15 degrees
If each exterior angle is 9 degrees then it is a regular 40 sided polygon.
360/9 = 40 degrees
6 degrees if it's a regular polygon
360/100 = 3.6 degrees
Recall that the measurement of interior angle is: 180°(n - 2)/n Given that a regular polygon has 6 sides, let n = 6. Then: 180°(6 - 2) / 6 = 180° * 4 / 6 = 120° Since the total measurement of interior and exterior angles is 180°, 180° - 120° = 60°, which is the measurement of the exterior angle of the regular polygon.
The angle is 72 degrees.
Assuming I understand your question, the exterior angle of a regular pentagon is 72 degrees
If each exterior angle is 9 degrees then it is a regular 40 sided polygon.
360/9 = 40 degrees
Each exterior angle 36 degrees Each interior angle 144 degrees A decagon has 10 sides
360/100 = 3.6 degrees
36 degrees
6 degrees if it's a regular polygon
360/5 = 72 degrees
Recall that the measurement of interior angle is: 180°(n - 2)/n Given that a regular polygon has 6 sides, let n = 6. Then: 180°(6 - 2) / 6 = 180° * 4 / 6 = 120° Since the total measurement of interior and exterior angles is 180°, 180° - 120° = 60°, which is the measurement of the exterior angle of the regular polygon.
Providing it is a regular nonagon: Exterior angle: 40 degrees Interior angle: 140 degrees
The exterior angle of a dodecagon (a polygon with 12 sides) can be calculated using the formula for the exterior angle of a regular polygon, which is ( \frac{360^\circ}{n} ), where ( n ) is the number of sides. For a dodecagon, ( n = 12 ), so the exterior angle is ( \frac{360^\circ}{12} = 30^\circ ). Therefore, each exterior angle of a regular dodecagon measures 30 degrees.