Find to the nearest degree,the size of each angle of a regular heptagon(seven sides)
The sum of the 7 angles is 5*180 = 900 degrees
900/7 = 128.57 or 129°
Well, a regular heptagon has seven sides, which means it also has seven angles of equal measure. Let's call the measure of each angle "x". Since we want to find the size of each angle to the nearest degree, we just need to find the value of "x" and round it to the nearest whole number.
To calculate "x", we can use the formula for finding the measure of an interior angle of a regular polygon: (n-2) * 180 / n, where "n" is the number of sides in the polygon.
In this case, the formula would be (7-2) * 180 / 7 = 128.5714... degrees.
Now, let's round that to the nearest whole number, giving us a final answer of approximately 129 degrees.
So, the size of each angle of a regular heptagon is approximately 129 degrees. Keep in mind that my calculations might be a little funny, but I hope it helps!
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.
For a regular heptagon (a polygon with seven sides), we substitute n = 7 into the formula:
angle = (180 * (7 - 2)) / 7
angle = (180 * 5) / 7
angle = 900 / 7
angle ≈ 128.57 degrees
So, the size of each angle of a regular heptagon is approximately 128.57 degrees.
To find the size of each angle of a regular heptagon (a polygon with seven sides), we can use the formula:
Angle = (180 * (n - 2)) / n
where "n" represents the number of sides of the polygon.
For a regular heptagon, we substitute n = 7 into the formula:
Angle = (180 * (7 - 2)) / 7
= (180 * 5) / 7
= 900 / 7
≈ 128.571 degrees
Therefore, each angle of a regular heptagon is approximately 128.571 degrees (rounded to the nearest degree, it would be 129 degrees).