-102
domain: Z
Appears in sequences
- Expansion of Product_{k >= 1} (1 - x^k)^6.at n=37A000729
- Expansion of Product_{m>=1} (1+q^m)^(-6).at n=5A022601
- Expansion of Product_{m>=1} ((1+q^(2*m-1))/(1+q^(2*m)))^6.at n=7A029843
- Expansion of (eta(q^3)*eta(q^5))^3 in powers of q.at n=68A030220
- Shifts left under Weigh transform.at n=22A038073
- a(n+1) = a(n) - n (if n is odd), a(n+1) = a(n) * n (if n is even).at n=6A047906
- Matrix 6th power of inverse partition triangle A038498.at n=68A050309
- Coefficients of the '6th-order' mock theta function gamma(q).at n=71A053274
- Coefficients of the '10th-order' mock theta function X(q).at n=65A053283
- Sum_{d=1..n} phi(d)*mu(d).at n=31A054585
- Sum_{d=1..n} phi(d)*mu(d).at n=32A054585
- a(n) = n^2 - primefloor(n)*primeceiling(n).at n=53A056139
- a(n) = n^2 - previousprime(n)*nextprime(n), for n>2.at n=52A056140
- Numbers k such that 36*k^2 + 12*k + 7 is prime (sorted by absolute values with negatives before positives).at n=36A056910
- McKay-Thompson series of class 8b for Monster.at n=10A058088
- McKay-Thompson series of class 24D for the Monster group.at n=42A058574
- McKay-Thompson series of class 30a for Monster.at n=12A058619
- Differences between the primes generating the n-th prime power.at n=56A068389
- Expansion of Product_{k>=1} 1/(1+2*x^k).at n=7A071109
- a(n) = A023194 - A062700(n). Negative values of A071166(m) = m-A006530(A000203(m)) differences. In these cases m is square number from A023194.at n=14A071167