Form the differential equation corresponding to `y^2=a(b-x)^2`,where a and b are arbitrary constant.

Form the differential equation for the curve: y=Ax^2+Bx , where a and b are arbitrary constant.

Find the differential equation corresponding to y=cx+c-c^(3) , where c is arbitrary constant.

Find the differential equation corresponding to y=cx^(3) , where c is arbitrary constant.

Form the differential equation corresponding to y^2=a(b-x) (b+x) by eliminating a and b.

The differential equation corresponding to curve y=a cos(x+b) is :

Find the differential equation corresponding to y=a e^(2x)+b e^(-3x)+c e^x where a ,\ b ,\ c are arbitrary constants.

From the differential equation of the family of curves y=asin(x+b) , where a and b are arbitrary constants.

Form the differential equation corresponding to y^2-2a y+x^2=a^2 by eliminating adot

Form the differential equation corresponding to y^2=a(b-x)(b+x) by eliminating parameters aa n dbdot

Form the differential equation corresponding to y^2=a(b-x)(b+x) by eliminating parameters aa n dbdot