Solving Linear Differential Equations of First Order
If y = y x is...
Question
If y=y(x) is the solution of the differential equation, xdydx+2y=x2 satisfying y(1)=1, then y(12) is equal to:
A
14
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B
764
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C
1316
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D
4916
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Solution
The correct option is D4916 The given differential equation can be rewritten as dydx+(2x)y=x which is a linear differential equation. Then the integrating factor, I.F.=e∫2xdx=e(2logx)=e(logx2)=x2
∴ The solution of the given differential equation is y⋅x2=∫x⋅x2+C where C is the constant of integration ⇒y⋅x2=x44+C Given y(1)=1⇒C=34 ∴y=x24+34x2 Hence, y(12)=14×4+3×44=4916