932190

Appears in sequences

• For m to be a term there must exist three Euclidean divisions of m by d, d', and d", m = d*q + r = d'*q' + r' = d"*q" + r", such that (r, q, d), (r', d', q'), and (q", r", d") are three geometric progressions.at n=16A335272
• Expansion of e.g.f. Product_{k>0} 1/(1 - sin(x)^k / k!).at n=10A335642
• Oblong numbers which are products of six distinct primes.at n=20A359127
• Multiplicative orders of 2+-i modulo p == 3 (mod 4) that are congruent to 2 modulo 4.at n=13A385218