93555
domain: N
Appears in sequences
- Denominators of zeta(2*n)/Pi^(2*n).at n=5A002432
- Degrees of irreducible representations of Suzuki group Suz.at n=30A003902
- Degrees of irreducible representations of Suzuki group Suz.at n=31A003902
- Denominators in Taylor series for cot x.at n=5A036278
- Denominators of Taylor series for tan(x + Pi/4).at n=12A046983
- Denominators in expansion of exp(2x)/(1-x).at n=12A053485
- Denominators of coefficients of asymptotic expansion of probability p(n) (see A002816) in powers of 1/n.at n=12A078631
- Floor of Pi^(2*n)/Zeta(2*n).at n=4A100594
- Denominators of coefficients in expansion of x^2*(1-exp(-2*x))^(-2).at n=11A104007
- If n is even then a(n) is the nearest integer to Pi^n/Zeta(n), otherwise a(n) is the nearest integer to (Pi^n - n*e)/Zeta(n).at n=8A111510
- a(n) = NumberOfPartitions(n) * ( tau(n)-1 ).at n=38A141670
- Triangle of the denominators of the coefficients [x^k] P(n,x) defined in A141904.at n=49A142048
- Numbers with exactly 4 distinct odd prime divisors {3,5,7,11}.at n=18A147577
- Denominators of coefficients in expansion of 1/( Sum_{n>=1} x^(n - 1)/(2*n - 1)!! ).at n=5A154289
- Number of reduced words of length n in Coxeter group on 11 generators S_i with relations (S_i)^2 = (S_i S_j)^3 = I.at n=5A162760
- Numbers n such that phi(n) = phi(n+7), with Euler's totient function phi = A000010.at n=38A179189
- Denominators of coefficients in expansion of x/((x^2+1)*arctan(x)), even powers only.at n=5A225149
- a(n) = 3*p(n), where p(n) is the number of partitions of n.at n=39A299473
- a(n) = floor(Pi^n/Zeta(n)).at n=9A309946
- Denominators of expansion of arctanh(tan(x)) (odd powers only).at n=6A335258