Sequences
392,541 sequences
- Defined by a chi-inequality greedy algorithm.A014011
Defined by a chi-inequality greedy algorithm.
- Engel expansion of 1/Pi.A014012
Engel expansion of 1/Pi.
- Alternating Egyptian fraction expansion of Pi-3.A014013
Alternating Egyptian fraction expansion of Pi-3.
- Alternating Engel expansion of Pi.A014014
Alternating Engel expansion of Pi.
- Denominators of sign-alternating Egyptian fraction expansion of e - 2.A014015
Denominators of sign-alternating Egyptian fraction expansion of e - 2.
- Expansion of inverse of 7th cyclotomic polynomial; period 7: repeat [1, -1, 0, 0, 0, 0, 0].A014016
Expansion of inverse of 7th cyclotomic polynomial; period 7: repeat [1, -1, 0, 0, 0, 0, 0].
- Inverse of 8th cyclotomic polynomial.A014017
Inverse of 8th cyclotomic polynomial.
- Inverse of 9th cyclotomic polynomial.A014018
Inverse of 9th cyclotomic polynomial.
- Inverse of 10th cyclotomic polynomial.A014019
Inverse of 10th cyclotomic polynomial.
- Inverse of 11th cyclotomic polynomial.A014020
Inverse of 11th cyclotomic polynomial.
- Inverse of 12th cyclotomic polynomial.A014021
Inverse of 12th cyclotomic polynomial.
- Inverse of 13th cyclotomic polynomial.A014022
Inverse of 13th cyclotomic polynomial.
- Inverse of 14th cyclotomic polynomial.A014023
Inverse of 14th cyclotomic polynomial.
- Inverse of 15th cyclotomic polynomial.A014024
Inverse of 15th cyclotomic polynomial.
- Expansion of the inverse of the 16th cyclotomic polynomial.A014025
Expansion of the inverse of the 16th cyclotomic polynomial.
- Inverse of 17th cyclotomic polynomial.A014026
Inverse of 17th cyclotomic polynomial.
- Inverse of 18th cyclotomic polynomial.A014027
Inverse of 18th cyclotomic polynomial.
- Inverse of 19th cyclotomic polynomial.A014028
Inverse of 19th cyclotomic polynomial.
- Inverse of 20th cyclotomic polynomial.A014029
Inverse of 20th cyclotomic polynomial.
- Inverse of 21st cyclotomic polynomial.A014030
Inverse of 21st cyclotomic polynomial.
- Inverse of 22nd cyclotomic polynomial.A014031
Inverse of 22nd cyclotomic polynomial.
- Inverse of 23rd cyclotomic polynomial.A014032
Inverse of 23rd cyclotomic polynomial.
- Inverse of 24th cyclotomic polynomial.A014033
Inverse of 24th cyclotomic polynomial.
- Inverse of 25th cyclotomic polynomial.A014034
Inverse of 25th cyclotomic polynomial.
- Inverse of 26th cyclotomic polynomial.A014035
Inverse of 26th cyclotomic polynomial.
- Inverse of 27th cyclotomic polynomial.A014036
Inverse of 27th cyclotomic polynomial.
- Inverse of 28th cyclotomic polynomial.A014037
Inverse of 28th cyclotomic polynomial.
- Inverse of 29th cyclotomic polynomial.A014038
Inverse of 29th cyclotomic polynomial.
- Inverse of 30th cyclotomic polynomial.A014039
Inverse of 30th cyclotomic polynomial.
- Inverse of 31st cyclotomic polynomial.A014040
Inverse of 31st cyclotomic polynomial.
- Inverse of 32nd cyclotomic polynomial.A014041
Inverse of 32nd cyclotomic polynomial.
- Inverse of 33rd cyclotomic polynomial.A014042
Inverse of 33rd cyclotomic polynomial.
- Inverse of 34th cyclotomic polynomial.A014043
Inverse of 34th cyclotomic polynomial.
- Inverse of 35th cyclotomic polynomial.A014044
Inverse of 35th cyclotomic polynomial.
- Inverse of 36th cyclotomic polynomial.A014045
Inverse of 36th cyclotomic polynomial.
- Second coordinate of fundamental unit of real quadratic field with discriminant A003658(n), n >= 2.A014046
Second coordinate of fundamental unit of real quadratic field with discriminant A003658(n), n >= 2.
- Inverse of 38th cyclotomic polynomial.A014047
Inverse of 38th cyclotomic polynomial.
- Inverse of 39th cyclotomic polynomial.A014048
Inverse of 39th cyclotomic polynomial.
- Inverse of 40th cyclotomic polynomial.A014049
Inverse of 40th cyclotomic polynomial.
- a(n) = (n^2+1)^n.A014050
a(n) = (n^2+1)^n.
- Inverse of 42nd cyclotomic polynomial.A014051
Inverse of 42nd cyclotomic polynomial.
- a(n) = floor((n+1/n)^n).A014052
a(n) = floor((n+1/n)^n).
- Inverse of 44th cyclotomic polynomial.A014053
Inverse of 44th cyclotomic polynomial.
- Inverse of 45th cyclotomic polynomial.A014054
Inverse of 45th cyclotomic polynomial.
- Inverse of 46th cyclotomic polynomial.A014055
Inverse of 46th cyclotomic polynomial.
- a(n) = round( (n + 1/n)^n ).A014056
a(n) = round( (n + 1/n)^n ).
- Inverse of 48th cyclotomic polynomial.A014057
Inverse of 48th cyclotomic polynomial.
- a(n) = ceiling((n+1/n)^n).A014058
a(n) = ceiling((n+1/n)^n).
- Inverse of 50th cyclotomic polynomial.A014059
Inverse of 50th cyclotomic polynomial.
- Inverse of 51st cyclotomic polynomial.A014060
Inverse of 51st cyclotomic polynomial.