Explanation Given information: The three physical assumption are defined as, The mass of the string per unit length is constant (“homogeneous string”). The string is perfectly elastic and does not offer any resistance to bending. The tension caused by stretching the string before fastening it at the ends is so large that the action of the gravitational force on the string (trying to pull the string down a little) can be neglected. The string performs small transverse motions in a vertical plane; that is, every particle of the string moves strictly vertically and so that the deflection and the slope at every point of the string always remain small in absolute value. Consider the given information, As per assumption 3, the angles α and β are small, and therefore it can use the small angle approximations like, cos α ≈ 1 cos β ≈ 1 This is necessary to make an assumption, T 1 cos α = T 2 cos β = T = cos t Which is greatly simplify the derivation of the equation by vibrating string. Assumption 2: Again, simplifies the equation. If there is an outer force like gravity, which is denoted by f then the equation is defined as, ∂ 2 u ∂ t 2 = c 2 ∂ 2 u ∂ x 2 + f This equation becomes more problematic to solve. The second part of assumption: It also makes equation simpler. If the assumption was not for the equation, then damping the vibrating motion of the string. This could be described by adding a term to the equation that would describe by change of u as the time progresses ∂ u ∂ t and multiplying to ∂ u ∂ t by a constant k , it is representing the damping constant

10th Edition

ISBN: 9781119455929

Author: Kreyszig

Publisher: WILEY

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Question

Chapter 12.3, Problem 2P

To determine

To Find: The change in motion of the string when the assumption 3, assumption 2, first and second part of assumption 1 violated and need of these assumptions.

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Chapter 12.3, Problem 1P

Chapter 12.3, Problem 3P

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Chapter 12 Solutions

ADVANCED ENGINEERING MATHEMATICS (LL)

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