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Index to OEIS: Section Ga

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G.C.D.: see entries under GCD
g.c.d.: see entries under GCD
G.F.: see generating functions
g.f.: see generating functions
Gaelic: A001368
Gaelic: see also Index entries for sequences related to number of letters in n
Galego: see also Index entries for sequences related to number of letters in n

games , sequences related to :

games, born on day n: A047995, A037142, A065401, A065402, A065407

games, Grundy's game: see Grundy's game

games: see also checkers

games: see also chess

games: see also Mancala

games: see also Towers of Hanoi

games: see also under individual names

gamma (Euler-Mascheroni constant), sequences related to :

gamma (Euler-Mascheroni constant): A002852* (continued fraction for), A001620* (decimal expansion of)

gamma function, sequences related to :

gamma function: A005446, A005147, A001164, A005146, A005447, A001163, A068467, A202623

gamma function at 1/k: A002161 (2), A073005 (3), A175380 (5), A175379 (6), A220086 (7), A203142 (8), A203140 (12), A203139 (16), A203138 (24), A203137 (48)

gamma function at t/k, t>1: A073006 (2/3), A202523 (4/3), A220605 (2/7), A019704 (3/2), A068465 (3/4), A220608 (3/7), A203143 (3/8), A220609 (4/7), A203129 (5/3), A068467 (5/4), A203145 (5/6), A220606 (5/7), A220607 (6/7),

gamma function: see also factorials

gaps: A002386, A005250, A002540, A000101, A000230, A000232, A001549, A001632
gaps: see also primes, gaps between
gates:: A005610, A005611, A005609, A005608
Gauss-Kuzmin-Wirsing constant: A038517

Gaussian binomial (or q-binomial) coefficients, sequences related to :

Gaussian or q-binomial coefficients [n,k]_q (= q-integers (q^n-1)/(q-1) for k=1; [n,k]_q = 1 (A000012) for k=0):

q = 2 : A000225, A006095, A006096, A006097, A006110 (k=5), A022189, A022190, A022191, A022192, A022193, A022194, A022195 (k=12); A006098 [2n,n], A006099 [n,n/2], A006116 (sum)

q = 3 : A003462. A006100, A006101, A006102, A022196 (k=5), A022197, A022198, A022199, A022200, A022201, A022202, A022203 (k=12); A006103 [2n,n], A006104 [n,n/2], A006117 (sum).

q = 4 : A002450, A006105, A006106, A006107, A022204 (k=5), A022205, A022206, A022207, A022208, A022209, A022210, A022211 (k=12); A006108 [2n,n], A006109 [n,n/2].

q = 5 : A003463, A006111, A006112, A006113, A022212 (k=5), A022213, A022214, A022215, A022216, A022217, A022218, A022219 (k=12); A006114 [2n,n], A006115 [n,n/2] A006119 (sum).

q = 6 : A003464, A022220, A022221, A022222, A022223 (k=5), A022224, A022225, A022226, A022227, A022228, A022229, A022230 (k=12). A006120 (sum).

q = 7 : A023000, A022231, A022232, A022233, A022234 (k=5), A022235, A022236, A022237, A022238, A022239, A022240, A022241 (k=12). A006121 (sum).

q = 8 : A002452, A022242, A022243, A022244, A022245 (k=5), A022246, A022247, A022248, A022249, A022250, A022251, A022252 (k=12). A006122 (sum).

q = 9 : A002452, A022253, A022254, A022255, A022256 (k=5).

For q = 10,...,25, k = 1: (n,1)_q = (q^(n+1)-1)/(q-1), see partial sums of powers

q = -2: A077925 (k=1), A015249, A015266, A015287, A015305, A015323, A015338, A015356, A015371, A015386, A015405, A015423 (k=12).

q = -3: A014983 (k=1), A015251, A015268, A015288, A015306, A015324, A015340, A015357, A015375, A015388, A015407, A015424 (k=12).

q = -4: A014985 (k=1), A015253, A015271, A015289, A015308, A015326, A015341, A015359, A015376, A015390, A015408, A015425 (k=12).

q = -5: A014986 (k=1), A015255, A015272, A015291, A015309, A015327, A015344, A015360, A015377, A015391, A015409, A015427 (k=12).

