olubeNetBlackboard LearPowerPoint Presentation9/1685%HOBISECTION ERROR BOUNDTheorem 21 Suppose that fe Cla, b) and f(a) f(b) <0. The Bisection method generates a sequence(n.) approximating a zero p off withb-aIP-Pl≤2· when #21.The above error bound is often used to find the number n of iterations required to achieve some desired error IP-pl.n 21.In many cases, we have a desired error bound that we had like to achieve. Say we want the error IP-pl= 10, where k isknown. Then we can find a bound on n from the inequalityb-a10- S2"211 QUESTION 3Use Theorem 2.1 to find the minimum number of iterations needed to approximate the solution of x4-2x3-4x2 + 4x +4=0¹for, -2 ≤x≤-1, with 10-4 accuracy.161512000N1314

Given: Error = 10-4 And a = -2, b = -1 We have to find the minimum number of iterations

Answered: Use Theorem 2.1 to find the minimum…

Use Theorem 2.1 to find the minimum number of iterations needed to approximate the solution of x4-2x³-4x² + 4x +4=0° for, -2sxs-1. with 10-4 accuracy. 000 00 3 16 15 12 13 14

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter9: Systems Of Equations And Inequalities

Section9.1: Systems Of Equations

Problem 6E

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olube
Net
Blackboard Lear
PowerPoint Presentation
9/16
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HO
BISECTION ERROR BOUND
Theorem 21 Suppose that fe Cla, b) and f(a) f(b) <0. The Bisection method generates a sequence
(n.) approximating a zero p off with
b-a
IP-Pl≤2· when #21.
The above error bound is often used to find the number n of iterations required to achieve some desired error IP-pl.n 21.
In many cases, we have a desired error bound that we had like to achieve. Say we want the error IP-pl= 10, where k is
known. Then we can find a bound on n from the inequality
b-a
10- S
2"
21
1

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