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13 Nov 2019
Show complete work. Staple the project before returning. A power series is a series of the form where r is the variable and the o's are constants called the coefficients of the series. For each specific r, the series is a series of constants. A power series may converge for some values of z and diverge for some values of z. The sum of the series is a function whose domain is the set of all for which the series converges. Notice that fressem- bles a polynomial. The only difference is that f has infinitely many terms. Moe generally a power series of the form Is a power series inã¨ã¼aor a power series centered at a or power series about a-Let f be any function that can be represented by a power series Let us try to determine the coefficients c Notice that f(a) = ao-ra)-ci. f"(a)-ì f"(a)-3t c's and similarly f(n)(a)-n! cn. Solving for G, we get n!
Show complete work. Staple the project before returning. A power series is a series of the form where r is the variable and the o's are constants called the coefficients of the series. For each specific r, the series is a series of constants. A power series may converge for some values of z and diverge for some values of z. The sum of the series is a function whose domain is the set of all for which the series converges. Notice that fressem- bles a polynomial. The only difference is that f has infinitely many terms. Moe generally a power series of the form Is a power series inã¨ã¼aor a power series centered at a or power series about a-Let f be any function that can be represented by a power series Let us try to determine the coefficients c Notice that f(a) = ao-ra)-ci. f"(a)-ì f"(a)-3t c's and similarly f(n)(a)-n! cn. Solving for G, we get n!
Hubert KochLv2
18 Jul 2019