Form of the differential equation of all family of lines `y=mx+(4)/(m)` by eliminating the arbitrary constant m is

The differential equation of the family of lines y = mx is :

Form the differential equation representing the family of curves y=(A)/(x)+5 , by eliminating the arbitrary constant A.

Form the differential equation representing the family of curves y= A sin x , by eliminating the arbitrary constant A.

From a differential equation representing the family of curves y=ae^(3x)+be^(2x) by eliminating arbitrary constants a and b .

The differential equation of the family of straight line y=mx+(4)/(m) , where m is the parameter, is

The differential equation of the family of straight line y=mx+(4)/(m) , where m is the parameter, is

Form the differential equation for the family of curves y^2= 4a (x+b) where a and b arbitrary constants.

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

Form a differential equation representing the given family of curves by eliminating arbitrary constants b . y=be^(2x)x