36864
domain: N
Appears in sequences
- a(n) = 9*4^n.at n=6A002063
- Expansion of g.f.: (1+x)/(1-8*x).at n=5A003951
- a(n) = 9*2^n.at n=12A005010
- Smallest number with exactly n divisors.at n=38A005179
- Exponential self-convolution of Pell numbers.at n=8A006646
- Theta series of laminated lattice LAMBDA_12^{max}.at n=5A006914
- The minimal numbers: sequence A005179 arranged in increasing order.at n=48A007416
- a(n) = floor(n/5)*floor((n+1)/5)*floor((n+2)/5)*floor((n+3)/5)*floor((n+4)/5).at n=41A008382
- a(n) = Product_{i=0..7} floor((n+i)/8).at n=30A009694
- Apply partial sum operator thrice to Stern's sequence.at n=14A014173
- a(n) = (6*n)^2.at n=32A016910
- a(n) = (7*n + 3)^2.at n=27A017018
- a(n) = (8*n)^2.at n=24A017066
- a(n) = (9*n + 3)^2.at n=21A017198
- a(n) = (10*n + 2)^2.at n=19A017294
- a(n) = (11*n + 5)^2.at n=17A017450
- a(n) = (12*n)^2.at n=16A017522
- Numbers of form 2^i*9^j, with i, j >= 0.at n=46A025611
- Numbers of form 3^i*4^j, with i, j >= 0.at n=45A025613
- Numbers of form 3^i*8^j, with i, j >= 0.at n=31A025615