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Question

Let y=y(x) be the solution of the differential equation sinxdydx+ycosx=4x,x(0,π). If yπ2=0, then yπ6 is equal to:


A

-89π2

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B

-49π2

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C

493π2

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D

-893π2

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Solution

The correct option is A

-89π2


Explanation for the correct solution:

Step-1:Solution of linear differential eauation:

Given, sinxdydx+ycosx=4x

Solving the differential equation:

sinxdydx+ycosx=4xdydx+ycotx=4xcosecxI.F.=ecotxdx=sinx

On solving further, we get:

ysinx=4x.cosecx.sinxdxysinx=4xdxysinx=2x2+C

Step-2 :Calculating the value of yπ6:

Since, yπ2=0:

0=2π22+CC=-π22ysinx=2x2-π22

Therefore, for yπ6, we have:

ysinπ6=2π62-π22y2=π118-12y=-8π29

Hence, the correct answer is option (A).


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