You need to construct a regular polygon. When you draw two sides, the interior angle created between them is 120^circ . What will be the sum, in degrees, of the measures of the interior angles of this polygon when it is completed?

Ty Gaines

Ty Gaines

Answered question

2022-11-04

You need to construct a regular polygon. When you draw two sides, the interior angle created between them is 120 . What will be the sum, in degrees, of the measures of the interior angles of this polygon when it is completed?

Answer & Explanation

Gilbert Petty

Gilbert Petty

Beginner2022-11-05Added 23 answers

Step 1
Since the shape in question is a regular polygon, we know that all of the interior angles must be the same: 120 . We must now consult the following formula:
interior angle + exterior angle = 180 exterior angle = 180 - interior angle
Thus, the size of one of this shape's exterior angles will be:
exterior angle = 180 - 120 = 60
The sum of the exterior angles of a regular polygon always total to 360 . This can be expressed mathematically, and then adapted:
size of exterior angle + number of exterior angles = 360 number of exterior angles = 360 size of exterior angle
We can now calculate the number of exterior angles the shape has and, since an exterior angle is formed by the extension of one side of the shape, this will also equate to the number of sides the shape has:
number of exterior angles = number of sides = 360 60 = 6
Our calculation would suggest that our shape is a regular hexagon, which does indeed have interior angles of 120
We can now find the total of all of our interior angles: we can use this equation to do so:
sum of interior angles = 180 ( n - 2 )
Where n = the number of sides the shape has. Therefore:
sum of interior angles = 180 ( 6 - 2 ) = 180 × 4 = 720
To verify, dividing our answer by 6 should result in the size of one of the shape's interior angles, as dictated by the question:
720 6 = 120 TRUE
Observe that both of our equations to find the total of the shape's interior angles require us to know the number of sides the shape has. This was a piece of information with which we were not provided: this is why we had to work this out using exterior angles.

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