Math, asked by raj2338, 11 months ago

find the number of sides of a regular polygon whose measure of each exterior angle is 45 degree

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Answered by bhavikachopra50

Total measure of ext. angles=360

Measure of each=45

NO. of sides=360/45=8

Therefore,the answer is 8

Please mark as brainliest answer

Answered by Anonymous

GIVEN:

each exterior angle = 45°

FIND:

No. of sides of a regular polygon.

SOLUTION:

as we know, that

☞ In a regular polygon sum of all interior angle is 360°.

$\bold{ ✪ so, no. \: of \: side \: of \: polygon = \frac{360 \degree}{exterior \: angle} } \\ \bold{\implies \frac{ \cancel{360 \degree}}{ \cancel{45 \degree} }} = 8\\ \bold{ \longrightarrow no. \: of \: sides = 8}$

$\bold{ Hence, no. \: sides \: of \: a \: regular \: plygon} \\ \bold{whose \: exterior \: angle \: measures \: as \: 45 \degree} \bold{ is \: \boxed{ \bold8.}}$

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find the number of sides of a regular polygon whose measure of each exterior angle is 45 degree