The sum of the interior angles of a polygon is three times sum of its
exterior angles. Find the number of sides of the polygon.
Answers
Answer:
As we know the sum of interior angles of a regular polygon =(n−2)×180∘, where n is the number of sides. Now it is given that the sum of interior angles of a polygon is three times the sum of exterior angles. Therefore sum of interior angles of a regular polygon = 3× sum of exterior angles.
Answer:
As we know the sum of interior angles of a regular polygon =(n−2)×180∘, where n is the number of sides.
Now as we know that the sum of exterior angles of a regular polygon =360∘
Now it is given that the sum of interior angles of a polygon is three times the sum of exterior angles.
Therefore sum of interior angles of a regular polygon = 3× sum of exterior angles.
⇒(n−2)×180∘=3×360∘
Now simplify the above equation we have,
⇒(n−2)=3×360∘180∘=6
⇒n=6+2=8
Therefore the sides of the regular polygon = 8.
Hence option (d) is correct.
Note – The basic understanding of Interior angle and exterior angle is the key part of this problem. Interior angle is the angle of a polygon inside of it at one of its vertices whereas exterior angle is an acute angle outside the polygon formed by one of its side and the extension of adjacent side.