Let f:(-1,1)→ R. f(x) = (2n)! 4" (n!) ² (2n+1) -x2n+1 and f(x) = f (x), xe (-1,1). Find f n=0 - Σof(x). Find t *) (please enter your answer in the decimal point with three significant digits after the decimal point). Let f :[0, 1] → R be given by f(x)=xe-x and define f(x) = . Please input your answer in the decimal form with three significant digits after the decimal point.
Let f:(-1,1)→ R. f(x) = (2n)! 4" (n!) ² (2n+1) -x2n+1 and f(x) = f (x), xe (-1,1). Find f n=0 - Σof(x). Find t *) (please enter your answer in the decimal point with three significant digits after the decimal point). Let f :[0, 1] → R be given by f(x)=xe-x and define f(x) = . Please input your answer in the decimal form with three significant digits after the decimal point.
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter3: Functions And Graphs
Section3.4: Definition Of Function
Problem 51E
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