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प्रश्न
Find a number of side in a regular polygon, if it exterior angle is: 30°.
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उत्तर
Let number of sides = n
`therefore 360^circ/"n" = 30^circ`
n = `360^circ/30^circ`
n = 12
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संबंधित प्रश्न
Fill in the blanks :
In case of regular polygon, with :
| No.of.sides | Each exterior angle | Each interior angle |
| (i) ___8___ | _______ | ______ |
| (ii) ___12____ | _______ | ______ |
| (iii) _________ | _____72°_____ | ______ |
| (iv) _________ | _____45°_____ | ______ |
| (v) _________ | __________ | _____150°_____ |
| (vi) ________ | __________ | ______140°____ |
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(ii) measure of each exterior angle and
(iii) number of sides in the polygon.
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Is it possible to have a regular polygon whose exterior angle is: 36°
A regular polygon has each exterior angle measuring 40°. How many sides does it have?
What is the sum of all exterior angles of any regular polygon?
