A140159 a(1)=1, a(n) = a(n-1) + n^4 if n odd, a(n) = a(n-1) + n^2 if n is even.
1, 5, 86, 102, 727, 763, 3164, 3228, 9789, 9889, 24530, 24674, 53235, 53431, 104056, 104312, 187833, 188157, 318478, 318878, 513359, 513843, 793684, 794260, 1184885, 1185561, 1717002, 1717786, 2425067, 2425967, 3349488, 3350512, 4536433
Offset: 1
Keywords
Links
- Harvey P. Dale, Table of n, a(n) for n = 1..1000
- Index entries for linear recurrences with constant coefficients, signature (1,5,-5,-10,10,10,-10,-5,5,1,-1).
Programs
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Magma
[(1/60)*(n +n^2)* (4 + 30*(-1)^n + (11 -15*(-1)^n)*n + (9 -15*(-1)^n)*n^2 + 6*n^3): n in [1..50]]; // G. C. Greubel, Jul 05 2018
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Mathematica
a = {}; r = 4; s = 2; Do[k = 0; Do[k = k + (Sin[Pi m/2]^2) m^r + (Cos[Pi m/2]^2) m^s, {m, 1, n}]; AppendTo[a, k], {n, 1, 100}]; a (*Artur Jasinski*) nxt[{n_,a_}]:={n+1,If[EvenQ[n],a+(n+1)^4,a+(n+1)^2]}; NestList[nxt, {1, 1}, 40][[All, 2]] (* Harvey P. Dale, Sep 21 2016 *) LinearRecurrence[{1,5,-5,-10,10,10,-10,-5,5,1,-1}, {1, 5, 86, 102, 727, 763, 3164, 3228, 9789, 9889, 24530}, 50] (* or *) Table[(1/60)*(n +n^2)* (4 + 30*(-1)^n + (11 -15*(-1)^n)*n + (9 -15*(-1)^n)*n^2 + 6*n^3), {n,1, 50}] (* G. C. Greubel, Jul 05 2018 *) -
PARI
for(n=1,50, print1((1/60)*(n +n^2)* (4 + 30*(-1)^n + (11 -15*(-1)^n)*n + (9 -15*(-1)^n)*n^2 + 6*n^3), ", ")) \\ G. C. Greubel, Jul 05 2018
Formula
G.f.: x*(1+4*x+76*x^2-4*x^3+230*x^4-4*x^5+76*x^6+4*x^7+x^8)/((1+x)^5*(x-1)^6). - R. J. Mathar, Feb 22 2009