24167
domain: N
Appears in sequences
- Row 5 of array in A047666.at n=10A047669
- a(n) = Sum{a(k): k=0,1,2,...,n-4,n-2,n-1}; a(n-3) is not a summand; initial terms are 2,3,4.at n=16A049876
- a(n) = Sum_{k=0..n} (-1)^(n-k)*A000041(k).at n=41A087787
- For a given unrestricted partition pi, let P(pi)=lambda(pi), if mu(pi)=0. If mu(pi)>0 then let P(pi)=nu(pi), where nu(pi) is the number of parts of pi greater than mu(pi), mu(pi) is the number of ones in pi and lambda(pi) is the largest part of pi.at n=40A100818
- Composite numbers whose exponents in their canonical factorization lie in the geometric progression 1, 3, 9, ...at n=18A102838
- Numbers of the form (11^i)*(13^j).at n=13A108090
- Prime-factorization encoded partition code for the Łukasiewicz-word, variant of A129593.at n=24A129599
- Prime-factorization encoded partition code for the Łukasiewicz-word, variant of A129593.at n=25A129599
- Prime-factorization encoded partition code for the Łukasiewicz-word, variant of A129593.at n=28A129599
- Prime-factorization encoded partition code for the Łukasiewicz-word, variant of A129593.at n=31A129599
- Prime-factorization encoded partition code for the Łukasiewicz-word, variant of A129593.at n=37A129599
- Prime-factorization encoded partition code for the Łukasiewicz-word, variant of A129593.at n=44A129599
- a(n) = 1331*n - 1122.at n=18A157441
- Number of 2's in the last section of the set of partitions of n.at n=43A182712
- Number of 2's in all partitions of 2n+1 that do not contain 1 as a part.at n=21A182717
- Numbers n with property that the largest proper divisor of n is a cube.at n=38A187104
- Number of compositions of n such that the number of parts is not divisible by the greatest part.at n=15A199884
- Number of (n+4) X 9 0..1 matrices with each 5 X 5 subblock idempotent.at n=14A224687
- Number of partitions of n not having depth 1; see Comments.at n=42A238003
- Partial sums of the number of active (ON, black) cells in n-th stage of growth of two-dimensional cellular automaton defined by "Rule 801", based on the 5-celled von Neumann neighborhood.at n=28A273575