Please show how is this solved, write the solutions cos(g) = L (2n)!(-1)"- g²n for all g e Rn=0Calculate by using the 4th degree of Maclaurin polynomial of cos(g) to get the approximatedvalue of cos (0.01)

Answered: Image /qna-images/answer/1729e76e-b6d0-4900-b35b-d4d0320d04ca.jpg

Answered: +00 (-1)" cos(g) = >. g²n for all g e R…

+00 (-1)" cos(g) = >. g²n for all g e R (2n)! n=0 Calculate by using the 4th degree of Maclaurin polynomial of cos(g) to get the approximated value of cos (0.01)

College Algebra

7th Edition

ISBN:9781305115545

Author:James Stewart, Lothar Redlin, Saleem Watson

Publisher:James Stewart, Lothar Redlin, Saleem Watson

Chapter3: Polynomial And Rational Functions

Section3.5: Complex Zeros And The Fundamental Theorem Of Algebra

Problem 3E: A polynomial of degree n I has exactly ____________________zero if a zero of multiplicity m is...

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Question

Please show how is this solved, write the solutions

cos(g) = L (2n)!
(-1)"
- g²n for all g e R
n=0
Calculate by using the 4th degree of Maclaurin polynomial of cos(g) to get the approximated
value of cos (0.01)

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