Math, asked by Anonymous, 4 months ago

$\huge{\underline{\mathtt{\red{q}\pink{u}\green{e}\blue{s}\purple{t}\orange{i}\blue{o}\purple{n}}}}$

find the number of sides of a regular polygon whose each exterior angle has a measure of 45°

Answers

Answered by MrsConqueror

4

$\huge{\underline{\mathtt{\red{q}\pink{u}\green{e}\blue{s}\purple{t}\orange{i}\blue{o}\purple{n}}}}$

find the number of sides of a regular polygon whose each exterior angle has a measure of 45°

$\huge{\underline{\mathtt{\red{A}\pink{N}\green{S}\blue{W}\purple{E}\orange{R}}}}$

total measure of all exterior angles=360°

measure of each exterior angle=45°

therefore,the number of exterior angles = 360/45=8

the polygon has 8 sides.

Answered by ghanshyamkoche786

0

Answer:

The sum of the exterior angles of a regular polygon is 360∘ , irrespective of the number of sides.

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