We will prove that there is no regular polygon whose one of its interior angles is 100°. We will do this by using the formula for getting the sides of a polygon. That is,
*nisthenumberofsides
There is NO such regular polygon whose number of sides is 4.5. Thus, Maria's claims are impossible.
We will prove that there is no regular polygon whose one of its exterior angles is 75°. We will do this by using the formula for getting the sides of a polygon. That is,
*nisthenumberofsides
There is NO such regular polygon whose number of sides is 4.8. Thus, Maria's claims are impossible.
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Why Maria's claims are impossible:
We will prove that there is no regular polygon whose one of its interior angles is 100°. We will do this by using the formula for getting the sides of a polygon. That is,
*n is the number of sides
There is NO such regular polygon whose number of sides is 4.5. Thus, Maria's claims are impossible.
We will prove that there is no regular polygon whose one of its exterior angles is 75°. We will do this by using the formula for getting the sides of a polygon. That is,
*n is the number of sides
There is NO such regular polygon whose number of sides is 4.8. Thus, Maria's claims are impossible.
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