2B.) Apply Newton’s method to find the root(s) of the function: f(x) = (8)x 3 – (8)x 2 – (8)x + 1 = 0. The answers should be given in a range from a = -2 to b = +2. Your iteration should stop when it reaches the change in sign (polarity) in your computation. The starting point should be (a) 0.3 and (b) 0.7. Choose your own increment value. 2. (a) when x = 0.3; xstarts = __________ xends = __________ f(xstarts) = _________ f(xends) = _________ (b) when x = 0.7 xstarts = __________ xends = __________ f(xstarts) = __________ f(xends) = __________

2B.) Apply Newton’s method to find the root(s) of the function: f(x) = (8)x 3 – (8)x 2 – (8)x + 1 = 0. The answers should be given in a range from a = -2 to b = +2. Your iteration should stop when it reaches the change in sign (polarity) in your computation. The starting point should be (a) 0.3 and (b) 0.7. Choose your own increment value. 2. (a) when x = 0.3; xstarts = ____ xends = f(xstarts) = _ f(xends) = _ (b) when x = 0.7 xstarts = xends = f(xstarts) = f(xends) = ____

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter7: Analytic Trigonometry

Section7.2: Trigonometric Equations

Problem 69E

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Question

2B.) Apply Newton’s method to find the root(s) of the function: f(x) = (8)x³ – (8)x² – (8)x + 1 = 0. The answers should be given in a range from a = -2 to b = +2. Your iteration should stop when it reaches the change in sign (polarity) in your computation. The starting point should be (a) 0.3 and (b) 0.7. Choose your own increment
value.

2. (a) when x = 0.3;
xstarts = __________ xends = __________
f(xstarts) = _________ f(xends) = _________
(b) when x = 0.7
xstarts = __________ xends = __________
f(xstarts) = __________ f(xends) = __________

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