Find the approximate error, relativeapproximateerror, and absolute relativeapproximate error of the derivative off(x) = x² + 3x + 1 at x = 0.6 when hpresentX= 0.005 and hprevious = 0.05.Ea = -0.045; a = -0.01248; &al =0.01248Ea = -0.045; &a = -0.01124; &al=0.01124Ea = -0.045; &a = -0.0107; lal =0.0107Ea = -0.045; a = -0.01183; |εal =0.01183

The approximate error is calculated using the formula: Ea=Present value-Previous value. The relative…

Find the approximate error, relative approximate error, and absolute relative approximate error of the derivative of f(x) = x² + 3x + 1 at x = 0.6 when hpresent = 0.005 and hprevious = 0.05. Ea = -0.045; a = -0.01248; l&al= = 0.01248 Ea = -0.045; a = -0.01124; leal : 0.01124 Ea = -0.045; a = -0.0107; lal 0.0107 OE₂ = -0.045; &a = -0.01183; lal = 0.01183

Find the approximate error, relative approximate error, and absolute relative approximate error of the derivative of f(x) = x² + 3x + 1 at x = 0.6 when hpresent = 0.005 and hprevious = 0.05. Ea = -0.045; a = -0.01248; l&al= = 0.01248 Ea = -0.045; a = -0.01124; leal : 0.01124 Ea = -0.045; a = -0.0107; lal 0.0107 OE₂ = -0.045; &a = -0.01183; lal = 0.01183

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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