3728272
domain: N
Appears in sequences
- Numbers k such that A003313(k) = A003313(9*k).at n=15A116463
- Fold-switch-fold sequence defined by McFarlane and Withers for m=3: Let A(n) = If[Mod[A(n - 1), 2] == 0, A(n - 1)/2, (m - A(n - 1))2]; a(n)= If[ Mod[A(n - 1), 2] == 0, a(n - 1)/2, (Pi - a(n - 1))/2].at n=23A136615
- Fold-switch-fold sequence defined by McFarlane and Withers for m=3: Let A(n) = If[Mod[A(n - 1), 2] == 0, A(n - 1)/2, (m - A(n - 1))2]; a(n)= If[ Mod[A(n - 1), 2] == 0, a(n - 1)/2, (Pi - a(n - 1))/2].at n=24A136615
- Fold-switch-fold sequence defined by McFarlane and Withers for m=3: Let A(n) = If[Mod[A(n - 1), 2] == 0, A(n - 1)/2, (m - A(n - 1))2]; a(n)= If[ Mod[A(n - 1), 2] == 0, a(n - 1)/2, (Pi - a(n - 1))/2].at n=25A136615