in "trans"

Cf. A002331, A002313, A002144.

Sequence in context: A102730 A165597 A099033 this_sequence A091951 A063283 A036055

Adjacent sequences: A002327 A002328 A002329 this_sequence A002331 A002332 A002333

nonn,easy

N. J. A. Sloane (njas(AT)research.att.com).