COMEDK · Maths · 32. Differential Equations
The general solution of the differential equation \(\left(1+y^2\right) d x=\left(\tan ^{-1} y-x\right) d y\)
- A \(x=c \tan ^{-1} y+e^{-\tan ^{-1} y}\)
- B \(x=\tan ^{-1} y+c e^{\tan ^{-1} y}\)
- C \(x=\tan ^{-1} y-1+c e^{-\tan ^{-1} y}\)
- D \(x=\tan ^{-1} y-1+c e^{\tan ^{-1} y}\)
Answer & Solution
Correct Answer
(C) \(x=\tan ^{-1} y-1+c e^{-\tan ^{-1} y}\)
Step-by-step Solution
Detailed explanation
The given differential equation is \((1+y^2) dx = (\tan^{-1} y - x) dy\). Rearranging the terms, we get \(\dfrac{dx}{dy} = \dfrac{\tan^{-1} y - x}{1+y^2}\). This can be written as \(\dfrac{dx}{dy} + \dfrac{x}{1+y^2} = \dfrac{\tan^{-1} y}{1+y^2}\). This is a linear differential…
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