7th Edition

ISBN: 8220100254147

Author: Chapra

Publisher: MCG

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Textbook Question

Chapter 25, Problem 3P

Use the (a) Euler and (b) Heun (without iteration) methods to solve

d 2 y d t 2 − 0.5 t + y = 0

where y ( 0 ) = 2 and y ′ ( 0 ) = 0 . Solve from x = 0 to 4 with h = 0.1 . Compare the methods by plotting the solutions.

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Chapter 25, Problem 2P

Chapter 25, Problem 4P

Chapter 25 Solutions

EBK NUMERICAL METHODS FOR ENGINEERS

Ch. 25 - Solve the following initial value problem over the...Ch. 25 - Solve the following problem over the interval from...Ch. 25 - Use the (a) Euler and (b) Heun (without iteration)...Ch. 25 - Solve the following problem with the fourth-order...Ch. 25 - Solve from t=0to3withh=0.1 using (a) Heun (without...Ch. 25 - 25.6 Solve the following problem numerically from...Ch. 25 - Use (a) Eulers and (b) the fourth-order RK method...Ch. 25 - 25.8 Compute the first step of Example 25.14...Ch. 25 - 25.9 If, determine whether step size adjustment...Ch. 25 - Use the RK-Fehlberg approach to perform the same...

Ch. 25 - 25.11 Write a computer program based on Fig....Ch. 25 - Test the program you developed in Prob. 25.11 by...Ch. 25 - 25.13 Develop a user-friendly program for the...Ch. 25 - Develop a user-friendly computer program for the...Ch. 25 - Develop a user-friendly computer program for...Ch. 25 - 25.16 The motion of a damped spring-mass system...Ch. 25 - If water is drained from a vertical cylindrical...Ch. 25 - The following is an initial value, second-order...Ch. 25 - Assuming that drag is proportional to the square...Ch. 25 - A spherical tank has a circular orifice in its...Ch. 25 - The logistic model is used to simulate population...Ch. 25 - 25.22 Suppose that a projectile is launched...Ch. 25 - The following function exhibits both flat and...Ch. 25 - 25.24 Given the initial conditions,, solve the...Ch. 25 - Use the following differential equations to...Ch. 25 - 25.26 Three linked bungee jumpers are depicted in...

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Use the (a) Euler and (b) Heun (without iteration) methods to solve d 2 y d t 2 − 0.5 t + y = 0 where y ( 0 ) = 2 and y ′ ( 0 ) = 0 . Solve from x = 0 to 4 with h = 0.1 . Compare the methods by plotting the solutions.

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Chapter 25 Solutions

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