127575
domain: N
Appears in sequences
- Triangle of coefficients in expansion of (3+5x)^n.at n=30A013622
- Triangle whose (i,j)-th entry is binomial(i,j)*5^(i-j)*3^j.at n=33A038245
- Odd numbers divisible by exactly 9 primes (counted with multiplicity).at n=12A046322
- Smallest m such that the m-th Fibonacci number has exactly n divisors that are also Fibonacci numbers.at n=41A105802
- Triangle of numbers of walks in the quarter-plane, of length 2n beginning and ending at the origin using steps {(1,1), (1,0), (-1,0), (-1,-1)} (Gessel steps) arranged according to the number of times the steps (1,1) and (-1,-1) occur.at n=30A157513
- A Minkowski-type generalization of the factorial function: F(n,k) with k = 2.at n=8A163402
- Smallest number having exactly n divisors of the form 8*k + 7.at n=11A188226
- Least term of A004767 with exactly 2n divisors.at n=20A204086
- T(n,k) = Stirling2(n,k) * OrderedBell(k).at n=31A232598
- Number of 3Xn arrays containing n copies of 0..3-1 with no equal horizontal or antidiagonal neighbors and new values introduced sequentially from 0.at n=9A265193
- T(n,m), denominators of coefficients in a power/Fourier series expansion of the plane pendulum's exact differential time dependence.at n=32A274078
- Smallest odd number with exactly n nonprime divisors.at n=38A287661
- a(n) is the smallest positive integer divisible by exactly n nonpowers of 2.at n=41A327328
- Let (e*y)^(e*x) = (e*x)^(e*y), y <> x. Denominators of Taylor coefficients of y about x=1.at n=8A328125
- Smallest m such that the m-th Lucas number has exactly n divisors that are also Lucas numbers.at n=42A356666
- a(n) is the least number with exactly n divisors of the form 4*k+1.at n=20A364584
- a(n) = A160014(m, n) * a(n - 1) for m = 2 and n > 0, a(0) = 1.at n=6A368092
- Cumulative products of the generalized Clausen numbers. Array read by ascending antidiagonals.at n=42A368093