The differential equation obtained by eliminating the arbitrary constants from the equation $y^{2}=(2 x+c)^{5}$ is

The differential equation of the family of curves $y = a e^x + b x e^x + c x^2 e^x$,where $a, b, c$ are arbitrary constants,is

If $a$ and $b$ are arbitrary constants,then the differential equation corresponding to the family of curves given by $y=x[a \cos (\log x)+b \sin (\log x)]$ is

Statement $(I)$: The elimination of arbitrary constants $\alpha, \beta$ and $\gamma$ from $y=(\alpha+\beta+\gamma) x$ results in a differential equation of order three.
Statement $(II)$: The elimination of arbitrary constants $\alpha, \beta$ and $\gamma$ from $y=\alpha x+\beta \sin x+\gamma e^x$ results in a differential equation of order three.

Let $p \in \mathbb{R}$. Then the differential equation of the family of curves $y=(\alpha+\beta x) e^{p x}$,where $\alpha$ and $\beta$ are arbitrary constants,is

Form the differential equation representing the family of ellipses having foci on the $x$-axis and centre at the origin.