Approximate the following functions using Taylor series. Solve the absolute and relative error in each item when x = 3. 1. f(x) = cosx; a=1, n=10 2. f(x) = e2x, a=0, n=10 3. f (x) = x10 – x5 + 3; a=2,...

Numerical Methods

Use 5 decimal place mantissa.

Approximate the following functions using Taylor series. Solve the absolute and relative error in each item when x = 3
(Answer Problem No.1)

Approximate the following functions using Taylor series. Solve the absolute and relative error in each<br>item when x = 3.<br>1. f(x) = cosx; a=1, n=10<br>2. f(x) = e2x, a=0, n=10<br>3. f (x) = x10 – x5 + 3; a=2, n=5<br>

Extracted text: Approximate the following functions using Taylor series. Solve the absolute and relative error in each item when x = 3. 1. f(x) = cosx; a=1, n=10 2. f(x) = e2x, a=0, n=10 3. f (x) = x10 – x5 + 3; a=2, n=5

Jun 03, 2022

SOLUTION.PDF

Approximate the following functions using Taylor series. Solve the absolute and relative error in each item when x = 3. 1. f(x) = cosx; a=1, n=10 2. f(x) = e2x, a=0, n=10 3. f (x) = x10 – x5 + 3; a=2,...

Get Answer To This Question

Related Questions & Answers

Submit New Assignment