how do I find the number of degrees in the point angle of a {5/2} star polygon?
Since it is a polygon and a polygon has to equal 360 degrees...would I divide 360 by 5?
Please help
gfhjdfj
How does that help me please help I need this soon
To find the number of degrees in the point angle of a {5/2} star polygon, you can follow these steps:
1. Start with the knowledge that the sum of the interior angles of any polygon is given by the formula (n - 2) * 180 degrees, where n is the number of sides of the polygon.
2. In the case of a {5/2} star polygon, it has both a 5-gon (pentagon) and a 2-gon (digon) as its sides.
3. To find the total number of degrees in the interior angles of the {5/2} star polygon, you need to calculate the sum of the interior angles of both the pentagon and the digon.
4. Apply the formula for the pentagon, which would be (5 - 2) * 180 degrees. This would yield 3 * 180 = 540 degrees.
5. Apply the formula for the digon, which would be (2 - 2) * 180 degrees. This would yield 0 degrees since a digon is a degenerate case with no interior angles.
6. Add the results from steps 4 and 5 together: 540 + 0 = 540 degrees.
Therefore, the number of degrees in the point angle of a {5/2} star polygon is 540 degrees.