Exercise 1. We consider the function f defined for any real r in the interval [-1,1], by f(x) = x+2x-2. 1. Prove that it exists exactly one root of f(x) = 0 in the interval [-1, 1]. 2. How much iterations of the bissection method we need to obtain a precision of 10-3. 3. Make 2 iterations of the bissection method. Exercise 2. We consider the function g defined for any real r in the interval [;,0.65], by g(r) = r(1-2). 1. Prove that the Fixed point algorithm r"* = g(x"), with ro 0.65 is convergent and that the equation r g(x) have a solution. %3D

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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Exercise 1.
We consider the function f defined for any real r in the interval -1, 1], by f(x) = x +2x - 2.
1. Prove that it exists exactly one root of f(x) = 0 in the interval [-1, 1].
2. How much iterations of the bissection method we need to obtain a precision of 10.
3. Make 2 iterations of the bissection method.
Exercise 2.
We consider the function g defined for any real r in the interval
;, 0.65], by g(r) =
1. Prove that the Fixed point algorithm r"+1
equation r g(z) have a solution.
= g(r"), with ro 0.65 is convergent and that the
Transcribed Image Text:Exercise 1. We consider the function f defined for any real r in the interval -1, 1], by f(x) = x +2x - 2. 1. Prove that it exists exactly one root of f(x) = 0 in the interval [-1, 1]. 2. How much iterations of the bissection method we need to obtain a precision of 10. 3. Make 2 iterations of the bissection method. Exercise 2. We consider the function g defined for any real r in the interval ;, 0.65], by g(r) = 1. Prove that the Fixed point algorithm r"+1 equation r g(z) have a solution. = g(r"), with ro 0.65 is convergent and that the
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