Search: id:A010370 Results 1-1 of 1 results found. %I A010370 %S A010370 1,4,12,80,700,7056,77616,906048,11042460,139053200,1796567344, %T A010370 23696871744,317933029232,4326899214400,59605244280000,829705000377600, %U A010370 11654762427179100,165021757273414800,2353088020380174000 %V A010370 1,-4,-12,-80,-700,-7056,-77616,-906048,-11042460,-139053200,-1796567344, %W A010370 -23696871744,-317933029232,-4326899214400,-59605244280000,-829705000377600, %X A010370 -11654762427179100,-165021757273414800,-2353088020380174000 %N A010370 C(2*n,n)^2 / (1-2*n). %C A010370 Expansion of hypergeometric function F(-1/2,1/2;1;16x). %C A010370 Expansion of E(m)/(pi/2) in powers of m/16=(k/4)^2, where E(m) is complete elliptic integral of second kind evaluated at m. - Michael Somos, Mar 04 2003 %D A010370 M. Abramowitz and I. A. Stegun, eds., Handbook of Mathematical Functions, National Bureau of Standards Applied Math. Series 55, 1964 (and various reprintings), p. 591. %D A010370 J. M. Borwein and P. B. Borwein, Pi and the AGM, Wiley, 1987, p. 8. %H A010370 M. Abramowitz and I. A. Stegun, eds., Handbook of Mathematical Functions, National Bureau of Standards, Applied Math. Series 55, Tenth Printing, 1972 [alternative scanned copy]. %F A010370 a(n) ~ 1/2*pi^-1*n^-2*2^(4*n) %F A010370 G.f.: F(-1/2, 1/2;1;16x) = E(16x)/(pi/2). a(n)=C(2*n, n)^2/(1-2*n). - Michael Somos, Mar 04 2003 %F A010370 E.g.f. Sum_{n>=0} a(n)*(x/2)^(2n)/(2n)! = I0^2*(1-2*x^2) +2*x*I0*I1 +2*x^2*I1^2 where I0=BesselI(0, x), I1=BesselI(1, x) . - Michael Somos Jun 22 2005 %t A010370 CoefficientList[Series[EllipticE[16x]2/Pi, {x, 0, 20}], x] %o A010370 (PARI) a(n)=if(n<0,0,binomial(2*n,n)^2/(1-2*n)) %Y A010370 Cf. A002894, A002420. a(n)=-4*A000891(n-1), n>0. %Y A010370 Sequence in context: A078628 A165261 A027145 this_sequence A081214 A064280 A096424 %Y A010370 Adjacent sequences: A010367 A010368 A010369 this_sequence A010371 A010372 A010373 %K A010370 sign,easy %O A010370 0,2 %A A010370 Joe Keane (jgk(AT)jgk.org) %E A010370 Additional comments from Michael Somos, Dec 13 2002 Search completed in 0.001 seconds