The differential equation for the straight lines `y=mx+c` (m and c are parameters) is -

The differential equation of the curve x/(c-1)+y/(c+1)=1 is

Find the differential equation of the family of circles x^(2) + y^(2) = 2ay , where a is a parameter .

Find the differential equation of the family of circles x^(2) + y^(2) = 2ax , where a is a parameter .

Find the differential equation of all straight lines passing through the point (0,3).

Form the differential equation representing the family of curves y = mx where, m is arbitrary constant.

Find the differential equation of the curves given by y=Ae^(2x)+Be^(-2x) , where A and B are parameters.

Find the differential equation of the curves given by y = Ae^(2x)+Be^(-2x) where A and B are parameters.

Differential equation of the family of circles touching the line y =2 at (0,2) is -

Differential equation of the family of circles touching the line y=2 at (0,2) is

choose the correct answer from the given alternatives: if the straight line y=mx+1 be the tangent of the parabola y^2=4x , then the value of m will be