378 Chapter 10 Infinite Series e = 1 + x + + (for all x) + 4! (10.14) 2! 3! کہ sin xX- (for all x) (10.15) 3! 5! (for al
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10.4 Operations with Series 379 from the last section. If we replace x by r°, we obtain sin rer? (x)} (x?) 3! 5! + or 10 + sin = 3! 5! Since this series is a power series, it must be the Maclaurin series of sin x, since such expansions are unique. Example 2 Find the Maclaurin series for xe'. Solution. From + = 1 + x + 2! 3! we obtain by direct multiplication xel- (1 1 + x + + +) + 2! 3! =Y+ 2! + + 3! It has already been noted that convergent power series can be differentiated termwise; the same is true of integration. Example 3 Show that (d/dx)e' = e' by the use of Maclaurin series. Solution. d dx 2 1 + x + + + 2! 3! 4! ...) 2x 3r = 0 + 1 + + + 2! 3! 4! = 1 + x + + 2! 3! Example Find the Maclaurin series of Arcsin x by integrating (d/dx) Arcsin x termwise. Solution. We recall that d 1 Arcsin x - dx VI-
b) Using the given Maclaurin series on page 378, section 10.3 of your textbook determine the first 5 terms of бе2x = y = , in expanded form, and simplify your result. X2