24414
domain: N
Appears in sequences
- Nearest integer to (n/2)^4.at n=25A011863
- Numbers k such that k | 10^k + 9^k + 8^k + 7^k.at n=32A057214
- Each permutation in the list A060117 converted to Site Swap notation, with "zero throws" (fixed elements) replaced with n, the length of siteswap.at n=29A060495
- Each permutation in the list A060117 converted to Site Swap notation, with digits reversed and inverted. "Zero throws" (fixed elements) indicated with 0's.at n=31A060498
- Array T(q,n) by antidiagonals: number of self-reciprocal polynomials of degree 2*n over GF(q) (for q >= 2 and n >= 1).at n=62A098691
- n^4 - 1 divided by its largest fourth power divisor.at n=23A128251
- Sum of even products minus sum of odd products of different pairs of numbers from 1 to n.at n=24A134449
- a(n) = 16*n^2 + 2*n.at n=38A158056
- Numbers of the form prime(n)*(prime(n)-1)/4.at n=29A171555
- Number of ways to place 3 nonattacking wazirs on a 3 X n board.at n=18A172229
- Number of (n+1)X3 0..2 arrays with every 2X2 subblock sum equal to exactly one or two horizontal and vertical neighbor 2X2 subblock sums.at n=2A186868
- Number of (n+1)X4 0..2 arrays with every 2X2 subblock sum equal to exactly one or two horizontal and vertical neighbor 2X2 subblock sums.at n=1A186869
- T(n,k)=Number of (n+1)X(k+1) 0..2 arrays with every 2X2 subblock sum equal to exactly one or two horizontal and vertical neighbor 2X2 subblock sums.at n=7A186871
- T(n,k)=Number of (n+1)X(k+1) 0..2 arrays with every 2X2 subblock sum equal to exactly one or two horizontal and vertical neighbor 2X2 subblock sums.at n=8A186871
- Numbers k such that P = 2^k - 1 - Sum_{primes p<k} 2^(p-1) is prime.at n=24A215891
- a(n) = floor((n + 1/2)^4).at n=12A219086
- a(n) gives one fourth of the even leg of one of the two Pythagorean triangles with hypotenuse A080109(n) = A002144(n)^2. The odd leg is given in A253802(n).at n=29A253803
- Squarefree integers k such that x^4 - k*y^2 = 1 has a nontrivial solution.at n=34A356496
- Number of integer partitions of n whose median part is the smallest.at n=44A361860