Explanation The corresponding characteristic equation is written as: y ( 5 ) − 3 y ( 4 ) + 3 y ″ ′ − 3 y ″ + 2 y ′ = 0 r ( 5 ) − 3 r ( 4 ) + 3 r 3 − 3 r 2 + 2 r = 0 r ( r 4 − 3 r 3 + 3 r 2 − 3 r + 2 ) = 0 r ( r 4 − 3 r 3 + 3 r 2 − r − 2 r + 2 ) = 0 On the further simplification, the following is obtained. r ( r 4 − r − 3 r 3 + 3 r 2 − 2 ( r − 1 ) ) = 0 r ( r ( r 3 − 1 ) − 3 r 2 ( r − 1 ) − 2 ( r − 1 ) ) = 0 r ( r ( r − 1 ) ( r 2 + r + 1 ) − 3 r 2 ( r − 1 ) − 2 ( r − 1 ) ) = 0 r ( r − 1 ) ( r ( r 2 + r + 1 ) − 3 r 2 − 2 ) = 0 On the further simplification, the following is obtained

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Author: William E. Boyce, Richard C. DiPrima

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Chapter 4.2, Problem 19P

To determine

The general solution of the differential equation y(5)−3y(4)+3y″′−3y″+2y′=0.

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Chapter 4.2, Problem 18P

Chapter 4.2, Problem 20P

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Use the method of undetermined coefficients to solve the given nonhomogeneous system. x-()*+(5) = 1 3 3 1 X+ t +3 -1 -2t 1 x(t) = º1 1 e +021 e +

Chapter 4 Solutions

Elementary Differential Equations

Ch. 4.1 - In each of Problems 1 through 6, determine...Ch. 4.1 - In each of Problems 1 through 6, determine...Ch. 4.1 - In each of Problems 1 through 6, determine...Ch. 4.1 - In each of Problems 1 through 6, determine...Ch. 4.1 - In each of Problems 1 through 6, determine...Ch. 4.1 - Prob. 6P Ch. 4.1 - In each of Problems 7 through 10, determine...Ch. 4.1 - Prob. 8P Ch. 4.1 - In each of Problems 7 through 10, determine...Ch. 4.1 - Prob. 10P

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The general solution of the differential equation y ( 5 ) − 3 y ( 4 ) + 3 y ″ ′ − 3 y ″ + 2 y ′ = 0 .

The general solution of the differential equation y(5)−3y(4)+3y″′−3y″+2y′=0.

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Chapter 4 Solutions