How to Calculate Angles

In geometry, an angle is the space between 2 rays (or line segments) with the same endpoint (or vertex). The most common way to measure angles is in degrees, with a full circle measuring 360 degrees. You can calculate the measure of an angle in a polygon if you know the shape of the polygon and the measure of its other angles or, in the case of a right triangle, if you know the measures of two of its sides. Additionally, you can measure angles using a protractor or calculate an angle without a protractor using a graphing calculator.

[Edit]Steps

[Edit]Calculating Interior Angles in a Polygon

1. Count the number of sides in the polygon. In order to calculate the interior angles of a polygon, you need to first determine how many sides the polygon has. Note that a polygon has the same number of sides as it has angles.^[1]
   
   • For instance, a triangle has 3 sides and 3 interior angles while a square has 4 sides and 4 interior angles.
2. Find the total measure of all of the interior angles in the polygon. The formula for finding the total measure of all interior angles in a polygon is: (n – 2) x 180. In this case, n is the number of sides the polygon has. Some common polygon total angle measures are as follows:^[2]
   
   • The angles in a triangle (a 3-sided polygon) total 180 degrees.
   • The angles in a quadrilateral (a 4-sided polygon) total 360 degrees.
   • The angles in a pentagon (a 5-sided polygon) total 540 degrees.
   • The angles in a hexagon (a 6-sided polygon) total 720 degrees.
   • The angles in an octagon (an 8-sided polygon) total 1080 degrees.
3. Divide the total measure of all of a regular polygon's angles by the number of its angles. A regular polygon is a polygon whose sides are all the same length and whose angles all have the same measure. For instance, the measure of each angle in an equilateral triangle is 180 ÷ 3, or 60 degrees, and the measure of each angle in a square is 360 ÷ 4, or 90 degrees.^[3]
   
   • Equilateral triangles and squares are examples of regular polygons, while the Pentagon in Washington, D.C. is an example of a regular pentagon and a stop sign is an example of a regular octagon.
4. Subtract the sum of the known angles from the total measure of the angles for an irregular polygon. If your polygon doesn't have sides of the same length and angles of the same measure, all you need to do is add up all of the known angles in the polygon. Then, subtract that number from the total measure of all of the angles to find the missing angle.^[4]
   
   • For example, if you know that 4 of the angles in a pentagon measure 80, 100, 120, and 140 degrees, add the numbers together to get a sum of 440. Then, subtract this sum from the total angle measure for a pentagon, which is 540 degrees: 540 – 440 = 100 degrees. So, the missing angle is 100 degrees.

[Edit]Finding Angles in a Right Triangle

1. Remember that every right triangle has one angle equal to 90 degrees. By definition, a right triangle will always have one angle that's 90 degrees, even if it's not labeled as such. So, you will always know at least one angle and can use trigonometry to find out the other 2 angles.^[5]
   
2. Measure the length of 2 of the triangle's sides. The longest side of a triangle is called the “hypotenuse.” The “adjacent” side is adjacent (or next to) to the angle you're trying to determine.^[6] The “opposite” side is opposite to the angle you're trying to determine. Measure 2 of the sides so you can determine the measure of the remaining angles in the triangle.^[7]
   
3. Use the sine function if you know the length of the opposite side and the hypotenuse. Plug your values into the equation: sine (x) = opposite ÷ hypotenuse. Say that the length of the opposite side is 5 and the length of the hypotenuse is 10. Divide 5 by 10, which is equal to 0.5. Now you know that sine (x) = 0.5 which is the same as x = sine^-1 (0.5).^[8]
   
   • If you have a graphing calculator, simply type 0.5 and press sine^-1. If you don't have a graphing calculator, use an online chart to find the value. Both will show that x = 30 degrees.
4. Use the cosine function if you know the length of the adjacent side and the hypotenuse. For this type of problem, use the equation: cosine (x) = adjacent ÷ hypotenuse. If the length of the adjacent side is 1.666 and the length of the hypotenuse is 2.0, divide 1.666 by 2, which is equal to 0.833. So, cosine (x) = 0.833 or x = cosine^-1 (0.833).^[9]
   
   • Plug 0.833 into your graphing calculator and press cosine^-1. Alternatively, look up the value in a cosine chart. The answer is 33.6 degrees.
5. Use the tangent function if you know the length of the opposite side and the adjacent side. The equation for tangent functions is tangent (x) = opposite ÷ adjacent. Say you know the length of the opposite side is 75 and the length of the adjacent side is 100. Divide 75 by 100, which is 0.75. This means that tangent (x) = 0.75, which is the same as x = tangent^-1 (0.75).^[10]
   
   • Find the value in a tangent chart or press 0.75 on your graphing calculator, then tangent^-1. This is equal to 36.9 degrees.

[Edit]Video

[Edit]Tips

• Angles are given names according to how many degrees they measure. As noted above, a right angle measures 90 degrees. An angle measuring more than 0 but less than 90 degrees is an acute angle. An angle measuring more than 90 but less than 180 degrees is an obtuse angle. An angle measuring 180 degrees is a straight angle, while an angle measuring more than 180 degrees is a reflex angle.
• Two angles whose measures add up to 90 degrees are called complementary angles. (The two angles other than the right angle in a right triangle are complementary angles.) Two angles whose measures add up to 180 degrees are called supplementary angles.

[Edit]References

[Edit]Quick Summary

1. ↑ https://www.mathsisfun.com/geometry/interior-angles-polygons.html
2. ↑ https://www.mathsisfun.com/geometry/interior-angles-polygons.html
3. ↑ https://www.bbc.co.uk/bitesize/guides/zshb97h/revision/6
4. ↑ https://www.mathopenref.com/polygoninteriorangles.html
5. ↑ https://www.mathsisfun.com/algebra/trig-finding-angle-right-triangle.html
6. ↑ https://www.mathsisfun.com/algebra/trig-finding-angle-right-triangle.html
7. ↑ [v161672_b01]. 19 January 2021.
8. ↑ https://sciencing.com/angle-right-triangle-8159743.html
9. ↑ https://sciencing.com/angle-right-triangle-8159743.html
10. ↑ https://sciencing.com/angle-right-triangle-8159743.html

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