To determine The particular solution of the differential equation y ′ = ( 1 − y ) cos x if x = π 6 when y = 0 . Explanation Definition used: A differential equation of the first order and first degree contains the first derivative to the first power. That is, it may be written as d y d x = f ( x , y ) . The differential form of the above equation is, M ( x , y ) d x + N ( x , y ) d y = 0 , where M ( x , y ) and N ( x , y ) may represent constants, functions of either x or y , or functions of x and y . Procedure used: To solve an equation of the form of M ( x , y ) d x + N ( x , y ) d y = 0 , find the solution by integrating each term and adding the constant of integration . To find the particular solution, use the initial value given and obtain the constant of integration. Calculation: The given differential equation is y ′ = ( 1 − y ) cos x . Rewrite the given equation and separate the variables as, y ′ = ( 1 − y ) cos x d y d x = ( 1 − y ) cos x [ y ′ = d y d x ] d y ( 1 − y ) = cos x d x Integrate both sides as follows

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ISBN: 9780134437705

Author: Washington

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Chapter 31.2, Problem 37E

To determine

The particular solution of the differential equation y′=(1−y)cosx if x=π6 when y=0.

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Chapter 31.2, Problem 36E

Chapter 31.2, Problem 38E

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Ch. 31.1 - Show that is a solution of . Is it the general...Ch. 31.1 - Prob. 1E Ch. 31.1 - In Exercises 1 and 2, show that the indicated...Ch. 31.1 - In Exercises 3–6, determine whether the given...Ch. 31.1 - Prob. 4E Ch. 31.1 - In Exercises 3–6, determine whether the given...Ch. 31.1 - Prob. 6E Ch. 31.1 - In Exercises 7–10, show that each function y =...Ch. 31.1 - Prob. 8E Ch. 31.1 - In Exercises 7–10, show that each function y =...

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