Three angles of a nonagon are equal and the sum of six other angles is 1110o. Calculate the size of one of the equal angles
- 210o
- 150o
- 105o
-
50o
The correct answer is: D
Explanation
Sum of interior angles of any polygon is (2n - 4) right angle; n angles of the Nonagon = 9
Where 3 are equal and 6 other angles = 1110o
(2 x 9 - 4)90o = (18 - 4)90o
14 x 90o = 1260o
9 angles = 1260Β°; 6 angles = 110o
Remaining 3 angles = 1260o - 1110o = 150o
Size of one of the 3 angles \(\frac{150}{3}\) = 50o