# Greetings from The On-Line Encyclopedia of Integer Sequences! http://oeis.org/ Search: id:a323564 Showing 1-1 of 1 %I A323564 #14 Jan 18 2019 01:29:50 %S A323564 4,15,136,1470,24128,478320,11464768,319326960,10178837504, %T A323564 364859900160,14534008182784,636808845089280,30439017021980672, %U A323564 1576198832606638080,87897652978230894592,5251777898245369559040,334706615832128692944896,22664760114438656410583040,1625030662504773488747216896,122985265288422439779648798720 %N A323564 E.g.f. B(x) = 4 + Integral A(x)*C(x) dx such that C(x)^2 - B(x)^2 = 9 and B(x)^2 - A(x)^2 = 7. %H A323564 Paul D. Hanna, Table of n, a(n) for n = 0..300 %F A323564 E.g.f. B(x) and related series A(x) and C(x) satisfy the following relations. %F A323564 (1a) A(x) = 3 + Integral B(x)*C(x) dx. %F A323564 (1b) B(x) = 4 + Integral A(x)*C(x) dx. %F A323564 (1c) C(x) = 5 + Integral A(x)*B(x) dx. %F A323564 (2a) C(x)^2 - B(x)^2 = 9. %F A323564 (2b) C(x)^2 - A(x)^2 = 16. %F A323564 (2c) B(x)^2 - A(x)^2 = 7. %F A323564 (3a) A(x)*B(x)*C(x) = A(x)*A'(x) = B(x)*B'(x) = C(x)*C'(x). %F A323564 (3b) Integral 2*A(x)*B(x)*C(x) dx = A(x)^2 - 9 = B(x)^2 - 16 = C(x)^2 - 25. %F A323564 (4a) B(x) + C(x) = 9 * exp( Integral A(x) dx ). %F A323564 (4b) A(x) + C(x) = 8 * exp( Integral B(x) dx ). %F A323564 (4c) A(x) + B(x) = 7 * exp( Integral C(x) dx ). %e A323564 E.g.f. B(x) = 4 + 15*x + 136*x^2/2! + 1470*x^3/3! + 24128*x^4/4! + 478320*x^5/5! + 11464768*x^6/6! + 319326960*x^7/7! + 10178837504*x^8/8! + 364859900160*x^9/9! + 14534008182784*x^10/10! + ... %e A323564 such that B(x) = 4 + Integral A(x)*C(x) dx. %e A323564 RELATED SERIES. %e A323564 A(x) = 3 + 20*x + 123*x^2/2! + 1540*x^3/3! + 23871*x^4/4! + 480260*x^5/5! + 11449599*x^6/6! + 319491220*x^7/7! + 10176946203*x^8/8! + 364884459380*x^9/9! + 14533663841187*x^10/10! + ... + A323563(n)*x^n/n! + ... %e A323564 such that A(x) = 3 + Integral B(x)*C(x) dx. %e A323564 C(x) = 5 + 12*x + 125*x^2/2! + 1500*x^3/3! + 24265*x^4/4! + 478236*x^5/5! + 11461625*x^6/6! + 319303500*x^7/7! + 10179006445*x^8/8! + 364862775468*x^9/9! + 14534000631125*x^10/10! + ... + A323565(n)*x^n/n! + ... %e A323564 such that C(x) = 5 + Integral A(x)*B(x) dx. %e A323564 B(x)^2 = 16 + 120*x + 1538*x^2/2! + 24000*x^3/3! + 480400*x^4/4! + 11444160*x^5/5! + 319475984*x^6/6! + 10177152000*x^7/7! + 364886675200*x^8/8! + 14533662074880*x^9/9! + ... + 2*A323566(n-1)*x^n/n! + ... %e A323564 such that B(x)^2 - A(x)^2 = 7 and C(x)^2 - B(x)^2 = 9. %e A323564 A(x) + B(x) = 7 * exp( Integral C(x) dx ) = 7 + 35*x + 259*x^2/2! + 3010*x^3/3! + 47999*x^4/4! + 958580*x^5/5! + 22914367*x^6/6! + 638818180*x^7/7! + 20355783707*x^8/8! + 729744359540*x^9/9! + 29067672023971*x^10/10! + ... %e A323564 A(x) + C(x) = 8 * exp( Integral B(x) dx ) = 8 + 32*x + 248*x^2/2! + 3040*x^3/3! + 48136*x^4/4! + 958496*x^5/5! + 22911224*x^6/6! + 638794720*x^7/7! + 20355952648*x^8/8! + 729747234848*x^9/9! + 29067664472312*x^10/10! + ... %e A323564 B(x) + C(x) = 9 * exp( Integral A(x) dx ) = 9 + 27*x + 261*x^2/2! + 2970*x^3/3! + 48393*x^4/4! + 956556*x^5/5! + 22926393*x^6/6! + 638630460*x^7/7! + 20357843949*x^8/8! + 729722675628*x^9/9! + 29068008813909*x^10/10! + ... %e A323564 exp( Integral A(x) dx ) = 1 + 3*x + 29*x^2/2! + 330*x^3/3! + 5377*x^4/4! + 106284*x^5/5! + 2547377*x^6/6! + 70958940*x^7/7! + 2261982661*x^8/8! + 81080297292*x^9/9! + 3229778757101*x^10/10! + ... + A323569(n)*x^n/n! + ... %e A323564 exp( Integral B(x) dx ) = 1 + 4*x + 31*x^2/2! + 380*x^3/3! + 6017*x^4/4! + 119812*x^5/5! + 2863903*x^6/6! + 79849340*x^7/7! + 2544494081*x^8/8! + 91218404356*x^9/9! + 3633458059039*x^10/10! + ... + A323568(n)*x^n/n! + ... %e A323564 exp( Integral C(x) dx ) = 1 + 5*x + 37*x^2/2! + 430*x^3/3! + 6857*x^4/4! + 136940*x^5/5! + 3273481*x^6/6! + 91259740*x^7/7! + 2907969101*x^8/8! + 104249194220*x^9/9! + 4152524574853*x^10/10! + ... + A323567(n)*x^n/n! + ... %e A323564 A(x)*B(x)*C(x) = 60 + 769*x + 12000*x^2/2! + 240200*x^3/3! + 5722080*x^4/4! + 159737992*x^5/5! + 5088576000*x^6/6! + 182443337600*x^7/7! + 7266831037440*x^8/8! + 318406925529856*x^9/9! + 15219462171648000*x^10/10! + ... + A323566(n)*x^n/n! + ... %e A323564 such that A(x)*B(x)*C(x) = A(x)*A'(x) = B(x)*B'(x) = C(x)*C'(x). %o A323564 (PARI) {b(n) = my(A=3,B=4,C=5); for(i=1,n, %o A323564 A = 3 + intformal(B*C +x*O(x^n)); %o A323564 B = 4 + intformal(A*C); %o A323564 C = 5 + intformal(A*B);); %o A323564 n! * polcoeff(B,n)} %o A323564 for(n=0,30,print1(b(n),", ")) %Y A323564 Cf. A323563 (A), A323565 (C), A323566 (A*B*C), A323567 ((A+B)/7), A323568 ((A+C)/8), A323569 ((B+C)/9). %K A323564 nonn %O A323564 0,1 %A A323564 _Paul D. Hanna_, Jan 18 2019 # Content is available under The OEIS End-User License Agreement: http://oeis.org/LICENSE