" (iv) "y=e^(x)(a cos x+b sin x)

The differential equation of the curve y=e^(x) (a cos x + b sin x) representing the given family of curves where a and b are costants , is

Obtain the differential equation by eliminating 'a' and 'b' from the equation : y= e^(x)(a cos 2x + b sin 2x) .

In y = e^(x) ( a cos x + b sin x) form the differential equation by eliminating arbitrary constants a and b .

find the general solution for the differential equations y = e^(x)(a cos x + b sin x)

from the differential equation by eliminating the arbitrary constants from the following equations : (1) y= e^(x) (A cos x + B sin x)

The differential equation of the family of curves y=e^(2x)(a cos x+b sin x) where, a and b are arbitrary constants, is given by