112. The general equation of a differential equation of the type dxdy+P1x=Q,is: (A)ye∫P1dy=∫(Q1e∫P1dy)dy+C(B)y.e∫P1dx=∫(Q1e∫P1dx)dx+C(C)xe∫P1dy=∫(Q1e∫P1dy)dy+C(D)x.e∫P1dx=∫(Q1e∫P1dx)dx+C

112. The general equation of a differential equation of the type $\frac{d x}{d y} + P_{1} x = Q, i s :$

$\begin{array}{l} (A) y e^{\int P_{1} d y} = \int (Q_{1} e^{\int P_{1} d y}) d y + C \\ (B) y . e^{\int P_{1} d x} = \int (Q_{1} e^{\int P_{1} d x}) d x + C \\ (C) x e^{\int P_{1} d y} = \int (Q_{1} e^{\int P_{1} d y}) d y + C \\ (D) x . e^{\int P_{1} d x} = \int (Q_{1} e^{\int P_{1} d x}) d x + C \end{array}$

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Vishal Baghel | Contributor-Level 10

10 months ago

The integrating factor of the given differential equation $\frac{d x}{d y} + P_{1} x = Q_{1}$

The general solution of the differential equation is given by,

$\begin{array}{l} x (I . F .) = \int (Q * I . F .) d y + C \\ \Rightarrow x . e^{\int P_{1} d y} = \int (Q_{1} e^{\int P_{1} d y}) d y + C \end{array}$

Hence, the correct answer is C.

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