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Which polygon has the largest interior angle?
The polygon with the largest interior angle is a regular polygon, specifically a regular polygon with the greatest number of sides. In a regular polygon, all interior angles are equal, and the formula for calculating the interior angle of a regular polygon is (n-2) * 180 / n, where n is the number of sides. As the number of sides increases, the interior angle also increases. Therefore, a regular polygon with a very large number of sides will have the largest interior angle.
What is the largest polygon called and how many sides dose it have?
There is no such thing as a largest polygon, just as there is no largest number. You can always add one more to a number - or add one more side to get a bigger polygon.
What is the largest number of sides a regular polygon can have?
Effectively, the answer is that a regular polygon could have an infinite number of sides. However, when the number of sides reaches a thousand or so there is very little difference to the naked eye between such a polygon and a circle. For information : Some of the early calculations for pi were based on the very small difference between a polygon with a very large number of sides and a circle.
Express the relationship between the number of sides of a polygon to the number of diagonal of a polygon?
n*(n-3)/2 where n- no. of sides
What is all number sides of a polygon?
Not sure what the question means but if I have got it right, the answer is that a polygon can have any number of sides from 3 upwards.
