1. Using Bisection Method, solve the root of the equation below that is nearest to zero. sin(x) + ex = 0

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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1. Using Bisection Method, solve the root of the equation below that is nearest to zero.
sin(x) + e* = 0
2. Solve for the root/s of the equation below using Fixed-point iteration. Use zero as initial value of
X.
3x³ − 4x² + 8x + 4 = 0
-
3. Solve the value of x in the problem below using Bisection method. Complete the solution for
iterations. Use initial value of a=1 and b=1.5.
3
1
3sin(2x) = x6
4. Using Newtons method, solve for the negative value of w of the equation below. Use zero as
initial value.
f(w) = 5w+cos (w)
Transcribed Image Text:1. Using Bisection Method, solve the root of the equation below that is nearest to zero. sin(x) + e* = 0 2. Solve for the root/s of the equation below using Fixed-point iteration. Use zero as initial value of X. 3x³ − 4x² + 8x + 4 = 0 - 3. Solve the value of x in the problem below using Bisection method. Complete the solution for iterations. Use initial value of a=1 and b=1.5. 3 1 3sin(2x) = x6 4. Using Newtons method, solve for the negative value of w of the equation below. Use zero as initial value. f(w) = 5w+cos (w)
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