26936
domain: N
Appears in sequences
- Differences between two positive cubes in exactly 3 ways.at n=1A014441
- Every run of digits of n in base 3 has length 2.at n=37A033001
- Difference between two positive cubes in more than one way.at n=17A034179
- Sum of two (possibly negative) cubes in at least 3 ways.at n=6A051383
- Seventh column of quintinomial coefficients.at n=12A064056
- Table M(n,b) (columns: n >= 1, rows: b >= 0) gives the number of site swap juggling patterns with exact period n, using exactly b balls, where cyclic shifts are not counted as distinct.at n=69A065177
- Number of site swap patterns with 3 balls and exact period n.at n=8A065179
- Numbers k such that reverse(gpf(k)) = gpf(k+1), where gpf(n) = A006530(n); a(1)=1.at n=34A071844
- Least k such that decimal representation of k*n contains only digits 0 and 8.at n=32A096687
- A110404(k)/k where k is the corresponding number == 1,3,7 or 9 (mod 10).at n=10A110405
- a(1) = 2, a(n) = (n-th-even n^3) - (sum of previous terms).at n=34A181509
- a(n) = 288*binomial(2*n,n-5) + 8*Sum_{i=1..n-5} binomial(2*n,n-5-i)*(5+i).at n=7A182026
- Number of nondecreasing arrangements of n+2 numbers in 0..8 with the last equal to 8 and each after the second equal to the sum of one or two of the preceding three.at n=40A190040
- Degrees of irreducible representations of Ree group R(27).at n=32A214486
- Degrees of irreducible representations of Ree group R(27).at n=33A214486
- Degrees of irreducible representations of Ree group R(27).at n=34A214486
- Differences between two positive cubes in more than two ways.at n=1A265625
- a(n) is the number of permutations of length n that avoid the pattern 321 and the mesh pattern (12, 106) or the same sequence for the mesh patterns (12, 122), (12, 142), (12, 158), (12, 172), (12, 188), (12, 226), (12, 242).at n=12A289453
- Number of 6-cycles in the n-polygon diagonal intersection graph.at n=25A300554
- Total volume of all rectangular prisms with dimensions r X s X t where r, s and t are the smallest, middle and largest parts in each partition of n into 3 parts.at n=27A307684