A differential equation of the form dy/d...

A differential equation of the form `dy/dx+Py=Q` is said to be a linear differential equation. Integrating factor of this differential equation is `e^int Pdx` and its solution is given by `y.e^(int Pdx)=int (Qe^(int Pdx))dx+c`. Answer the question:Let `f(x)` be a differentiable function in intervel `(0, oo)` such that `f(1)=1` and `lim_(trarrx) (t^2f(x)-x^2f(t))/(t-x)=1` for all `x gt 0`. Then `f(x)`= (A) `1/(3x)+(2x^2)/3` (B) `-1/(3x)+(4x^2)/3 (C) `-1/x+2/x^2` (D) `1/x`

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A differential equation of the form dy/dx+Py=Q is said to be a linear differential equation. Integrating factor of this differential equation is e^(intPdx) and its solution is given by y.e^(int Pdx)=int (Qe^(int Pdx))dx+c . Answer the question:Solution of differential equation (1+y^2)dx+(x-e^(-tan^-1y)dy=0 is (A) y=tan^-1x+c (B) ye^(tan^-1x)=tan^-1x+c (C) xe^(tan^-1y)=tan^-1y+c (D) none of these

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