-29
domain: Z
Appears in sequences
- Let A(n) = #{(i,j): i^2 + j^2 <= n}, V(n) = Pi*n, P(n) = A(n) - V(n); A000099 gives values of n where |P(n)| sets a new record; sequence gives closest integer to P(A000099(n)).at n=23A000036
- Let A(n) = #{(i,j): i^2 + j^2 <= n}, V(n) = Pi*n, P(n) = A(n) - V(n); A000099 gives values of n where |P(n)| sets a new record; sequence gives closest integer to P(A000099(n)).at n=22A000036
- Canonical enumeration of integers: interleaved positive and negative integers with zero prepended.at n=58A001057
- The negative integers.at n=28A001478
- a(n) = -n.at n=29A001489
- Generalized sum of divisors function: excess of sum of odd divisors of n over sum of even divisors of n.at n=15A002129
- Coefficients in the expansion of B^2*C^3 in Watson's notation of page 118.at n=56A002300
- Numerator of constant term in polynomial arising from numerical integration formula.at n=2A002669
- Power series expansion of the Rogers-Ramanujan continued fraction 1+x/(1+x^2/(1+x^3/(1+x^4/(1+...)))).at n=52A003823
- Percolation series for hexagonal lattice.at n=9A006803
- From fundamental unit of Z[ (-n)^{1/4} ].at n=38A006831
- Unique attractor for (RIGHT then MOBIUS) transform.at n=41A007554
- Expansion of tanh(log(1+sin(x))).at n=5A009771
- Expansion of tanh(log(1+sinh(x))).at n=5A009772
- Expansion of Product_{k>=1} (1-x^k)^29.at n=1A010834
- Zeroth row of infinite Latin square heading to +oo.at n=19A019570
- Zeroth row of infinite Latin square heading to -oo.at n=20A019585
- Expansion of Product_{m>=1} (1+q^m)^(-29).at n=1A022624
- Expansion of Product_{m>=1} (1-m*q^m)^29.at n=1A022689
- Expansion of Product_{m>=1} (1+m*q^m)^-29.at n=1A022721