Estimate the derivative of the following using simple and high- accuracy backward, forward and center finite difference. a. f(x) = 1.34x4 – 3.2x3 + 0.55x² -1.78 at x= 1.2 using h = 0.2 & 0.1 b. f(x) = e* sin0.5x/(1+ x) at x = 0.75 using h = 0.1 & 0.05 c. f(x) = 3tan2x – 2sinx at x =1.3 using h = 0.01 - %3D
Estimate the derivative of the following using simple and high- accuracy backward, forward and center finite difference. a. f(x) = 1.34x4 – 3.2x3 + 0.55x² -1.78 at x= 1.2 using h = 0.2 & 0.1 b. f(x) = e* sin0.5x/(1+ x) at x = 0.75 using h = 0.1 & 0.05 c. f(x) = 3tan2x – 2sinx at x =1.3 using h = 0.01 - %3D
Functions and Change: A Modeling Approach to College Algebra (MindTap Course List)
6th Edition
ISBN:9781337111348
Author:Bruce Crauder, Benny Evans, Alan Noell
Publisher:Bruce Crauder, Benny Evans, Alan Noell
Chapter2: Graphical And Tabular Analysis
Section2.1: Tables And Trends
Problem 1TU: If a coffee filter is dropped, its velocity after t seconds is given by v(t)=4(10.0003t) feet per...
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Transcribed Image Text:Estimate the derivative of the following using simple and high-
accuracy backward, forward and center finite difference.
a. f(x) = 1.34x4 – 3.2x3 + 0.55x² -1.78 at x= 1.2 using h = 0.2 & 0.1
b. f(x) = e*sin0.5x/(1+ x) at x = 0.75 using h = 0.1 & 0.05
%3D
c. f(x) = 3tan2x – 2sinx at x =1.3 using h = 0.01
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