0,3

J. Sondow, A faster product for Pi and a new integral for ln Pi/2, Amer. Math. Monthly 112 (2005) 729-734.

J. Baez, This Week's Finds in Mathematical Physics

J. Guillera and J. Sondow, Double integrals and infinite products for some classical constants via analytic continuations of Lerch's transcendent

a(n) = product(k = 1...floor(n/2)+1, (2k-1)^binomial(n,2k-2)).

Pi/2 = (2/1)^(1/2) * (4/3)^(1/4) * (32/27)^(1/8) *

(4096/3645)^(1/16) * ...,

e = (2/1)^(1/1) * (4/3)^(1/2) * (32/27)^(1/3) * (4096/3645)^(1/4) * ... and

e^gamma = (2/1)^(1/2) * (4/3)^(1/3) * (32/27)^(1/4) * (4096/3645)^(1/5) *

...

Table[Product[(2k-1)^Binomial[n, 2k-2], {k, 1+Floor[n/2]}], {n, 0, 8}] - T. D. Noe (noe(AT)sspectra.com), Nov 16 2006

Cf. A092799. Numerators are A122216. Reduced denominators are A122215.

Sequence in context: A009039 A137092 A122215 this_sequence A068221 A068222 A055777

Adjacent sequences: A122214 A122215 A122216 this_sequence A122218 A122219 A122220

frac,nonn

Jonathan Sondow (jsondow(AT)alumni.princeton.edu), Aug 26 2006

Corrected by T. D. Noe (noe(AT)sspectra.com), Nov 16 2006