Colic Posted February 3, 2014 Posted February 3, 2014 (edited) No, it's not a homework problem, it's a random thing I was working on when playing around with algorithms to convert between music and systems of math. I have these terms, [MATH](1/1)x+(1/3)x^3+(1/15)x^5+(1/105)x^7+(1/945)x^9[/MATH]... And I'm trying to come up with a formula to describe the coefficients in terms of a summation as part of a larger formula that I've already broken down. I've spent more than two hours testing different formulas and none of them work, but I know the concise pattern. If you want the nth coefficient, you'd do 1 divided by the derivative of the nth term times the coefficient (n-1)th term times the coefficient of the (n-2)nd term times the coefficient of the (n-3)rd term and so on. In a sense, it's like a factorial based off of derivatives, but I can't figure out a formula for it in terms of Sum(n=1) n->infinity. if n starts at 0, it's x^(2n-1), I got that down, I just can't figure out the coefficients, it's some kind of alternative factorial. Edited February 3, 2014 by Colic
John Posted February 3, 2014 Posted February 3, 2014 (edited) You'll want to use a double factorial. Using that, I have [math]\sum_{k=0}^{\infty} \frac{1}{(2k+1)!!}x^{2k+1}[/math]. Summing from 1 instead of from 0 (if you prefer that for whatever reason) simply requires changing each instance of 2k+1 to 2k-1. Edited February 3, 2014 by John 1
mathematic Posted February 3, 2014 Posted February 3, 2014 [latex]\frac{k!2^kx^{2k+1}}{(2k+1)!}[/latex] Start sum at k = 0.
Someguy1 Posted February 4, 2014 Posted February 4, 2014 (edited) No, it's not a homework problem, it's a random thing I was working on when playing around with algorithms to convert between music and systems of math. I have these terms, [MATH](1/1)x+(1/3)x^3+(1/15)x^5+(1/105)x^7+(1/945)x^9[/MATH]... And I'm trying to come up with a formula to describe the coefficients in terms of a summation as part of a larger formula that I've already broken down. I've spent more than two hours testing different formulas and none of them work, but I know the concise pattern. If you want the nth coefficient, you'd do 1 divided by the derivative of the nth term times the coefficient (n-1)th term times the coefficient of the (n-2)nd term times the coefficient of the (n-3)rd term and so on. In a sense, it's like a factorial based off of derivatives, but I can't figure out a formula for it in terms of Sum(n=1) n->infinity. if n starts at 0, it's x^(2n-1), I got that down, I just can't figure out the coefficients, it's some kind of alternative factorial. Denominators are double factorials of odd numbers. Next few are 10395,135135, 2027025, 34459425, 654729075, 13749310575, ... http://oeis.org/search?q=1%2C3%2C15%2C105%2C945&language=english&go=Search Edited February 4, 2014 by Someguy1
SamBridge Posted February 5, 2014 Posted February 5, 2014 (edited) Well thanks for the formula, it actually worked (btw colic wasn't a sockpuppet I just forgot my old username and email associated with (making it my main account) it since I haven't been here for a long time and I received absolutely no help from the staff member for looking them up and so spent a lot of time looking through my 12 emails for any info after the other acc was banned, so sorry for the delay too). I had one other question too: Apparently with the sequences I was dealing with, they ended up turning into something that resembles a power series for a function, but I can't quite nail down one of the properties for manipulating summation it seems. The series I have converges, but I'm trying to divide out a whole other power series so I can just have some irrational number as a remainder, and my basic attempts seem to yield a remainder that doesn't converge somehow. Just as an example, if I have [math]1=sum[((x+1)^n)(2^n)/((2n+1)!)][/math] and I divide the whole summation by a power series where say, [math]f(x)=sum[((x+1)^n)(n!)][/math], would I or would I not get [math]1/f(x)=sum[((2^n)/(((2n+1)!)(n!))][/math]? And why or why not? Because I searched all over the internet and for whatever reason there doesn't seem to be anything describing sum(a)/sum(b) or factoring out a function from a power series. Edited February 5, 2014 by SamBridge
mathematic Posted February 5, 2014 Posted February 5, 2014 You need to detail the derivation of the series for 1/f(x).
SamBridge Posted February 6, 2014 Posted February 6, 2014 You need to detail the derivation of the series for 1/f(x). i don't mean for that specific series, just in general, how would you generally do series(a)/series(b)? Because I know I didn't do it right, and I don't find anything when I google "dividing one powers series by another".
mathematic Posted February 6, 2014 Posted February 6, 2014 i don't mean for that specific series, just in general, how would you generally do series(a)/series(b)? Because I know I didn't do it right, and I don't find anything when I google "dividing one powers series by another". Short answer: there is no general method. To understand the difficulty see what happens in a simpler case, dividing a polynomial by a polynomial.
Recommended Posts
Create an account or sign in to comment
You need to be a member in order to leave a comment
Create an account
Sign up for a new account in our community. It's easy!
Register a new accountSign in
Already have an account? Sign in here.
Sign In Now