q = -6: A014987 (k=1), A015257, A015273, A015292, A015310, A015328, A015345, A015361, A015378, A015392, A015410, A015429 (k=12).

q = -7: A014989 (k=1), A015258, A015275, A015293, A015312, A015330, A015346, A015363, A015379, A015393, A015411, A015430 (k=12).

q = -8: A014990 (k=1), A015259, A015276, A015294, A015313, A015331, A015347, A015364, A015380, A015395, A015413, A015431 (k=12).

q = -9: A014991 (k=1), A015260, A015277, A015295, A015315, A015332, A015349, A015365, A015381, A015397, A015414, A015432 (k=12).

q =-10: A014992 (k=1), A015261, A015278, A015298, A015316, A015333, A015350, A015367, A015382, A015398, A015417, A015433 (k=12).

q =-11: A014993 (k=1), A015262, A015279, A015300, A015317, A015334, A015353, A015368, A015383, A015499, A015418, A015434 (k=12).

q =-12: A014994 (k=1), A015264, A015281, A015302, A015319, A015336, A015354, A015369, A015384, A015401, A015421, A015436 (k=12).

q =-13: A015000 (k=1), A015265, A015286, A015303, A015321, A015337, A015355, A015370, A015385, A015402, A015422, A015438 (k=12).

Gaussian binomial coefficients, Maple code for : A006516 (Maple code only)

Gaussian binomial coefficients, tables of :

q = 2, ..., 24: A022166 (q=2), A022167 (q=3), A022168, A022169, A022170, A022171, A022172, A022173, A022174 (q=10), A022175, A022176, A022177, A022178, A022179, A022180, A022181, A022182, A022183, A022184 (q=20), A022185, A022186, A022187, A022188.

q = -2, ..., -15: A015109 (q=-2), A015110 (q=-3), A015112 (q=-4), A015116 (q=-6), A015117 (q=-7), A015118 (q=-8), A015121 (q=-9), A015123 (q=-10), A015124 (q=-11), A015125 (q=-12), A015129 (q=-13), A015132 (q=-14), A015133 (q=-15).

Gaussian binomial coefficients: (1): A006116 (q=2), A006117, A006118, A006119, A006120, A006121, A006122, A006099, A006098, A006104, A006103, A006109, A006108, A006115

Gaussian binomial coefficients: (2): A006114, A006095, A006100, A006096, A006105, A006097, A006111, A006101, A006110, A006106, A006102, A006112, A006107, A006113

Gaussian integers and primes , sequences related to :

Gaussian integers and primes (1): A002145 A006495 A006496 A027206 A036693 A036694 A036695 A036696 A036697 A036698 A036699 A036700

Gaussian integers and primes (2): A036701 A036702 A036703 A036704 A036705 A036706 A036707 A036708 A036709 A036710 A036711 A036712

Gaussian integers and primes (3): A036713 A036714 A036715 A036716 A045326 A055025 A055026 A055027 A055028 A055029 A055683 A057352

Gaussian integers and primes (4): A057368 A057429 A058767 A058770 A058771 A058772 A058775 A058777 A058778 A058779 A058782 A062327

Gaussian integers and primes (5): A062711 A073253 A078458 A078908 A078909 A078910 A078911

Gaussian primes: A055025, A055026, A055027, A055028, A055029

Gaussian primes: see also entries under Gaussian integers

GCD , sequences related to :

GCD(x,y): A003989*, A050873*, A072030*; A018805 (pairs with gcd = d)

GCD, greedy sequence: see EKG sequence

GCD: A007464, A006579

GCD: the canonical spelling for "greatest common divisor" in the OEIS is GCD (not gcd) (except of course in Maple and PARI lines)

gcd: the canonical spelling for "greatest common divisor" in the OEIS is GCD (not gcd) (except of course in Maple and PARI lines)

• This is a section of the Index to the OEIS®.
• For further information see the main Index to OEIS page.
• Please read Index: Instructions For Updating Index to OEIS before making changes to this page.
• If you did not find what you were looking for in this Index, you can always search the database for a particular word or phrase.
• Full list of sections: