Question

discuss all the cases of differential equation reducible to homogeneous form​

Answer 1

Step-by-step explanation:

A differential equation of the form dydx=ax+by+ca1x+b1y+c1, where aa1≠bb1 can be reduced to homogeneous form by taking new variable x and y such that x = X + h and y = Y + k, where h and k are constants to be so chosen as to make the given equation homogeneous.

Answer 2

A differential equation of the form dydx=ax+by+ca1x+b1y+c1, where aa1≠bb1 can be reduced to homogeneous form by taking new variable x and y such that x = X + h and y = Y + k, where h and k are constants to be so chosen as to make the given equation homogeneous