403201
domain: N
Appears in sequences
- Numerators of continued fraction convergents to sqrt(14).at n=15A041020
- Numerators of continued fraction convergents to sqrt(56).at n=7A041096
- Numerators of continued fraction convergents to sqrt(126).at n=7A041228
- Numerators of continued fraction convergents to sqrt(224).at n=7A041418
- Numerators of continued fraction convergents to sqrt(350).at n=11A041662
- Numerators of continued fraction convergents to sqrt(504).at n=7A041962
- Numerators of continued fraction convergents to sqrt(896).at n=7A042732
- Chebyshev T-polynomials T(n,15) with Diophantine property.at n=4A068203
- Smallest semiprime with same leading digits as n!.at n=7A095192
- n! concatenated with n divided by n.at n=8A110414
- a(n) = (n!+9)/9.at n=4A139156
- a(n) = ChebyshevT(4, n).at n=15A144130
- a(n) = 1250*n^2 - 100*n + 1.at n=17A154374
- a(n) = 648*n^2 - 72*n + 1.at n=24A154514
- a(n) = 10368*n^2 - 15840*n + 6049.at n=6A157264
- a(n) = 2048n^2 + 128n + 1.at n=13A157476
- a(n) = 5000*n^2 - 200*n + 1.at n=8A157516
- 80000n^2 - 120800n + 45601.at n=2A157628
- a(n) = 103680000*n^2 - 194428800*n + 91152001.at n=0A157826
- a(n) is the smallest k > 1 such that A000166(k) is divisible by n!.at n=10A293246