Sequences
392,541 sequences
- a(n) = 5-n.A022961
a(n) = 5-n.
- a(n) = 6-n.A022962
a(n) = 6-n.
- a(n) = 7-n.A022963
a(n) = 7-n.
- a(n) = 8-n.A022964
a(n) = 8-n.
- a(n) = 9-n.A022965
a(n) = 9-n.
- a(n) = 10-n.A022966
a(n) = 10-n.
- a(n) = 11-n.A022967
a(n) = 11-n.
- a(n) = 12-n.A022968
a(n) = 12-n.
- a(n) = 13-n.A022969
a(n) = 13-n.
- a(n) = 14-n.A022970
a(n) = 14-n.
- a(n) = 15-n.A022971
a(n) = 15-n.
- a(n) = 16-n.A022972
a(n) = 16-n.
- a(n) = 17-n.A022973
a(n) = 17-n.
- a(n) = 18-n.A022974
a(n) = 18-n.
- a(n) = 19 - n.A022975
a(n) = 19 - n.
- a(n) = 20-n.A022976
a(n) = 20-n.
- a(n) = 21-n.A022977
a(n) = 21-n.
- a(n) = 22-n.A022978
a(n) = 22-n.
- a(n) = 23-n.A022979
a(n) = 23-n.
- a(n) = 24-n.A022980
a(n) = 24-n.
- a(n) = 25-n.A022981
a(n) = 25-n.
- a(n) = 26-n.A022982
a(n) = 26-n.
- a(n) = 27 - n.A022983
a(n) = 27 - n.
- a(n) = 28-n.A022984
a(n) = 28-n.
- a(n) = 29 - n.A022985
a(n) = 29 - n.
- a(n) = 30 - n.A022986
a(n) = 30 - n.
- a(n) = 31 - n.A022987
a(n) = 31 - n.
- a(n) = 32 - n.A022988
a(n) = 32 - n.
- a(n) = 33-n.A022989
a(n) = 33-n.
- a(n) = 34-n.A022990
a(n) = 34-n.
- a(n) = 35-n.A022991
a(n) = 35-n.
- a(n) = 36-n.A022992
a(n) = 36-n.
- a(n) = 37 - n.A022993
a(n) = 37 - n.
- a(n) = 38 - n.A022994
a(n) = 38 - n.
- a(n) = 39 - n.A022995
a(n) = 39 - n.
- a(n) = 40-n.A022996
a(n) = 40-n.
- Numerator of n*(n-2)*(2*n-1)/(2*(n-1)).A022997
Numerator of n*(n-2)*(2*n-1)/(2*(n-1)).
- If n is odd then n, otherwise 2n.A022998
If n is odd then n, otherwise 2n.
- Areas for which ApSimon's diagonal point triangle problem has no solution.A022999
Areas for which ApSimon's diagonal point triangle problem has no solution.
- a(n) = (7^n - 1)/6.A023000
a(n) = (7^n - 1)/6.
- a(n) = (8^n - 1)/7.A023001
a(n) = (8^n - 1)/7.
- Sum of 10th powers.A023002
Sum of 10th powers.
- Number of partitions of n into parts of 4 kinds.A023003
Number of partitions of n into parts of 4 kinds.
- Number of partitions of n into parts of 5 kinds.A023004
Number of partitions of n into parts of 5 kinds.
- Number of partitions of n into parts of 6 kinds.A023005
Number of partitions of n into parts of 6 kinds.
- Number of partitions of n into parts of 7 kinds.A023006
Number of partitions of n into parts of 7 kinds.
- Number of partitions of n into parts of 8 kinds.A023007
Number of partitions of n into parts of 8 kinds.
- Number of partitions of n into parts of 9 kinds.A023008
Number of partitions of n into parts of 9 kinds.
- Number of partitions of n into parts of 10 kinds.A023009
Number of partitions of n into parts of 10 kinds.
- Number of partitions of n into parts of 11 kinds.A023010
Number of partitions of n into parts of 11 kinds.