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Search: id:A034839
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| A034839 |
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Triangular array formed by taking every other term of each row of Pascal's triangle. |
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12
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| 1, 1, 1, 1, 1, 3, 1, 6, 1, 1, 10, 5, 1, 15, 15, 1, 1, 21, 35, 7, 1, 28, 70, 28, 1, 1, 36, 126, 84, 9, 1, 45, 210, 210, 45, 1, 1, 55, 330, 462, 165, 11, 1, 66, 495, 924, 495, 66, 1, 1, 78, 715, 1716, 1287, 286, 13
(list; graph; listen)
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OFFSET
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0,6
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COMMENT
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Number of compositions of n having k parts greater than 1. Example: T(5,2)=5 because we have 3+2, 2+3, 2+2+1, 2+1+2 and 1+2+2. Number of binary words of length n-1 having k runs of consecutive 1's. Example: T(5,2)=5 because we have 1010, 1001, 0101, 1101 and 1011. - Emeric Deutsch (deutsch(AT)duke.poly.edu), Mar 30 2005
Contribution from Gary W. Adamson (qntmpkt(AT)yahoo.com), Oct 17 2008: (Start)
Received from Herb Conn; Custer, SD:
Let T = tan x, then
tan x = T
tan 2x = 2T / (1 - T^2)
tan 3x = (3T - T^3) / (1 - 3T^2)
tan 4x = (4T - 4T^3) / (1 - 6T^2 + T^4)
tan 5x = (5T - 10T^3 + T^5) / (1 - 10T^2 + 5T^4)
tan 6x = (6T - 20T^3 + 6T^5) / (1 - 15T^2 + 15T^4 - T^6)
tan 7x = (7T - 35T^3 + 21T^5 - T^7) / (1 - 21T^2 + 35T^4 - 7T^6)
tax 8x = (8T - 56T^3 + 56T^5 - 8T^7) /
(1 - 28T^2 + 70T^4 - 28T^6 + T^8)
tan 9x = (9T - 84T^3 + 126T^5 - 36T^7 + T^9) /
(1 - 36 T^2 + 126T^4 - 84T^6 + 9T^8)
... To get the next one in the series, (tan 10x), for the numerator add:
9....84....126....36....1 previous numerator +
1....36....126....84....9 previous denominator =
10..120....252...120...10 = new numerator
For the denominator add:
......9.....84...126...36...1 = previous numerator +
1....36....126....84....9.... = previous denominator =
1....45....210...210...45...1 = new denominator
...where numerators = A034867, denominators = A034839
(End)
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LINKS
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Eric Weisstein's World of Mathematics, Tangent [From Eric W. Weisstein (eric(AT)weisstein.com), Oct 18 2008]
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FORMULA
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E.g.f.: exp(x)*cosh(x*sqrt(y)). - Vladeta Jovovic (vladeta(AT)eunet.rs), Mar 20 2005
T(n, k)=binomial(n, 2k). G.f.=(1-z)/[(1-z)^2-tz^2]. - Emeric Deutsch (deutsch(AT)duke.poly.edu), Mar 30 2005
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EXAMPLE
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1; 1; 1, 1; 1, 3; 1, 6, 1; 1, 10, 5; 1, 15, 15, 1;...
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MAPLE
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for n from 0 to 13 do seq(binomial(n, 2*k), k=0..floor(n/2)) od; # yields sequence in triangular form (Deutsch)
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CROSSREFS
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Cf. A007318.
Cf. A034867.
Cf. A034867.
Sequence in context: A127096 A128489 A130541 this_sequence A089732 A158905 A098076
Adjacent sequences: A034836 A034837 A034838 this_sequence A034840 A034841 A034842
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KEYWORD
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nonn,easy,tabf
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AUTHOR
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N. J. A. Sloane (njas(AT)research.att.com).
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