Sequences
392,541 sequences
- Decimal expansion of Pi^2/6 = zeta(2) = Sum_{m>=1} 1/m^2.A013661
Decimal expansion of Pi^2/6 = zeta(2) = Sum_{m>=1} 1/m^2.
- Decimal expansion of zeta(4).A013662
Decimal expansion of zeta(4).
- Decimal expansion of zeta(5).A013663
Decimal expansion of zeta(5).
- Decimal expansion of zeta(6).A013664
Decimal expansion of zeta(6).
- Decimal expansion of zeta(7).A013665
Decimal expansion of zeta(7).
- Decimal expansion of zeta(8).A013666
Decimal expansion of zeta(8).
- Decimal expansion of zeta(9).A013667
Decimal expansion of zeta(9).
- Decimal expansion of zeta(10).A013668
Decimal expansion of zeta(10).
- Decimal expansion of zeta(11).A013669
Decimal expansion of zeta(11).
- Decimal expansion of zeta(12).A013670
Decimal expansion of zeta(12).
- Decimal expansion of zeta(13).A013671
Decimal expansion of zeta(13).
- Decimal expansion of zeta(14).A013672
Decimal expansion of zeta(14).
- Decimal expansion of zeta(15).A013673
Decimal expansion of zeta(15).
- Decimal expansion of zeta(16).A013674
Decimal expansion of zeta(16).
- Decimal expansion of zeta(17).A013675
Decimal expansion of zeta(17).
- Decimal expansion of zeta(18).A013676
Decimal expansion of zeta(18).
- Decimal expansion of zeta(19).A013677
Decimal expansion of zeta(19).
- Decimal expansion of zeta(20).A013678
Decimal expansion of zeta(20).
- Continued fraction for zeta(2) = Pi^2/6.A013679
Continued fraction for zeta(2) = Pi^2/6.
- Continued fraction for zeta(4).A013680
Continued fraction for zeta(4).
- Continued fraction for zeta(5).A013681
Continued fraction for zeta(5).
- Continued fraction for zeta(6).A013682
Continued fraction for zeta(6).
- Continued fraction for zeta(7).A013683
Continued fraction for zeta(7).
- Continued fraction for zeta(8).A013684
Continued fraction for zeta(8).
- Continued fraction for zeta(9).A013685
Continued fraction for zeta(9).
- Continued fraction for zeta(10).A013686
Continued fraction for zeta(10).
- Continued fraction for zeta(11).A013687
Continued fraction for zeta(11).
- Continued fraction for zeta(12).A013688
Continued fraction for zeta(12).
- Continued fraction for zeta(13).A013689
Continued fraction for zeta(13).
- Continued fraction for zeta(14).A013690
Continued fraction for zeta(14).
- Continued fraction for zeta(15).A013691
Continued fraction for zeta(15).
- Continued fraction for zeta(16).A013692
Continued fraction for zeta(16).
- Continued fraction for zeta(17).A013693
Continued fraction for zeta(17).
- Continued fraction for zeta(18).A013694
Continued fraction for zeta(18).
- Continued fraction for zeta(19).A013695
Continued fraction for zeta(19).
- Continued fraction for zeta(20).A013696
Continued fraction for zeta(20).
- Second term in continued fraction for zeta(n).A013697
Second term in continued fraction for zeta(n).
- a(n) = binomial(3*n+2, n-1).A013698
a(n) = binomial(3*n+2, n-1).
- Degree of variety K_{2,n}^2.A013699
Degree of variety K_{2,n}^2.
- Degree of variety K_{2,n}^3.A013700
Degree of variety K_{2,n}^3.
- Degree of variety K_{2,n}^4.A013701
Degree of variety K_{2,n}^4.
- Degree of variety K_{2,n}^5.A013702
Degree of variety K_{2,n}^5.
- Series(W(exp(1)*(1+x)), x) = sum( a[ n ]/(2^(2*n)*n!), n=0..infinity), where W is the Lambert W function.A013703
Series(W(exp(1)*(1+x)), x) = sum( a[ n ]/(2^(2*n)*n!), n=0..infinity), where W is the Lambert W function.
- Terms in perturbation solution of a heat transfer problem.A013704
Terms in perturbation solution of a heat transfer problem.
- Decimal expansion of 4*Sum_{k=1..500000} (-1)^(k-1)/(2k-1).A013705
Decimal expansion of 4*Sum_{k=1..500000} (-1)^(k-1)/(2k-1).
- Decimal expansion of 2*Sum_{k=1..50000} (-1)^(k-1)/(2k-1).A013706
Decimal expansion of 2*Sum_{k=1..50000} (-1)^(k-1)/(2k-1).
- Decimal expansion of Sum_{k=1..50000} (-1)^(k+1) / k.A013707
Decimal expansion of Sum_{k=1..50000} (-1)^(k+1) / k.
- a(n) = 3^(2*n+1).A013708
a(n) = 3^(2*n+1).
- a(n) = 4^(2*n+1).A013709
a(n) = 4^(2*n+1).
- a(n) = 5^(2*n + 1).A013710
a(n) = 5^(2*n + 1).