Separable differential equations Calculator

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Difficult Problems

Solved example of separable differential equations

$\frac{dy}{dx}=\frac{2x}{3y^2}$

Rewrite the differential equation in the standard form $M(x,y)dx+N(x,y)dy=0$

$3y^2dy-2xdx=0$

The differential equation $3y^2dy-2xdx=0$ is exact, since it is written in the standard form $M(x,y)dx+N(x,y)dy=0$, where $M(x,y)$ and $N(x,y)$ are the partial derivatives of a two-variable function $f(x,y)$ and they satisfy the test for exactness: $\displaystyle\frac{\partial M}{\partial y}=\frac{\partial N}{\partial x}$. In other words, their second partial derivatives are equal. The general solution of the differential equation is of the form $f(x,y)=C$

$\frac{dy}{dx}=\frac{2x}{3y^2}$

Find the derivative of $M(x,y)$ with respect to $y$

$\frac{d}{dy}\left(-2x\right)$

The derivative of the constant function ($-2x$) is equal to zero

Find the derivative of $N(x,y)$ with respect to $x$

$\frac{d}{dx}\left(3y^2\right)$

The derivative of the constant function ($3y^2$) is equal to zero

Using the test for exactness, we check that the differential equation is exact

$0=0$

The integral of a function times a constant ($-2$) is equal to the constant times the integral of the function

$-2\int xdx$

Applying the power rule for integration, $\displaystyle\int x^n dx=\frac{x^{n+1}}{n+1}$, where $n$ represents a number or constant function, in this case $n=1$

$-x^2$

Since $y$ is treated as a constant, we add a function of $y$ as constant of integration

$-x^2+g(y)$

Integrate $M(x,y)$ with respect to $x$ to get

$-x^2+g(y)$

The derivative of the constant function ($-x^2$) is equal to zero

The derivative of $g(y)$ is $g'(y)$

$0+g'(y)$

Now take the partial derivative of $-x^2$ with respect to $y$ to get

$0+g'(y)$

Simplify and isolate $g'(y)$

$3y^2=0+g$

$x+0=x$, where $x$ is any expression

$3y^2=g$

Rearrange the equation

$g=3y^2$

Set $3y^2$ and $0+g'(y)$ equal to each other and isolate $g'(y)$

$g'(y)=3y^2$

Integrate both sides with respect to $y$

$g=\int3y^2dy$

The integral of a function times a constant ($3$) is equal to the constant times the integral of the function

$g=3\int y^2dy$

Apply the power rule for integration, $\displaystyle\int x^n dx=\frac{x^{n+1}}{n+1}$, where $n$ represents a number or constant function, such as $2$

$g=y^{3}$

Find $g(y)$ integrating both sides

$g(y)=y^{3}$

We have found our $f(x,y)$ and it equals

$f(x,y)=-x^2+y^{3}$

Then, the solution to the differential equation is

$-x^2+y^{3}=C_0$

We need to isolate the dependent variable $y$, we can do that by subtracting $-x^2$ from both sides of the equation

$y^{3}=C_0+x^2$

Removing the variable's exponent

$y=\sqrt[3]{C_0+x^2}$

Find the explicit solution to the differential equation

$y=\sqrt[3]{C_0+x^2}$

Final Answer

$y=\sqrt[3]{C_0+x^2}$

Separable differential equations Calculator

Get detailed solutions to your math problems with our Separable differential equations step-by-step calculator. Practice your math skills and learn step by step with our math solver. Check out all of our online calculators here!

Example

Solved Problems

Difficult Problems

Final Answer

Struggling with math?

Separable differential equations Calculator

Get detailed solutions to your math problems with our Separable differential equations step-by-step calculator. Practice your math skills and learn step by step with our math solver. Check out all of our online calculators here!

Example

Solved Problems

Difficult Problems

Final Answer

Struggling with math?

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