53712
domain: N
Appears in sequences
- McKay-Thompson series of class 19A for Monster.at n=26A058549
- Total number of parts in all compositions of n into distinct odd parts.at n=47A097936
- McKay-Thompson series of class 19A for the Monster group with a(0) = 3.at n=26A136569
- Consider the base-5 Kaprekar map n->K(n) defined in A165032. Sequence gives numbers belonging to cycles, including fixed points.at n=14A165037
- Consider the base-5 Kaprekar map n->K(n) defined in A165032. Sequence gives numbers belonging to cycles of length greater than 1.at n=11A165039
- Consider the base-5 Kaprekar map n->K(n) defined in A165032. Sequence gives least elements of each cycle, including fixed points.at n=6A165041
- Consider the base-5 Kaprekar map n->K(n) defined in A165032. Sequence gives least elements of each cycle of length > 1.at n=3A165043
- Smallest member of cycle corresponding to n-th term of A165048.at n=6A165049
- Number of nX3 arrays of the minimum value of corresponding elements and their horizontal or diagonal neighbors in a random, but sorted with lexicographically nondecreasing rows and nonincreasing columns, 0..3 nX3 array.at n=5A219934
- T(n,k)=Number of nXk arrays of the minimum value of corresponding elements and their horizontal or diagonal neighbors in a random, but sorted with lexicographically nondecreasing rows and nonincreasing columns, 0..3 nXk array.at n=33A219939
- Number of 6Xn arrays of the minimum value of corresponding elements and their horizontal or diagonal neighbors in a random, but sorted with lexicographically nondecreasing rows and nonincreasing columns, 0..3 6Xn array.at n=2A219944
- a(0) = 1 and a(1) = 2, then each subsequent term is obtained by multiplying the two previous terms and then deleting repeated digits, keeping only the first occurrence of each digit.at n=18A392141