find the nearest degree, the size of each angle of a regular heptagon (seven sides)
http://www.coolmath.com/reference/polygons-07-heptagons
Find to the nearest degree the size of the angles of a regular heptagon working and answer
To find the size of each angle of a regular heptagon (seven sides), we can use the formula:
Angle = (180 * (n - 2)) / n
where "n" is the number of sides of the polygon.
In this case, since we have a heptagon with seven sides, we can substitute the value of "n" as 7 in the formula:
Angle = (180 * (7 - 2)) / 7
= (180 * 5) / 7
= 900 / 7
≈ 128.57 degrees (nearest degree)
Therefore, the nearest degree for each angle of a regular heptagon is approximately 128 degrees.
To find the size of each angle of a regular heptagon, we can use the formula:
Angle = (180 * (n - 2)) / n
where "n" is the number of sides of the polygon. In this case, "n" is 7 since a heptagon has seven sides.
Substituting the value into the formula:
Angle = (180 * (7 - 2)) / 7
= (180 * 5) / 7
= 900 / 7
≈ 128.57 degrees
Therefore, the nearest degree approximation of each angle of a regular heptagon is 129 degrees.