%I A127454
%S A127454 8,1,3,7,9,4,1,0,4,6,0,9,1,3,7,2,3,7,6,5,2,9,8,3,8,9,8,4,0,5,3,2,2,3,3,
%T A127454 7,0,0,9,6,7,2,5,3,0,9,7,6,2,4,4,3,7,6,9,5,8,3,5,3,0,9,9,2,2,4,6,3,0,9,
%U A127454 4,1,2,0,5,6,6,0,1,6,0,7,7,8,7,7,6,4,2,8,6,6,5,9,8,8,9,8,1,8,8,1,3,6,5
%N A127454 Decimal expansion of transcendental solution to round pegs in square 
               holes problem.
%C A127454 This value "must be determined numerically. As a result, a round peg 
               fits better into a square hole than a square peg fits into a round 
               hole only for integer dimensions n < 9."
%D A127454 Singmaster, D. "On Round Pegs in Square Holes and Square Pegs in Round 
               Holes." Math. Mag. 37, 335-339, 1964.
%H A127454 Eric Weisstein's World of Mathematics, <a href="http://mathworld.wolfram.com/
               Peg.html">Peg.</a>
%F A127454 Where the real number ratio crosses 1 in (pi^n)(n^(n/2))/(2^2n)(Gamma(1+n/
               2))^2. n such that (pi^n)(n^(n/2)) = (2^2n)(Gamma(1+n/2))^2.
%e A127454 8.1379410460913723765...
%Y A127454 Sequence in context: A019607 A011391 A092515 this_sequence A093602 A011469 
               A140457
%Y A127454 Adjacent sequences: A127451 A127452 A127453 this_sequence A127455 A127456 
               A127457
%K A127454 cons,nonn
%O A127454 1,1
%A A127454 Jonathan Vos Post (jvospost3(AT)gmail.com), Jan 13 2007
%E A127454 More terms from Eric Weisstein (eric(AT)weisstein.com), Jan 15, 2007