MCQ
વિકલ સમીકરણ $\frac{{dy}}{{dx}} = \frac{{xy}}{{{x^2} + {y^2}}}$ નો ઉકેલ મેળવો.
- ✓$a{y^2} = {e^{{x^2}/{y^2}}}$
- B$ay = {e^{x/y}}$
- C$y = {e^{{x^2}}} + {e^{{y^2}}} + c$
- D$y = {e^{{x^2}}} + {y^2} + c$
$\therefore v + x\frac{{dv}}{{dx}} = \frac{{(x)(vx)}}{{{x^2} + {v^2}{x^2}}}$
==> $v + x.\frac{{dv}}{{dx}} = \frac{v}{{1 + {v^2}}}$ ==> $x\frac{{dv}}{{dx}} = \frac{{ - {v^3}}}{{1 + {v^2}}}$
==> $\frac{{(1 + {v^2})}}{{{v^3}}}dv = - \frac{{dx}}{x}$ ==> $\left( {\frac{1}{{{v^3}}} + \frac{1}{v}} \right)dv = - \frac{{dx}}{x}$
Integrating both sides, $\int_{}^{} {\frac{{dv}}{{{v^3}}}} + \int_{}^{} {\frac{{dv}}{v}} = - \int_{}^{} {\frac{{dx}}{x}} $
==> $ - \frac{1}{{2{v^2}}} + \log v = - \log x - \log c$
==> $ - \frac{{{x^2}}}{{2{y^2}}} + \log y = - \log c$ ==> $\log cy = \frac{{{x^2}}}{{2{y^2}}}$
==> $cy = {e^{{x^2}/2{y^2}}}$ ==> ${c^2}{y^2} = {e^{{x^2}/{y^2}}}$
$\therefore {y^2}a = {e^{{x^2}/{y^2}}}$, where ${c^2} = a$.
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