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An interior angle of a regular polygon had a measire of 180 what type of polygon is it

User Dusan
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1 Answer

6 votes

Answer:

Regular polygon with interior angle as
180^(\circ) is not possible.

Solution:

Need to find the type of regular polygon whose internal angle is
180^(\circ)

Consider AB be the first side of the regular polygon and BC be the second side. Since required interior angle =
180^(\circ), so ∠ABC =
180^(\circ) that means ABC is a straight line.

Now let say CD be the third side of regular polygon of interior angle
180^(\circ). So ∠BCD =
180^(\circ), which means point ABCD are on same line .So we can say whenever we try to make a regular polygon of interior angle
180^(\circ). we get straight line only.

So closed curve is never possible with interior angle
180^(\circ)

Hence regular polygon with interior angle as
180^(\circ) is not possible.

User Matthew Story
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