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Is it possible to have a regular polygon with an exterior angle of 40?

Is it possible to have a regular polygon with an exterior angle of 40?

A regular polygon with exterior angles of 40o would have 9 side and be a nonagon.

Is it possible to have a regular polygon with measure of each exterior angle as 48 Why?

And As we know, that the sum of all exterior angles of any regular polygon is 360°. THE NUMBER OF SIDES SHOULD BE A NATURAL NUMBER NOT IN FRACTION OR DECIMAL.SO,SUCH A POLYGON IS NOT POSSIBLE.

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Is it possible to have a regular polygon with measure of each exterior angle is 50 degree?

N = 360/50 = 7.2 [Number of sides of polygon] 7.2 is not an integer. So, it is not possible to have a regular polygon whose each exterior angle is 50°.

Is it possible to have a regular polygon with measure of each exterior angle is 20 degree?

Step-by-step explanation: Each exterior angle of a regular polygon = 20 deg. So the polygon has 360/20 = 18 sides.

Is it possible to have a regular polygon with measure of each exterior angle 45?

Sum of exterior angle of any polygon is 360o . As each exterior angle is 45o , number of angles or sides of the polygon is 360o45o=8 .

Can a regular polygon have a measure of each exterior angle as 45 yes or no?

Answer: No it is not possible to have a regular polygon each of whose interior angle is 45°.

Is it possible to have a regular polygon with measure of each interior angle as 22 explain?

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Since 22 is not a proper multiple of 360, the polygon wont be possible.

Is it possible to measure a regular polygon?

Let the number of sides be = n. Thus, we cannot have a regular polygon with an exterior angle of 22° as the number of sides is not a whole number.

Is it possible to have a regular polygon each of?

No its not possible to have a regular polygon each of whose exterior angle is 50 because sum of all sides is 360.

Is it possible to have a regular polygon with measures of each exterior angle as 580 Why can it be an interior angle of a regular polygon?

Since a regular polygon cannot a fraction a side, it is not possible to have a regular polygon with exterior angle = 58 deg.

Is it possible to have a regular polygon with measure of each exterior angle as 22?

Question 6 (a) Is it possible to have a regular polygon with measure of each exterior angle as 22°? Since 22 is not a proper multiple of 360, the polygon wont be possible.

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Which of the following can never be a measure of exterior angle of a regular polygon?

So 22 degrees can never be the measure of exterior the angle of a regular polygon.