# Question #b0ddf

Jan 24, 2018

5940 degrees

#### Explanation:

We know that the sum of interior angles of any regular polygon is:

$\left(n - 2\right) \cdot 180$

where $n$ is the number of sides.

This is the case as this formula tells you how many triangles the polygon can be split into hence the $180$ telling you the total degrees of all the triangles added together.

Here $n = 35$

$\therefore \left(35 - 2\right) \cdot 180 = 33 \cdot 180 = 5940$ degrees