%I A075872
%S A075872 1,1,2,5,42,132,1144,3978,35530,690690,2731365,50067108,429757960,
%T A075872 1822766520,15991836267,280086337895,4703540164785,21512315482350,
%U A075872 360471372561300,3174207914954076,14859478810664136,248599618581498860
%N A075872 Quotient C[p(n),n]/p(n) where p(n) = n-th prime.
%C A075872 A prime p divides all the entries (binomial coefficients) in the p-th 
               row of Pascal's triangle.
%F A075872 a(n)=A060604(n)/A000040(n)
%p A075872 seq(binomial(ithprime(n),n)/ithprime(n),n=1..30);
%Y A075872 Cf. A060604, A000040.
%Y A075872 Sequence in context: A059917 A093625 A042447 this_sequence A075891 A116297 
               A027730
%Y A075872 Adjacent sequences: A075869 A075870 A075871 this_sequence A075873 A075874 
               A075875
%K A075872 nonn
%O A075872 1,3
%A A075872 Lekraj Beedassy (blekraj(AT)yahoo.com), Oct 16 2002
%E A075872 More terms from Emeric Deutsch (deutsch(AT)duke.poly.edu), Mar 04 2004