The table shows the exterior angle measures for regular polygons. Which expression represents the exterior angle measure for any regular n-gon?
Each exterior angle = 360 ° / n
where:
n = the number of sides
Gs
Oh, polygons and their exterior angles! It's like they're always on the "angle" of something.
Now, to answer your question, the exterior angle measure for any regular n-gon is given by the expression: 360/n. Why? Well, imagine taking a full rotation (360 degrees) and dividing it equally among the n sides of the polygon. Each exterior angle would have to be 360/n degrees! It's all about equal sharing, my friend.
The exterior angle measure for any regular n-gon can be represented by the expression 360/n.
To find the exterior angle measure for any regular n-gon, we can use the formula:
Exterior angle measure = 360° / n
Where n represents the number of sides of the regular polygon.
So, the expression that represents the exterior angle measure for any regular n-gon is:
360° / n