Form the differential equation of the family of parabolas having vertex at origin and axis along the positive $y$-axis.

If $A$ and $B$ are arbitrary constants,then the differential equation having $y=Ae^{x}+B \sin 2 x$ as its general solution 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.

Form the differential equation of the family of circles in the first quadrant which touch the coordinate axes.

The differential equation of the simple harmonic motion given by $x=A \cos (n t+\alpha)$ is

If $l$ and $m$ are the order and degree of the differential equation of all straight lines at a constant distance of $P$ units from the origin,then $l m^2+l^2 m=$