Largest coefficient in expansion of (1 + x + x^2 + ... + x^(n-1))^5 = ((1-x^n)/(1-x))^5, i.e., the coefficient of x^floor(5*(n-1)/2) and of x^ceiling(5*(n-1)/2); also number of compositions of floor(5*(n+1)/2) into exactly 5 positive integers each no more than n.

A077044

Largest coefficient in expansion of (1 + x + x^2 + ... + x^(n-1))^5 = ((1-x^n)/(1-x))^5, i.e., the coefficient of x^floor(5*(n-1)/2) and of x^ceiling(5*(n-1)/2); also number of compositions of floor(5*(n+1)/2) into exactly 5 positive integers each no more than n.

Terms

    a(0) =0a(1) =1a(2) =10a(3) =51a(4) =155a(5) =381a(6) =780a(7) =1451a(8) =2460a(9) =3951a(10) =6000a(11) =8801a(12) =12435a(13) =17151a(14) =23030a(15) =30381a(16) =39280a(17) =50101a(18) =62910a(19) =78151a(20) =95875a(21) =116601a(22) =140360a(23) =167751a(24) =198780a(25) =234131a(26) =273780a(27) =318501a(28) =368235a(29) =423851

External references