173056
domain: N
Appears in sequences
- a(n) = (12*n + 8)^2.at n=34A017618
- Squares containing 2k digits in which the sum of the first k digits = that of the rest.at n=6A068897
- Numbers of the form (4^i)*(13^j), with i, j >= 0.at n=27A107462
- Squares such that square+-3=primes.at n=18A153262
- Numbers with 33 divisors.at n=4A175743
- Number of 4Xn 0..1 arrays avoiding 0 0 0 and 0 1 1 horizontally and 0 0 1 and 0 1 1 vertically.at n=9A207369
- Numbers n such that the binary XOR of the divisors of n (A178910) is a binary palindrome (A006995) and not a power of 2 (A000079).at n=36A226643
- Number of (n+2) X (1+2) 0..3 arrays x(i,j) with each element diagonally or antidiagonally next to at least one element with value (x(i,j)+1) mod 4, no adjacent elements equal, and upper left element zero.at n=7A230970
- T(n,k)=Number of (n+2)X(k+2) 0..3 arrays x(i,j) with each element diagonally or antidiagonally next to at least one element with value (x(i,j)+1) mod 4, no adjacent elements equal, and upper left element zero.at n=28A230977
- Squares which have one or more occurrences of exactly six different digits.at n=14A235721
- Number of length n+4 0..3 arrays with some pair in every consecutive five terms totalling exactly 3.at n=4A246887
- T(n,k)=Number of length n+4 0..k arrays with some pair in every consecutive five terms totalling exactly k.at n=25A246892
- Number of length 5+4 0..n arrays with some pair in every consecutive five terms totalling exactly n.at n=2A246897
- Number of (n+1) X (1+1) 0..3 arrays with nondecreasing maximum of every two consecutive values in every row and column.at n=3A251114
- Number of (n+1)X(4+1) 0..3 arrays with nondecreasing maximum of every two consecutive values in every row and column.at n=0A251117
- T(n,k) = Number of (n+1) X (k+1) 0..3 arrays with nondecreasing maximum of every two consecutive values in every row and column.at n=6A251120
- T(n,k) = Number of (n+1) X (k+1) 0..3 arrays with nondecreasing maximum of every two consecutive values in every row and column.at n=9A251120
- Numerators of the terms of Lehmer's series S_2(2), where S_k(x) = Sum_{n>=1} n^k*x^n/binomial(2*n, n).at n=12A259852
- Numbers m such that sigma(Product(p_j)) = sigma(Product(e_j)), where m = Product((p_i)^e_i) and sigma = A000203.at n=27A272859
- Numbers whose prime factors are 2 and 13.at n=30A288162