62964
domain: N
Appears in sequences
- Consider the Kaprekar map n->K(n) defined in A151949. Sequence gives numbers belonging to cycles of length greater than 1.at n=3A099010
- Iterate the Kaprekar map of A151949 starting at the n-digit number 100...02; sequence gives the lowest number in the resulting cycle.at n=3A151957
- Smallest member of cycle corresponding to n-th term of A151964.at n=3A151965
- Iterate the Kaprekar map of A151949 starting at the n-digit number 100...01; sequence gives the lowest number in the resulting cycle.at n=3A151967
- Consider the Kaprekar map n->K(n) defined in A151949. Sequence gives numbers belonging to cycles, including fixed points.at n=6A164716
- Consider the Kaprekar map n->K(n) defined in A151949. Sequence gives least elements of each cycle, including fixed points.at n=5A164718
- Consider the Kaprekar map n->K(n) defined in A151949. Sequence gives least elements of each cycle of length > 1.at n=2A164720
- Triangle T(n,m) = Sum_{k=0..m} (-1)^(m-k)*binomial(m,k)*binomial(n-m+k-1,m-1)*binomial(2*n-3*m+k-1,n-m), T(n,n)=1.at n=57A271776