Problem #1: By Taylor's theorem, we can find a Taylor polynomial P3(f) of degree 3 for the function g(f) cos(5) sin(4) near =0 such that g(1) = P3(1) + R3(0,1) in some interval where R3(0, 1) is the remainder term. Writing P3(1) as P3(1)= ao+at+ azt²+az1³, calculate the coefficient a3.
Problem #1: By Taylor's theorem, we can find a Taylor polynomial P3(f) of degree 3 for the function g(f) cos(5) sin(4) near =0 such that g(1) = P3(1) + R3(0,1) in some interval where R3(0, 1) is the remainder term. Writing P3(1) as P3(1)= ao+at+ azt²+az1³, calculate the coefficient a3.
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter4: Polynomial And Rational Functions
Section4.3: Zeros Of Polynomials
Problem 3E
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