Mathematics Department

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Exact Equations

Additional Examples

Solve the following initial value problem, $$\begin{align} \frac{dy}{dx} &= \frac{-4y^2 - 12y - 4x + 21}{9y^2 + 8xy + 2y + 12x - 7} \\ y(-2) &= 0 \end{align}$$ This can be written as an exact equation. First we find the general solution following the paradigm.

  1. We write the equation in the standard form, M dx + N dy = 0. $$ (4y^2 + 12y + 4x - 21) dx + (9y^2 + 8xy + 2y + 12x - 7) dy = 0 $$
  2. We test for exactness. $$\frac{\partial}{\partial y}\left(4y^2 + 12y + 4x - 21\right) = 8y + 12 = \frac{\partial}{\partial x}\left(9y^2 + 8xy + 2y + 12x - 7\right) $$ so the equation is exact.

  3. Write the partial differential equations. $$ \begin{align} \frac{\partial F}{\partial x} &= 4y^2 + 12y + 4x - 21\\ \frac{\partial F}{\partial y} &= 9y^2 + 8xy + 2y + 12x - 7 \end{align}$$
  4. Integrate the first partial differential equation. $$ F(x,y) = \int (4y^2 + 12y + 4x - 21)\,\partial x = 4xy^2 + 12xy + 2x^2 - 21x + C(y) $$
  5. Integrate the second partial differential equation. $$ F(x,y) = \int (9y^2 + 8xy + 2y + 12x - 7)\,\partial y = 3y^3 + 4xy^2 + y^2 + 12xy - 7y + \tilde{C}(x) $$
  6. Equate the expressions for F(x,y).

    Matching the expressions up, we find $C(y) = 3y^3 + y^2 - 7y$ and $ \tilde{C}(x) = 2x^2 - 21x. $ So $$ F(x,y) = 3y^3 + 4xy^2 + 12xy + 2x^2 + y^2 - 21x - 7y. $$

  7. The solution is $F(x,y) = K.$ $$ 3y^3 + 4xy^2 + 12xy + 2x^2 + y^2 - 21x - 7y = K $$
Now we plug in the initial values $x = -2$ and $y = 0$ and solve for $K = 50$. So the solution to the initial value problem is $$ 3y^3 + 4xy^2 + 12xy + 2x^2 + y^2 - 21x - 7y = 50 $$ You may reload this page to generate additional examples.


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