1,1

Define an m-th degree Tomaszewski n-chain of the first (second) kind and length k to be a sequence of n-almost primes p(1) < p(2) < ... < p(k) such that s(i+1) = m*s(i) +(-) 1 for i = 1, ..., k-1. Notice that a 2nd degree Tomaszewski 1-chain of the first (second) kind is the familiar Cunningham chain of the first (second) kind.

{a(n)} = a(n) is an element of A001358 and 2*a(n)-1 is an element of A001358.

n s(n) s*2-1

1 25 = 5^2 49 = 7^2

2 26 = 2 * 13 51 = 3 * 17

3 33 = 3 * 11 65 = 5 * 13

4 35 = 5 * 7 69 = 3 * 23

5 39 = 3 * 13 77 = 7 * 11

Cf. A001358, A111153, A111170, A111171, A111173, A111176.

Sequence in context: A003996 A132415 A067810 this_sequence A045567 A141278 A022395

Adjacent sequences: A111165 A111166 A111167 this_sequence A111169 A111170 A111171

easy,nonn

Jonathan Vos Post (jvospost3(AT)gmail.com), Oct 21 2005

Extended by Ray Chandler (rayjchandler(AT)sbcglobal.net), Oct 22 2005