10854718875
domain: N
Appears in sequences
- Denominators in the Taylor series for tan(x).at n=8A036279
- Denominators of Taylor series for tan(x + Pi/4).at n=17A046983
- Largest odd divisor of n!.at n=17A049606
- Denominators of the coefficients in exp(2x/(1-x)) power series.at n=16A067655
- a(n) = gcd(n!!, (n-1)!!) where n!! = A006882.at n=34A095987
- a(n) = gcd(n!!, (n-1)!!) where n!! = A006882.at n=35A095987
- Denominators of the coefficients in the Taylor expansion of sec(x) + tan(x) around x=0.at n=17A099617
- Denominator of Cotesian number C(n,2).at n=14A100646
- a(0)=1, a(n) = largest divisor of n! that is coprime to a(n-1).at n=17A135354
- a(n) = denominator(2^(2*n-2)/factorial(2*n-1)).at n=8A156769
- Denominator of Laguerre(n, -8).at n=17A160604
- Denominator of Laguerre(n, -4).at n=17A160612
- Denominator of Laguerre(n, -2).at n=17A160616
- Denominator of Laguerre(n, 2).at n=17A160624
- Denominator of Laguerre(n, 8).at n=17A160639
- Denominator of (4^n*(4^n-1)/2)*B_{2n}/(2n)!, B_{n} Bernoulli number.at n=9A181993
- Denominator of l(n), where l(1)=1, l(2)=2, l(n)=l(n-1)+2*l(n-2)/n.at n=16A209430
- a(n) is the denominator of the probability that n segments of length 2, each placed randomly on a line segment of length 2n, will completely cover the line segment.at n=8A231634
- Denominator of the coefficients in the expansion of 1/W(x) - 1/x where W(x) is the Lambert W function.at n=16A264235
- T(n,m), denominators of coefficients in a power/Fourier series expansion of the plane pendulum's exact differential time dependence.at n=28A274078