The differential equation which represents the family of curves `y=c_(1)e^(c_(2^(x)` where `c_(1)andc_(2)` are arbitary constants is

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

Find the differential equation whose solution represents the family y=ae^(3x)+be^(x) .

Form the differential equation representing the family of curves y = a sin ( x + b) , where a, b are arbitrary constants.

Find the differential equation whose solution represents the family : c (y + c)^2 = x^3

If the differential equation of the family of curve given by y=Ax+Be^(2x), where A and B are arbitary constants is of the form (1-2x)(d)/(dx)((dy)/(dx)+ly)+k((dy)/(dx)+ly)=0, then the ordered pair (k,l) is

Find the order of the family of curves y=(c_1+c_2)e^x+c_3e^(x+c_4)

In each of the Exercises 1 to 5, form a differential equation representing the given family of curves by eliminating arbitrary constants a and b. 1. (x)/(a) + (y)/(b) = 1

The orthogonal trajectories of the family of curves y=Cx^(2) , (C is an arbitrary constant), is

Verify that the function y = c_(1) e^(ax) cos bx + c_(2)e^(ax) sin bx , where c_(1),c_(2) are arbitrary constants is a solution of the differential equation (d^(2)y)/(dx^(2)) - 2a(dy)/(dx) + (a^(2) + b^(2))y = 0

The differential equation having y=(sin^(-1)x)^(2)+A(cos^(-1)x)+B , where A and B are abitary constant , is