79464
domain: N
Appears in sequences
- Order of the group SL(2,Z_n).at n=42A000056
- Shifts left under "CFJ" (necklace, size, labeled) transform.at n=9A032138
- a(n) = (2*n+2)*(2*n+3)*(2*n+4) = 24*A000330(n+1).at n=20A069074
- Number of conjugacy classes in the group GL(3,Z_n).at n=42A086768
- a(n) = n*(n+1)*(n+2)*(n+4)*(n+23)/120.at n=19A101855
- Product of three numbers: n-th prime, previous number, and following number.at n=13A127917
- a(n) = 3*n*(3*n + 1)*(3*n + 2).at n=13A228889
- Exponent of the group of 2 X 2 invertible matrices over Z/nZ.at n=42A229292
- Number of bracelets (turnover necklaces) of length n that have no reflection symmetry and consist of 6 white beads and n-6 black beads.at n=35A308401
- Exponent of the group GL(2, Z_n).at n=42A327568
- Orders of the finite groups SL_2(K) when K is a finite field with q = A246655(n) elements.at n=20A329119
- Orders of the finite groups PGammaL_2(K) when K is a finite field with q = A246655(n) elements.at n=20A352807
- a(n) = (1/n) * Sum_{k = 0..2*n} (-1)^k * (n+2*k) * binomial(n+k-1,k)^3.at n=2A361886
- The least totient number k with exactly n solutions to the equation phi(x) = k, where all the solutions are nontotient numbers (A007617).at n=18A378510