The OEIS mourns the passing of Jim Simons and is grateful to the Simons Foundation for its support of research in many branches of science, including the OEIS.
login
The OEIS is supported by the many generous donors to the OEIS Foundation.

 

Logo
Hints
(Greetings from The On-Line Encyclopedia of Integer Sequences!)
A323566 E.g.f. A(x)*B(x)*C(x) = A(x)*A'(x) = B(x)*B'(x) = C(x)*C'(x) such that A(x)^2 - 3^2 = B(x)^2 - 4^2 = C(x)^2 - 5^2. 7
60, 769, 12000, 240200, 5722080, 159737992, 5088576000, 182443337600, 7266831037440, 318406925529856, 15219462171648000, 788100281735628800, 43948810168135249920, 2625889302081932919808, 167353299713262895104000, 11332380251743363159654400, 812515326312426555864514560, 61492632779134908504829394944, 4898814624279426129262804992000, 409777608652975194106476639027200 (list; graph; refs; listen; history; text; internal format)
OFFSET
0,1
LINKS
Paul D. Hanna, Table of n, a(n) for n = 0..300
FORMULA
E.g.f. A(x)*B(x)*C(x) where related series A(x), B(x), and C(x) satisfy the following relations.
(1a) A(x) = 3 + Integral B(x)*C(x) dx.
(1b) B(x) = 4 + Integral A(x)*C(x) dx.
(1c) C(x) = 5 + Integral A(x)*B(x) dx.
(2a) C(x)^2 - B(x)^2 = 9.
(2b) C(x)^2 - A(x)^2 = 16.
(2c) B(x)^2 - A(x)^2 = 7.
(3a) A(x)*B(x)*C(x) = A(x)*A'(x) = B(x)*B'(x) = C(x)*C'(x).
(3b) Integral 2*A(x)*B(x)*C(x) dx = A(x)^2 - 9 = B(x)^2 - 16 = C(x)^2 - 25.
(4a) B(x) + C(x) = 9 * exp( Integral A(x) dx ).
(4b) A(x) + C(x) = 8 * exp( Integral B(x) dx ).
(4c) A(x) + B(x) = 7 * exp( Integral C(x) dx ).
EXAMPLE
E.g.f. 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! + ...
such that A(x)*B(x)*C(x) = A(x)*A'(x) = B(x)*B'(x) = C(x)*C'(x).
RELATED SERIES.
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! + ...
such that A(x) = 3 + Integral B(x)*C(x) dx.
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! + ... + A323564(n)*x^n/n! + ...
such that B(x) = 4 + Integral A(x)*C(x) dx.
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! + ...
such that C(x) = 5 + Integral A(x)*B(x) dx.
A(x)^2 = 9 + 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! + 636813851059712*x^10/10! ...
such that C(x)^2 - A(x)^2 = 16 and B(x)^2 - A(x)^2 = 7.
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! + ...
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! + ...
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! + ...
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! + ...
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! + ...
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! + ...
PROG
(PARI) {abc(n) = my(A=3, B=4, C=5); for(i=1, n,
A = 3 + intformal(B*C +x*O(x^n));
B = 4 + intformal(A*C);
C = 5 + intformal(A*B); );
n! * polcoeff(A*B*C, n)}
for(n=0, 30, print1(abc(n), ", "))
CROSSREFS
Cf. A323563 (A), A323564 (B), A323565 (C), A323567 ((A+B)/7), A323568 ((A+C)/8), A323569 ((B+C)/9).
Sequence in context: A349871 A112042 A168307 * A063011 A008357 A259539
Adjacent sequences: A323563 A323564 A323565 * A323567 A323568 A323569
KEYWORD
nonn
AUTHOR
Paul D. Hanna, Jan 18 2019
STATUS
approved

Lookup | Welcome | Wiki | Register | Music | Plot 2 | Demos | Index | Browse | More | WebCam
Contribute new seq. or comment | Format | Style Sheet | Transforms | Superseeker | Recents
The OEIS Community | Maintained by The OEIS Foundation Inc.

License Agreements, Terms of Use, Privacy Policy. .

Last modified May 14 17:26 EDT 2024. Contains 372533 sequences. (Running on oeis4.)