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Differential Equations

Multiple Choice Questions

671.

The differential equation of the family of circles having centre on Y-axis and radius 4 is

$(x^{2} - 4) {(\frac{dy}{dx})}^{2} + x^{2} = 0$
$(x^{2} - 9) {(\frac{dy}{dx})}^{2} + x^{2} = 0$
$(x^{2} - 9) \frac{dy}{dx} + x^{2} = 0$
$(x^{2} - 16) {(\frac{dy}{dx})}^{2} + x^{2} = 0$

672.
The solution of the differential equation $(1 + y^{2}) + (x - e^{\tan^{- 1} (y)}) \frac{dy}{dx} = 0$ is given by

$x - 2 = {ke}^{\tan^{- 1} (y)}$

$2 {xe}^{\tan^{- 1} (y)} = e^{2 \tan^{- 1} (y)} + k$

${xe}^{\tan^{- 1} (y)} = \tan^{- 1} (y) + k$

${xe}^{\tan^{- 1} (y)} = e^{\tan^{- 1} (y)} + k$

$2 {xe}^{\tan^{- 1} (y)} = e^{2 \tan^{- 1} (y)} + k$

$We have, (1 + y^{2}) + (x - e^{\tan^{- 1} (y)}) \frac{dy}{dx} = 0 \Rightarrow (x - e^{\tan^{- 1} (y)}) dy = - dx (1 + y^{2}) \Rightarrow \frac{dx}{dy} = \frac{- (x - e^{\tan^{- 1} (y)})}{1 + y^{2}} \Rightarrow \frac{dx}{dy} + \frac{x}{1 + y^{2}} = \frac{e^{\tan^{- 1} (y)}}{1 + y^{2}} Tlns equation is form of linear differential equation ∴ IF = e^{\int \frac{1}{1 + y^{2}} dy} = e^{\tan^{- 1} (y)} Solution of the given differential equation is {xe}^{^{\tan^{- 1} (y)}} = \int \frac{e^{2 \tan^{- 1} (y)}}{1 + y^{2}} dy \Rightarrow {xe}^{^{\tan^{- 1} (y)}} = \frac{e^{2^{\tan^{- 1} (y)}}}{2} + c \Rightarrow 2 {xe}^{\tan^{- 1} (y)} = e^{2 \tan^{- 1} (y)} + k$