The formula for finding the interior angles of a shape with n sides is ((n-2)*180)/n. Thus, we have ((17-2)*180)/17 = (15*180)/17 = 2700/17 = 158.824 degrees.
The exterior angle of a 7 sided shape add up to 360 degrees The interior angles of a 7 sided shape add up to 900 degrees
Providing that it is a regular 15 sided polygon then each interior angle will be 156 degrees
If it's a regular 8 sided octagon then each interior angle is 135 degrees and they all add up to 1080 degrees
That all interior angles are equal in size.
Exterior angle = 360/16 = 22.5 So interior angle = 180 - 22.5 = 157.5 degrees.
The exterior angle of a 7 sided shape add up to 360 degrees The interior angles of a 7 sided shape add up to 900 degrees
152.307692 repeating degrees
Each angle in a 28-sided shape is about 167.14 degrees.
Providing that it is a regular 15 sided polygon then each interior angle will be 156 degrees
156 degrees Sum of interior angles of a polygon=180(n-2), where n is the number of sides. To find one interior angle's measure, divide by the total number of angles, which is also the total number of sides.
hexagon
Absolutely !
Each angle would be 170.27027 degrees. The total sum of all interior angles is 6300 degrees. This shape is called a triacontakaiheptagon.
If its a regular 8 sided octagon then each interior angle is 135 degrees
If it's a regular 9 sided nonagon then each interior angle is 140 degrees and they all add up to 1260 degrees
The sum of the interior angles of a n-gon is (n-2)*180 degrees. So the sum of the interior angles of a 15-gon would be (15-2)*180 degrees = 2340 degrees. If the 15-gon is regular then all its interior angles are equal. In that case, each would be 2340/15 = 156 degrees.
The equation for the size of an interior angle of an n-sided regular polygon is (n-2)180/n. When n=7, the interior angle of a regular sided shape would be 5x180/7 or approximately 128.57. The polygon in the question has an interior right angle (90 degree angle) and thus cannot be a regular shape. A 7 sided shape is called a heptagon. Thus, the shape described in the question is an irregular heptagon.