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Differential Equations : Differential Equations

Study concepts, example questions & explanations for Differential Equations

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Example Questions

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Example Question #1 : First Order Differential Equations

Solve the given differential equation by separation of variables.

$x\frac{dy}{dx}=6y$

Possible Answers:

y=6cx

y=x^6

y=cx^6

y=cx-6

y=6x

Correct answer:

y=cx^6

Explanation:

To solve this differential equation use separation of variables. This means move all terms containing to one side of the equation and all terms containing to the other side.

$x\frac{dy}{dx}=6y$

First, multiply each side by .

xdy=6ydx

Now divide by on both sides.

$\frac{xdy}{y}=6dx$

Next, divide by on both sides.

$\frac{dy}{y}=\frac{6dx}{x}$

From here take the integral of both sides. Remember rules for logarithmic functions as they will be used in this problem.

$\\\int\frac{dy}{y}=\int\frac{6dx}{x} \\\\\ln y=6\ln x \\\\e^{\ln y}=e^{6\ln x} \\\\y=e^{\ln x^6} \\\\y=cx^6$

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Example Question #1 : Separable Variables

Solve the following differential equation

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

Possible Answers:

ln(y)=x^3

$y=Ce^x^{^{3}}$

$y=e^x^{^{3}}$

$ln(y)=e^x^{^{3}}$

$y=e^x^{^{3}+C}$

Correct answer:

$y=Ce^x^{^{3}}$

Explanation:

So this is a separable differential equation. The first step is to move all of the x terms (including dx) to one side, and all of the y terms (including dy) to the other side.

So the differential equation we are given is: $\frac{dy}{dx}=3x^2y$

Which rearranged looks like: $\frac{dy}{y}=3x^2dx$

At this point, in order to solve for y, we need to take the anti-derivative of both sides: $\int \frac{dy}{y}=\int 3x^2dx$

Which equals: ln(y)=x^3+C

And since this an anti-derivative with no bounds, we need to include the general constant C

So, solving for y, we raise e to the power of both sides:

$e^{ln(y)}=e^{x^3+C}$ which, simplified gives us our answer:

$y=Ce^{x^3}$

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Example Question #1 : Separable Variables

Solve the following separable differential equation: y' = 5yt^4 with y(0) = 3 .

Possible Answers:

$y = 4e^{t^4}$

$y = 5e^{t^5}$

$y = 3e^{3t^5}$

$y = 3e^{t^5}$

$y = 3e^{t^4}$

Correct answer:

$y = 3e^{t^5}$

Explanation:

The simplest way to solve a separable differential equation is to rewrite as $\frac{\mathrm{d} y}{\mathrm{d} t}$ and, by an abuse of notation, to "multiply both sides by dt". This yields

dy = 5yt^5dt .

Next, we get all the y terms with dy and all the t terms with dt and integrate. Thus,

$\int \frac{dy}{y} = \int 5t^4dt$

ln|y| +K = t^5 +C

Combining the constants of integration and exponentiating, we have

$|y| = e^{t^5 + C}$

$y = \pm e^Ce^{t^5}$

The plus minus and the e^C can be combined into another arbitrary constant, yielding $y = Ce^{t^5}$ .

Plugging in our initial condition, we have

3 = C

and

$y = 3e^{t^5}$

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Example Question #1 : Separable Variables

Solve the general solution for the ODE:

$\frac{dy}{dx}=x^8y$