2,1

A158620(n) = PRODUCT[k=2..n](k^3-1). A158621(n) = PRODUCT[k=2..n](k^3+1). A158622(n) is the numerator of the reduced fraction A158620(n)/A158621(n). A158623(n) is the denominator of the reduced fraction A158620(n)/A158621(n). The reduced fractions are 7/9, 13/18, 7/10, 31/45, 43/63, 19/28, 73/108, 91/135, 37/55, 133/198, ...

Is this the same as A046163? [From R. J. Mathar (mathar(AT)strw.leidenuniv.nl), Mar 27 2009]

numerator of (PRODUCT[k=2..n](k^3-1))/PRODUCT[k=2..n](k^3+1) = numerator of PRODUCT[k=2..n]A068601(k)/A001093(k).

A158620(n)/A158621(n) = 2(n^2+n+1)/(3n(n+1)). [From R. J. Mathar (mathar(AT)strw.leidenuniv.nl), Mar 27 2009]

a(2) = 7 = numerator of (2^3-1)/2^3+1 = 7/9. a(3) = 13 = numerator of ((2^3-1)*(3^3-1))/((2^3+1)*(3^3+1)) = (7 * 26)/ (9 * 28) = 182/252 = 13/18. a(4) = 7 = = numerator of ((2^3-1)*(3^3-1)*(4^3-1))/((2^3+1)*(3^3+1)*(4^3+1)) = (7 * 26 * 63)/(9 * 28 * 65) = 11466/16380 = 7/10. a(5) = 31 = numerator of ((2^3-1)(3^3-1)(4^3-1)(5^3-1))/((2^3+1)(3^3+1)(4^3+1)(5^3+1)) = 1421784/2063880 = 31/45.

A158622 := proc(n) 2*(n^2+n+1)/3/n/(n+1) ; numer(%) ; end: seq(A158622(n), n=2..100) ; [From R. J. Mathar (mathar(AT)strw.leidenuniv.nl), Mar 27 2009]

Cf. A001093, A016921, A068601, A158620-A158621, A158623.

Sequence in context: A081257 A046163 A130770 this_sequence A122874 A066003 A115858

Adjacent sequences: A158619 A158620 A158621 this_sequence A158623 A158624 A158625

easy,nonn

Jonathan Vos Post (jvospost3(AT)gmail.com), Mar 23 2009

More terms from R. J. Mathar (mathar(AT)strw.leidenuniv.nl), Mar 27 2009