(-1)"x²n (2n)! 1. For all x € R, cos ax = n=0 (a) Find a power series that is equal to x cos(x²) for all x E R. (b) Differentiate the series in (la) to find a power series that is equal to cos(x2) – 2x? sin(x²) for all x E R. (c) Use the result in (1b) to prove that (-16)"(4n + 1) Σ cos(4) – 8 sin(4). (2n)! n=0 W!

(-1)"x²n (2n)! 1. For all x € R, cos ax = n=0 (a) Find a power series that is equal to x cos(x²) for all x E R. (b) Differentiate the series in (la) to find a power series that is equal to cos(x2) – 2x? sin(x²) for all x E R. (c) Use the result in (1b) to prove that (-16)"(4n + 1) Σ cos(4) – 8 sin(4). (2n)! n=0 W!

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter10: Sequences, Series, And Probability

Section10.3: Geometric Sequences

Problem 50E

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Question

(-1)"x²n
(2n)!
1. For all x € R, cos ax =
n=0
(a) Find a power series that is equal to x cos(x²) for all x E R.
(b) Differentiate the series in (la) to find a power series that is equal to cos(x²) – 2x² sin(x²) for all x E R.
(c) Use the result in (1b) to prove that
+oo
Σ
(-16)"(4n+ 1)
(2n)!
cos(4) – 8 sin(4).
n=0
W!

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