39794
domain: N
Appears in sequences
- a(n) = (7*n+1)*(7*n+6).at n=28A001526
- Numbers k such that 247*2^k+1 is prime.at n=26A032500
- a(n) = (5*n+2)*(5*n+7).at n=39A085036
- Number of length 1+4 0..n arrays with every five consecutive terms having four times some element equal to the sum of the remaining four.at n=12A249657
- Total runs-resistance of all binary vectors of length n.at n=12A319415
- a(n) = Sum_{ i=2..n-1, j=1..i-1, gcd(i,j)=1 } (n-i)*(n-j).at n=26A332612
- Intersection of A361073 and 2 * A361611.at n=43A361215