Find the differential equation corresponding to the equation `y=Ae^(2x)+Be^(-x)`.

Find the differential equation corresponding to the equation y=A*e^(x)+B .

i . Form the differential equation corresponding to the function y=ae^(x)+be^(2x) . ii . State the order and degree of the differential equation obtained.

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

Find the order of the differential equation corresponding to y=Ae^(x)+Be^(2x)+Ce^(3x)(A,B,C being parameters) is a solution

Find the order of the differential equation corresponding to y=Ae^(x)+Be^(3x)+Ce^(5x) (A, B, C being parameters) is a solution.

Find the differential equation corresponding to jy=ae^(2x)+be^(-3x)+ce^(x) where a,b,c are arbitrary constants.

Form the differential equation corresponding to y=a x^2+b x+c

Find the differential equation corresponding to the family of curves y=c(x-c)^2 where c is an arbitrary constant.

The differential equation corresponding to the family of curves y=e^(x)(ax+b) is

The differential equation corresponding to the family of curves y=e^x (ax+ b) is