What is the size of the angle? Draw a polygon that has the same interior angle
The size of an angle is measured in degrees. Therefore, to determine the size of an angle, you need to know the measure in degrees.
Regarding a polygon with the same interior angle, it is difficult to provide a specific example without prior information about the number of sides or the specific angle measure. However, I can provide an example of a regular polygon with a given interior angle measurement.
For instance, let's say the interior angle measure is 120 degrees. In this case, you can draw a regular hexagon (a polygon with six sides) since each interior angle of a regular hexagon measures 120 degrees.
Alternatively, if you provide the specific angle measurement, I can provide a polygon example accordingly.
To determine the size of the angle, we need to know the number of sides in the polygon. Let's assume that the polygon has n sides.
The sum of the interior angles of any polygon can be found using the formula:
Sum of interior angles = (n - 2) * 180 degrees
To find the size of each interior angle, we divide the sum by the number of sides:
Size of each interior angle = (Sum of interior angles) / n
Now, let's draw a polygon with the same interior angle. First, we'll choose a number of sides, n, for our polygon. Then, we'll calculate the size of each interior angle using the formulas mentioned above. Finally, we'll use a suitable drawing tool to create the polygon.
Please provide a number of sides for the polygon, and I can show you the step-by-step process.