Let $x$ be the measure of the smaller angle. How can you express the measure of the larger angle in terms of $x$ if it is 4 times the smaller?

Write an equation that shows the sum of the two angle expressions equals the measure of a straight angle, and then solve for $x$.

From the setup, the two angles satisfy $x + 4x = 180$, which simplifies to $5x = 180$, so $x = 180/5$.

In Desmos, type 180/5 as an expression. The value that Desmos outputs is the measure of the smaller angle in degrees.

A straight angle measures $180^\circ$. If two angles are adjacent and form a straight angle, then their measures add up to $180$ degrees.

Let the measure of the smaller angle be $x$ degrees. The other angle is 4 times as large, so its measure is $4x$ degrees.

Because the two angles form a straight angle, their measures must add to $180$:

Combine like terms:

Solve $5x = 180$ by dividing both sides by 5:

So, the measure of the smaller angle is $36$ degrees.