`y = ae^(3x) + be^(-2x)`

Eliminate A and B, y = Ae^(x) + Be^(-x)

Eliminate A and B, y = Ae^(x) + Be^(-x) + x^(2)

Find a differential equation which is satisfied by all curves y = Ae^(2x) + Be^(-(x)/(2)) , where A and B are non-zero constants .

xy =Ae^(x) + Be^(-x)

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.

Prove that lim_(x to 00)(ae^(x)+be^(-x))/(ce^(x)+de^(-x))=(b)/(d)[2ltelt3,d!=0].

If y = 3e^(2x)+2e^(3x) then show that y_2-5y_1 +6y=0

The differential equation obtained by eliminating constants A and B from y=Ae^(2x)+Be^(-(x)/(2)) is -

Prove the x^(2) - y^(2) = c (x^(2) + y^(2))^(2) is the general solution of differential equation (x^(3) - 3x y^(2))dx = (y^(3) - 3x^(2)y)dy , where c is a parameter.