32777
domain: N
Appears in sequences
- Sums of distinct powers of 8.at n=35A033045
- Positive numbers having the same set of digits in base 2 and base 8.at n=30A037413
- Sums of 3 distinct powers of 8.at n=10A038485
- 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=47A079256
- a(n) is the smallest semiprime such that difference between a(n) and next semiprime, b(n), is n.at n=29A131109
- a(n) = least member of A006881 whose difference from the following one equals n, or 0 if no such semiprime exists.at n=29A140784
- Triangle T(n, k, q) = binomial(n, k) - 1 + q^(n*binomial(n-2, k-1)) with T(n, 0, q) = T(n, n, q) = 1 and q = 2, read by rows.at n=17A173043
- Triangle T(n, k, q) = binomial(n, k) - 1 + q^(n*binomial(n-2, k-1)) with T(n, 0, q) = T(n, n, q) = 1 and q = 2, read by rows.at n=18A173043
- Triangle T(n,m) read by rows: T(n,0)=T(n,n)=1, else T(n,m) = binomial(n,m) + 2^(2*n-3)*binomial(n-2,m-1).at n=46A173152
- Triangle T(n,m) read by rows: T(n,0)=T(n,n)=1, else T(n,m) = binomial(n,m) + 2^(2*n-3)*binomial(n-2,m-1).at n=53A173152
- a(n) = 2^n + 9.at n=15A188165
- Least semiprime m such that the next semiprime is m + A215231(n).at n=12A215232
- Semiprimes p such that next semiprime after p is p+30.at n=0A217357
- Numbers of the form 8^j + 9^k, for j and k >= 0.at n=26A226832
- Indices in A261283 where records occur.at n=21A253317
- a(n) = n^5 + n + 1.at n=8A271209
- Numbers with exactly 3 ones in both binary and ternary representations.at n=47A281004
- Fixed points of A324556.at n=10A324557
- The positions of ones in the reversed binary expansion of n have integer geometric mean.at n=34A326673
- BII-numbers of uniform regular set-systems.at n=44A326785