96889010407
domain: N
Appears in sequences
- Powers of 7: a(n) = 7^n.at n=13A000420
- a(n) = max_{k=0..n} k^(n-k).at n=20A003320
- 13th powers: a(n) = n^13.at n=7A010801
- a(n) = 7^(2*n + 1).at n=6A013712
- a(n) = 7^(3*n + 1).at n=4A013740
- a(n) = 7^(4*n + 1).at n=3A013786
- a(n) = 7^(5*n + 3).at n=2A013844
- Denominator of sum of -13th powers of divisors of n.at n=6A017690
- Smallest power of 7 that begins with n.at n=8A018865
- Smallest n-th power starting with 9.at n=12A067450
- Powers of 7 with strictly increasing sum of digits.at n=8A069032
- Smallest k such that A069624(k) = n.at n=17A071913
- a(0) = 0; a(n) = n^(2*n-1) for n > 0.at n=7A085524
- a(n) = n^(n+6).at n=6A090650
- Smallest positive integer that has a different number of digits in each of the bases 2 through n.at n=8A112670
- a(n) = 7*a(n-2), a(0) = 1, a(1) = 2.at n=26A123752
- a(n) = prime(n)^13.at n=3A138031
- (0, 1, 2, 3, 2^2, 5, 2*3, 7, 2^3, 3^2, 2*5, 11, 2^2*3, 13, ...) becomes (0^(1+2), 3^(2+2), 5^(2+3), 7^(2+3), 3^(2+2), 5^(11+2), 2^(3+13), ...).at n=12A143652
- Exponacci (or exponential Fibonacci) numbers.at n=7A152915
- Denominator of Bernoulli(n, 1/7).at n=13A158475