Show that each of the following expressions is a solution of the corresponding given differential equation.
`(ii) y=ae^(x)+be^(-x); y''-y=0`

Show that each of the following expressions is a solution of the corresponding given differential equation. (i) y=2x^2;xy'=2y

Show that each of the following expressions is a soluton of the corresponding given differential equation (i) y=2x^(2),xy'=2y (ii) y=ae^(x)+be^(-x), y''-y=0

Solve the given differential equation. y'=(x+y)/(x)

Form the differential equation from y = Ae^(3x) +Be^(-2x) .

For each of the exercises given below, verify that the given function (implicit or explicit) is a solution of the corresponding differential equation. xy = ae^(x) + be^(-x) + x^(2) : x (d^(2)y)/(dx^(2)) + 2(dy)/(dx) - xy + x^(2) - 2 = 0

Find the general solution of the following differential equation. xy'+y=x^(4)

Verify that the given functions ( explicit or implicit ) is a solution of the corresponding differential equation : y=e^(x)+1:y''-y'=0

For each of the exercises given below, verify that the given function ( implicit or explicit ) is a solution of the corresponding differential equation. y=ae^(x)+be^(-x)+x^(2): x(d^(2)y)+2(dy)/(dx)-xy+x^(2)-2=0

Verify that the given functions ( explicit or implicit ) is a solution of the corresponding differential equation : y=x^(2)+2x+C:y'-2x-2=0

Verify that the given functions ( explicit or implicit ) is a solution of the corresponding differential equation : y=Ax:xy'=y(xne0)