Is it possible to have a regular polygon whose interior angles is 100?
Hence, it is not a whole number.
How many sides does a regular polygon have if the interior angle is 100?
Is it possible to have a regular polygon each of whose interior angles is 100°? Sum of Interior Angle and Exterior Angle = 180° Interior Angle = 100° So, Exterior Angle = 180° – 100° = 80° No. of Sides = 360° / Exterior Angle = 360/80 = 4.5 4.5 is not an integer.
Is it possible to have a regular polygon each of whose interior angles is 125o justify your answer?
Step-by-step explanation: It impossible for a interior angle of a regular polygon to equal degrees. … A polygon cannot have sides, so the angle can’t measure degrees.
Is it possible to have a regular polygon each of whose interior angle is 45o?
Yes, it is possible to have a regular polygon each of whose interior angle is 45°. n = (360°/135) =8/3.
Is it possible to have a regular polygon each of whose interior angle is?
Answer: No it is not possible to have a regular polygon each of whose interior angle is 45°.
Can a regular polygon have an interior angle of?
The interior angles of a polygon are equal to a number of sides. Angles are generally measured using degrees or radians. So, if a polygon has 4 sides, then it has four angles as well….Interior angles of Regular Polygons.
| Regular Polygon Name | Each interior angle |
|---|---|
| Triangle | 60° |
| Quadrilateral | 90° |
| Pentagon | 108° |
| Hexagon | 120° |
Is the interior angle of a regular polygon is 162 How many sides does it have?
20
Summary: The number of sides of a regular polygon, if each of its interior angles is 162° is 20.
Is it possible to have a regular polygon each of whose exterior angle is 135?
Question 4 Hence, it is possible to have a regular polygon whose interiro angle is 135° . Hence, it is possible to have a regular polygon whose interior angle is 138°.
Is it possible to have a regular polygon each of whose interior angle is 148?
yes it is by making interior angles.
Is it possible to have a regular polygon each of whose?
Is it possible to have a regular polygon each of whose interior angle?
Since n is not an integer, it is not possible to have a regular polygon with each interior angle equal to 100°.
Is it possible to have a regular polygon of each of whose interior angle is 40?
Hence it is possible to have a regular polygon whose exterior angle is 40\% of the right angle.