60146

Appears in sequences

• Number of n-step walks on square lattice.at n=10A002900
• Expansion of (1-x)/(1 - 3*x - x^2 + 2*x^3).at n=10A052911
• A051838 gives numbers m such that the sum of first m primes divides the product of the first m primes. This sequence gives corresponding values of the sum of first m primes.at n=31A140763
• Number of n X 5 arrays of the minimum value of corresponding elements and their horizontal or vertical neighbors in a random, but sorted with lexicographically nondecreasing rows and nonincreasing columns, 0..1 n X 5 array.at n=32A219499
• Total element sum of all n X n Tesler matrices of nonnegative integers.at n=5A259787
• Numbers in A007504 such that omega(a(n)) = Omega(a(n)) = 4.at n=5A264887
• Numbers k not ending in zero that are a substring of k*(k+1).at n=14A305670
• 11-gonal numbers which are products of four distinct primes.at n=8A354086