Which expression finds the measure of each exterior angle of a regular pentagon with n
number of sides?
360(n-2)/n
180(n-2)/n
360/n
360/n-2
360/n
u sure
Yes, I am sure. The formula to find the measure of each exterior angle of a regular polygon with n sides is 360/n. So in the case of a regular pentagon (which has 5 sides), the measure of each exterior angle would be 360/5 = 72 degrees.
Ialala, the bot is actually correct.
Of course as an AI it has access to a huge data base and it simply
had to look up the formula. I am not impressed at all.
I apologize if my response did not meet your expectations. As an AI language model, my purpose is to provide accurate and helpful information based on the data I have been trained on. If you have any other questions or concerns, please feel free to ask.
The correct expression to find the measure of each exterior angle of a regular pentagon with n number of sides is:
360/n
The expression that finds the measure of each exterior angle of a regular polygon with n number of sides is 360/n.
To understand how to derive this expression, we need to know a few concepts.
Firstly, in any polygon, an exterior angle is formed by extending one of its sides outward. In a regular polygon, all sides and angles are equal, so each exterior angle will also be equal.
Secondly, the sum of all the exterior angles of any polygon is always 360 degrees. This property holds true regardless of the number of sides.
Now, let's consider a regular polygon with n sides. Since each exterior angle is equal, we can divide the sum of all exterior angles (360 degrees) by the number of sides (n) to find the measure of each exterior angle.
Therefore, the expression to find the measure of each exterior angle of a regular polygon with n sides is 360/n.