32772

domain: N

Appears in sequences

McKay-Thompson series of class 6B for Monster.at n=7A007255
Numbers having four 0's in base 8.at n=10A043424
McKay-Thompson series of class 6B for Monster with a(0) = 7.at n=7A045485
Numbers k such that 1/(1/phi(k) + 1/phi(k+1) + 1/phi(k+2) + 1/phi(k+3)) is an integer.at n=17A073544
a(n) is taken to be the smallest positive integer greater than a(n-1) which is consistent with the condition "n is a member of the sequence if and only if a(n) is a power of 2".at n=42A079256
Number of permutations of length n which avoid the patterns 312, 1324, 3421; or avoid the patterns 312, 1324, 2341, etc.at n=30A116722
McKay-Thompson series of class 6B for the Monster group with a(0) = 12.at n=7A121665
a(n) = 2^n + 4.at n=15A140504
a(0) = 4; for n >= 1, a(n) = 2^n + 4.at n=15A146528
a(1)=1. a(n) = the smallest integer >a(n-1) such that both a(n) and the number of divisors of a(n) contain the same number of 1's in their binary representations as n has when written in binary.at n=9A162955
Semi-sums (means) of a Fermat prime and a Mersenne prime.at n=21A174057
Products of the Jacobsthal numbers and the integers: a(n) = n * A001045(n+1).at n=12A193449
1/4 the number of (n+1) X 5 0..2 arrays with every 2 X 2 subblock having distinct clockwise edge differences.at n=28A209723
a(n) = 2^x+2^y where p(n) is the n-th prime of the form 4*k+1 and x, y is the unique integer solution to p(n) = x^2+y^2.at n=21A226640
Numbers of the form 4^j + 8^k, for j and k >= 0.at n=38A226822
Numbers n such that m + (sum of digits in base-4 representation of m) = n has exactly three solutions.at n=5A230635
Numbers of the form m = 2^i + 2^j, where i > j >= 0, such that m - 1 is prime.at n=32A239708
Number of length n+2 0..3 arrays with every three consecutive terms having the sum of some two elements equal to twice the third.at n=34A248428
Number of length 7+2 0..n arrays with every three consecutive terms having the sum of some two elements equal to twice the third.at n=14A248440
a(n) = n^3 + 4.at n=32A274077