Once you know which side is the hypotenuse, use $a^2 + b^2 = c^2$ with the legs on the left and the hypotenuse on the right. Which sides are the legs in $\triangle DEF$?

After you plug in $DE = 5$ and $DF = 13$, you will get an equation involving $EF^2$ and two numbers. Rearrange it so that $EF^2$ is alone. Do you need to add or subtract to do that?

Type sqrt(13^2 - 5^2) into Desmos. The value that Desmos returns is the length of $EF$ in centimeters.

Since angle $E$ is the right angle, the side opposite angle $E$ is the hypotenuse. That side is $DF$. The two sides that meet at the right angle, $DE$ and $EF$, are the legs of the right triangle.

For a right triangle with legs $a$ and $b$ and hypotenuse $c$, the Pythagorean theorem says

Here, $DE$ and $EF$ are the legs, and $DF$ is the hypotenuse, so:

You are given $DE = 5$ and $DF = 13$. Substitute these values into the equation:

Now isolate $EF^2$:

To get $EF$, take the positive square root (side lengths are positive):

So the length of side $EF$ is 12 centimeters, which corresponds to choice B.