33614
domain: N
Appears in sequences
- a(n) = 2*n^(n-2).at n=6A003308
- Numbers that are the sum of 2 positive 5th powers.at n=30A003347
- Numbers that are the sum of at most 2 positive 5th powers.at n=39A004842
- Ordered sequence of distinct terms of the form floor(x^i * floor(x^j)), i,j >= 0, where x = sqrt(7).at n=36A022771
- Numbers whose prime factors are 2 and 7.at n=30A033847
- Triangle of numbers in which i-th row is {2^(i-j)*7^j, 0<=j<=i}; i >= 0.at n=26A036565
- Sums of two powers of 7.at n=20A055258
- Numbers n such that n | 3^n + 2^n + 1^n.at n=25A056645
- Numbers k such that k | 10^k + 9^k + 8^k + 7^k.at n=34A057214
- Numbers n such that n | 7^n + 6^n + 5^n + 4^n.at n=18A057244
- Numbers n such that n | 11^n + 10^n + 9^n + 8^n + 7^n + 6^n + 5^n.at n=32A057264
- Numbers k such that k | 12^k + 11^k + 1.at n=36A057293
- Numbers n such that n | 10^n + 9^n + 1.at n=39A057295
- Numbers n such that n | 5^n + 4^n + 1.at n=27A057302
- Numbers n such that n | 7^n + 5^n + 3^n +1.at n=27A057830
- The start of a record-breaking run of consecutive integers with a number of prime factors (counted with multiplicity) equal to 6.at n=2A067821
- Values of z in positive integer solutions of x^2 + y^5 = z^3, listed in increasing order of z.at n=31A070067
- Numbers whose digital sum is equal to the sum of primes from their smallest to largest prime factor.at n=19A076406
- Denominator of number J(n) arising in computation of second moment of A*_n lattice.at n=6A079479
- a(n) = 2*7^(n-1).at n=5A109808