Exterior angle of a regular polygon measures $10alpha$ degrees.Then, prove that $alpha in ZZ$ and there are precisely 7 such alpha#?

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Answer 1 · 2018-07-18T01:36:00

We know, the magnitude of each external angle of a regular polygon of $n$ sides is related as follows.

Each external angle ( $theta$ ) $=360^@/n$ ,where n must be an positive integer $>=3$ .

Now it is given $theta=10alpha$ degree

So $10alpha=360^@/n$

$=>alpha=36/n$

This shows that possible positive integral values of $alpha$ are 12,9,6,4,3,2,1.

Hence $alpha inZZ$ takes precisely 7 values.

Exterior angle of a regular polygon measures 10alpha10alpha degrees.Then, prove that alpha in ZZalpha in ZZ and there are precisely 7 such alpha#?