Advertisements
Advertisements
Question
Two angles of a polygon are right angles and the remaining are 120° each. Find the number of sides in it.
Solution
Let the number of sides = n
Sum of interior angles = (n - 2) × 180°
= 180n - 360°
Sum of 2 right angles = 2 × 90° = 180°
∴ Sum of other angles = 180n - 360° - 180°
= 180n - 540°
No.of vertices at which these angles are formed = n - 2
∴ Each interior angle = `(180"n" - 540)/("n" - 2)`
∴ `(180 "n" - 540)/("n" - 2) = 120°`
180n - 540 = 120n - 240
180n - 120n = - 240 + 540
60n = 300
n = `300/60`
n = 5
APPEARS IN
RELATED QUESTIONS
Calculate the sum of angle of a polygon with: 10 sides
Calculate the sum of angle of a polygon with: 12 sides
Calculate the sum of angle of a polygon with: 20 sides
Calculate the sum of angle of a polygon with : 25 sides
Find the number of sides in a polygon if the sum of its interior angle is: 900°
Find the number of sides in a polygon if the sum of its interior angle is: 1620°
Find the number of sides in a polygon if the sum of its interior angle is: 16 right-angles.
Is it possible to have a polygon, whose sum of interior angle is: 870°
Two angles of a hexagon are 120° and 160°. If the remaining four angles are equal, find each equal angle.
In a pentagon, two angles are 40° and 60°, and the rest are in the ratio 1 : 3 : 7. Find the biggest angle of the pentagon.
