2. The deflection of a uniform beam subject to a linearly increasing distributedload can be computed asWoy =(-x5 + 2L²×³ – L*x)120EILGiven that L = 600 cm, E = 50,000 kN/cm2,1 = 30,000 cm , and wo = 2.5kN/cm, determine the point of maximum deflectiona. using the golden-section search until five iterations with initial guessesof x1 = 0 and x,u = Lb. Newton's method xo = 700 (at least 4 iterations)

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2. The deflection of a uniform beam subject to a linearly increasing distributed load can be computed as Wo -(-x5 + 2L²×³ – L*x) 120EIL y = Given that L = 600 cm, E = 50,000 kN/cm2 , I = 30,000 cm , and wo = 2.5 kN/cm, determine the point of maximum deflection

2. The deflection of a uniform beam subject to a linearly increasing distributed load can be computed as Wo -(-x5 + 2L²×³ – L*x) 120EIL y = Given that L = 600 cm, E = 50,000 kN/cm2 , I = 30,000 cm , and wo = 2.5 kN/cm, determine the point of maximum deflection

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Question

2. The deflection of a uniform beam subject to a linearly increasing distributed
load can be computed as
Wo
y =
(-x5 + 2L²×³ – L*x)
120EIL
Given that L = 600 cm, E = 50,000 kN/cm2,1 = 30,000 cm , and wo = 2.5
kN/cm, determine the point of maximum deflection
a. using the golden-section search until five iterations with initial guesses
of x1 = 0 and x,u = L
b. Newton's method xo = 700 (at least 4 iterations)

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