Differential Equations: An Introduction to Modern Methods and Applications

3rd Edition

ISBN: 9781118531778

Author: James R. Brannan, William E. Boyce

Publisher: WILEY

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Differential Equations

Have you ever observed the movement of the satellites and rockets or how the planets go around the sun in their orbits? How will you determine their motion? Definitely they follow some scientific laws and these kinds of problems are framed as differentia…

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Textbook Question

Chapter 8.4, Problem 1P

In each of Problems 1 through 6, determine approximate values of the solution x = ϕ ( t ) , y = ψ ( t ) of the given initial value problem at t = 0.2 , 0.4 , 0.6 , 0.8 , and 1.0 . Compare the results obtained by different methods and different step sizes.

a) Use the Euler method with h = 0.1 .

b) Use the Runge-Kutta method with h = 0.2 .

c) Use the Runge-Kutta method with h = 0.1 .

x ' = x + y + t , y ' = 4 x − 2 y ;

x ( 0 ) = 1 , y ( 0 ) = 0

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Chapter 8.3, Problem 24P

Chapter 8.4, Problem 2P

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You are provided with data that includes all 50 states of the United States. Your task is to draw a sample of: o 20 States using Random Sampling (2 points: 1 for random number generation; 1 for random sample) o 10 States using Systematic Sampling (4 points: 1 for random numbers generation; 1 for random sample different from the previous answer; 1 for correct K value calculation table; 1 for correct sample drawn by using systematic sampling) (For systematic sampling, do not use the original data directly. Instead, first randomize the data, and then use the randomized dataset to draw your sample. Furthermore, do not use the random list previously generated, instead, generate a new random sample for this part. For more details, please see the snapshot provided at the end.) Upload a Microsoft Excel file with two separate sheets. One sheet provides random sampling while the other provides systematic sampling. Excel snapshots that can help you in organizing columns are provided on the next…

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Differential Equations: An Introduction to Modern Methods and Applications

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