The differential equation corresponding to `xy=c^(2)` where c is an arbitrary constant is ________

On finding the differential equation corresponding to y=e^(mx) where m is the arbitrary constant, then m is _________.

If xy=a^(2) where a is arbitrary constant then :

From the differential equation corresponding to the equation xy=c^(2)

From the differential equation representing the family of curves y=nx, where n is an arbitrary constant.

The differential equation for the family of curve x^2+y^2-2a y=0, where a is an arbitrary constant, is

Find the differential equation of the family of parabolas y^(2) = 4 ax where a is an arbitrary constant .

The differential equation whose solution is A x^2+B y^2=1 , where A and B are arbitrary constants, is of (a) second order and second degree (b) first order and second degree (c) first order and first degree (d) second order and first degree

If y=a+bx^(2) , where a, b are arbitrary constants, then