Question: Is It Possible To Have A Regular Polygon Each Of Whose Interior Angle Is 130 Degree?

Is it possible to have a regular polygon whose interior angle is 125 degree?

The number of sides has to be a natural number, so 7.2 is not possible, therefore 130° is not possible for the angles of a regular polygon..

Is it possible to have a regular polygon each of whose exterior angle is 45 degree?

Since your problem specifies a regular polygon (one with equal length sides and angles), we can determine the number of angles (and therefore the number of sides) by dividing 360 degrees by 45 degrees. … Since each exterior angle is 45 degrees, each interior angle is therefore 180 – 45 = 135 degrees.

Can a regular polygon have interior angles of 22?

No it is not possible to have each exterior angle 22 degrees.

What is the minimum interior angle possible for a regular polygon?

60 degreeTriangle is the polygon with minimum number of sides and an equilateral triangle is a regular polygon because all sides are equal in this. We know that each angle of an equilateral triangle measures 60 degree. Hence, 60 degree is the minimum possible value for internal angle of a regular polygon.

What regular polygon has an interior angle of 135?

octagonBecause the octagon is regular, all of its sides and angles are congruent. Thus, the measure of each angle is equal to the sum of its angles divided by 8. Therefore, each angle in the polygon has a measure of 1080/8 = 135 degrees. This means that angle FHG has a measure of 135 degrees.

How many sides does a regular polygon have if each of its interior angles is 120 degree?

6Answer. if each interior angle is 120 then each exterior angle will 60. As we know that sum of exterior angle of polygon =360, side =360/60=6 . the number of sides=6.

How many sides does a polygon have with an interior angle of 135?

eight sidesAnswer. It is a octagon ( eight sides ). so, 1080/ 8 = 135° .

How many sides does a regular polygon have if its interior angle?

The General RuleIf it is a Regular Polygon (all sides are equal, all angles are equal)ShapeSidesEach AngleTriangle360°Quadrilateral490°Pentagon5108°6 more rows

Is it possible for a regular polygon to have interior angles that measure 72 o?

–> 5n = 360 –> n = 72. This is an integer, so a regular polygon with 72 sides would have interior angles measuring 175 degrees.

Is it possible to have a regular polygon each of whose interior angle is 100 degree?

Since n is not an integer, it is not possible to have a regular polygon with each interior angle equal to 100°.

Why is there no regular polygon with an interior angle of 155?

In any polygon, the internal and external angles are supplementary (add up to 180) in any polygon, the sum of all its external angles is 360 degrees, so, in this case, for a regular polygon to have internal angles of 155, its external angles are therefore 180–155 or 25 degrees, and… … Each external angle is .

Is it possible to have a polygon the sum of whose interior angle is 750 degree?

1667 Clearly , The polygon is not possible with sum of interior angles equals 750 ° . No, because 750 is not a multiple of 180.

Is it possible to have a regular polygon with each interior angle equal to 105?

Answer. Hey there! Hence, it is not possible for a polygon to have each interior angle = 105°.

How many sides does a polygon with an interior angle of 160 have?

18 sidesAnswer and Explanation: Hence, it has 18 sides.

Is it possible to have a regular polygon whose each interior angle is 138 degree?

Answer: Step-by-step explanation: It impossible for a interior angle of a regular polygon to equal degrees. … The sum of the exterior angles of any polygon is degrees, so the number of sides would be supposedly equal to or .

Is it possible to have a regular polygon if each interior angle is 110 degree?

It is not possible to have a regular polygon if each interior angle is 110 degree​. Also, the sum of all exterior angles in a regular polygon is 360°.

What is the formula for interior angles?

You can use the same formula, S = (n − 2) × 180° S = ( n – 2 ) × 180 ° , to find out how many sides n a polygon has, if you know the value of S , the sum of interior angles.

Is it possible to have a regular polygon whose Each interior angle measure 124 degree justify?

Since, answer is not a whole number, thus, a regular polygon with measure of each interior angle as 22⁰ is not possible.