Question

Find the degree and radian measure of exterior and interior angle of a regular Heptagon.

Answer 1

Septagon: 

We know that the sum of the measures of the exterior angles of a polygon is 360°. The measures of the interior angles of a regular polygon are equal. Hence, the measures of the exterior angles of a regular polygon are also equal.
Number of sides = 7
Number of exterior angles = 7

∴ Measure of an exterior angle of a regular heptagon = `(360°)/"no. of sides"`

= `(360°)/7`

= (51.43)°

= `(360/7 × π/180)^"c"`

= `((2π)/7)^"c"`

The sum of the measures of an interior angle and an exterior angle of a regular polygon = 180°.

∴ Measure of an interior angle of regular heptagon = `180° - (360/7)^circ`

= `((1260 - 360)/7)^circ`

= `(900/7)^circ`

= (128.57)°

= `(900/7 × π/180)^"c"`

= `((5π)/7)^"c"`

Hence, the exterior and interior angle of a regular heptagon are (51.43)° or `((2π)/7)^"c" "and"  (128.57)° or ((5π)/7)^"c"`.