(1-x^2)(1-y)dx=xy(1+y)dy

4 min read Jun 16, 2024
(1-x^2)(1-y)dx=xy(1+y)dy

Solving the Differential Equation: (1-x^2)(1-y)dx = xy(1+y)dy

This article will guide you through solving the given differential equation: (1-x^2)(1-y)dx = xy(1+y)dy. This equation is classified as a separable differential equation because we can rearrange it so that all terms containing x and dx are on one side, and all terms containing y and dy are on the other.

Step 1: Separating the Variables

  1. Divide both sides by (1-y) and xy(1+y):

    (1-x^2)/(xy(1+y)) dx = dy/(1-y)
    
  2. Simplify:

    (1/(xy(1+y)) - x/(y(1+y))) dx = dy/(1-y)
    

Now the equation is separated.

Step 2: Integrating Both Sides

  1. Integrate the left side with respect to x:

    ∫ (1/(xy(1+y)) - x/(y(1+y))) dx = ∫ dy/(1-y)
    

    To solve the integrals on the left side, we'll use partial fractions:

    • 1/(xy(1+y)): We can write this as A/x + B/y + C/(1+y) and solve for A, B, and C.
    • x/(y(1+y)): We can write this as D/y + E/(1+y) and solve for D and E.

    After solving for the constants and integrating, the left side becomes:

    (1/y)ln|x| - (1/(1+y))ln|1+x| + C1 
    
  2. Integrate the right side with respect to y:

    ∫ dy/(1-y) = -ln|1-y| + C2
    

Step 3: Combining Constants and Solving for y

  1. Combine the constants of integration: C1 - C2 = C

  2. The general solution is:

    (1/y)ln|x| - (1/(1+y))ln|1+x| = -ln|1-y| + C
    
  3. This equation implicitly defines y in terms of x. It's difficult to explicitly solve for y in this case.

Conclusion

We have successfully solved the differential equation (1-x^2)(1-y)dx = xy(1+y)dy and obtained an implicit solution. This solution can be used to analyze the behavior of the dependent variable y with respect to the independent variable x.

Remember that the solution includes an arbitrary constant C. This constant represents different possible solutions to the differential equation, creating a family of curves.

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