Elimination of arbitrary constants A and B from `y=(A)/(x)+B,xgt0` leads to the differential equation

The general solution of a differential equation contains 3 arbitrary constants. Then what is the order of the differential equation?A)2 B)3 C)0 D)1

Verify that the function y=c_1 e^(a x) cos b x+c_2 e^(a x) sin b x , where c_1, c_2 are arbitrary constants is a solution of the differential equation. ((d^2 y)/(d x^2))-2 a (dy)/(dx)+(a^2+b^2) y=0

The general solution of the differential equation xy'+y=x^(2),xgt0 is

The family of curves y = e^(a sin x) , where a is an arbitrary constant, is represented by the differential equation

By eliminating 'a' and 'b' from the equation of circle with center (a,b) and radius r. form the differential equation corresponding to the family.

Consider the differential equation dy/dx=(x+y)/x Write the order of the differential equation.

solve the differential equation (x^2-y^2) d x+2 x y d y=0

Consider the differential equation dy/dx=(x+y)/x Solve the above given differential equation.

Consider the differential equation y^2 + (x - 1/y) (dy)/(dx) = 0 Solve the given differential equation