Question
Verify that the function xy = log y + C (explicit or implicit) is a solution of differential equation $y' = \frac{{{y^2}}}{{1 - xy}}\left( {xy \ne 1} \right)$
To prove:y given by eq. (i) is a solution of differential equation $y' = \frac{{{y^2}}}{{1 - xy}}$ ....(ii)
Proof: Differentiating both sides of eq. (i) w.r.t x, we have
$xy' + y\left( 1 \right) = \frac{1}{y}y' + 0$
$ \Rightarrow xy' - \frac{{y'}}{y} = - y$
$ \Rightarrow y'\left( {x - \frac{1}{y}} \right) = - y$
$ \Rightarrow y'\left( {\frac{{xy - 1}}{y}} \right) = - y$
$\Rightarrow y'\left( {xy - 1} \right) = - {y^2}$
$ \Rightarrow y' = \frac{{ - {y^2}}}{{xy - 1}}$
$ \Rightarrow y' = \frac{{ - {y^2}}}{{ - \left( {1 - xy} \right)}} = \frac{{{y^2}}}{{1 - xy}}$
Hence, function (implicit) given by eq. (i) is a solution of $y' = \frac{{{y^2}}}{{1 - xy}}$.
Generate a complete, print-ready paper with questions like this in minutes — across 16+ boards, with answer keys.