Find the differential equation that represents the family of all parabolas having their axis of symmetry with the x-axis.

Show that the differential equation that represents the family of all parabolas having their axis of symmetry coincident with the axis of x is yy_(2)+y_(1)^(2)=0

The differential equation that represents all parabolas having their axis of symmetry coincident with the axis of x, is

The differential equation of all parabola having their axis of symmetry coinciding with the x- axis is

Find the differential equation of the family of all straight lines.

From the differential equation of the family of parabolas with focus at the origin and axis of symmetry along the x-axis. Find the order and degree of the differential equation.

Form the differential equation of the family of parabolas with focus at the origin and the axis of symmetry along the axis.

The differential equation of all parabolas having their axes of symmetry coincident with the axes of x, is

Form the differential equation representing the family of parabolas having vertex at origin and axis along positive direction of x -axis.

The order of the differential equation of the family of parabolas whose axis is the X-axis is