How to find the measure of missing angles

How Do You Find Missing Angles in a Transversal Diagram?

Note:

Got a diagram of a transversal intersecting parallel lines? Trying to figure out all the angle measurements? Take a look at this tutorial, and you'll see how find all the missing angle measurements by identifying vertical, corresponding, adjacent, and alternate exterior angles!

Keywords:

• problem
• parallel
• parallel lines
• transversal
• angle
• angles
• find angles
• find missing angles
• acute angles
• obtuse angles
• supplementary
• supplementary angles
• congruent
• congruent angles
• vertical
• vertical angles
• corresponding
• corresponding angles
• interior angles
• exterior angles
• alternate exterior
• alternate interior
• alternate interior angles
• alternate exterior angles
• alternate
• add to 180
• 180 degrees

Background Tutorials

• Measuring Segments

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    What Does Congruent Mean?

    If two figures have the same size and shape, then they are congruent. The term congruent is often used to describe figures like this. In this tutorial, take a look at the term congruent!

• Measuring Angles

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    What is an Angle?

    Angles are a fundamental building block for creating all sorts of shapes! In this tutorial, learn about how an angle is formed, how to name an angle, and how an angle is measured. Take a look!

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    What are Acute, Obtuse, Right, and Straight Angles?

    Did you know that there are different kinds of angles? Knowing how to identify these angles is an important part of solving many problems involving angles. Check out this tutorial and learn about the different kinds of angles!

Further Exploration

• Finding Missing Angles

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    How Do You Use Complementary Angles to Find a Missing Angle?

    If two angles are complementary, that means that they add up to 90 degrees. This is very useful knowledge if you have a figure with complementary angles and you know the measurement of one of those angles. In this tutorial, see how to use what you know about complementary angles to find a missing angle measurement!

Angles In A Triangle

A triangle is the simplest possible polygon. It is a two-dimensional (flat) shape with three straight sides forming an interior, closed space. It has three interior angles. One of the earliest concepts to learn in geometry is that triangles have interior angles adding up to 180°. But how do you know? How can you prove this is true? Let's find out!

1. Angles In A Triangle
2. How To Find The Angle of a Triangle
• How To Find The Missing Angle
3. Triangle Angle Formula
4. Angles In A Triangle Sum To 180° Proof

How To Find The Angle of a Triangle

You may have a triangle where only two angles have been labelled and measured. Now that you are certain all triangles have interior angles adding to 180°, you can quickly calculate the missing measurement. You can do this one of two ways:

1. Subtract the two known angles from 180°.
2. Plug the two angles into the formula and use algebra: a + b  + c = 180°

How To Find The Missing Angle of a Triangle

Two known angles of a triangle are 37° and 24°. What is the missing angle?

We can use two different methods to find our missing angle:

1. Subtract the two known angles from 180°:

180° - 37° = 143°

143° - 24° = 119°

c  = 119°

2. Plug the two angles into the formula and use algebra: a + b + c = 180°

37° + 24 ° + c = 180°

61° + c = 180°

c = 119°

Triangle Angle Formula

Let's draw a triangle and label its interior angles with three letters a, b, and c. Our sample will have side ac horizontal at the bottom and ∠b at the top.

Now that we've labeled our angles, we have a formula we can refer to for the angles. It is a + b + c = 180°, which tells us that if we add up all of our angles, they will always equal 180.

Now, let's draw a line parallel to side ac that passes through Point b (which is also where you find ∠b).

That new parallel line created two new angles on either side of ∠b. We will label these two angles ∠z and ∠w from left to right. Side ab of our triangle can now be viewed as a transversal, a line cutting across the two parallel lines.

Alternate Interior Angles Theorem

By the Alternate Interior Angles Theorem, we know that ∠a is congruent (equal) to ∠z, and ∠c is congruent to ∠w.

Did we lose you? Do not despair! The Alternate Interior Angles Theorem tells us that a transversal cutting across two parallel lines creates congruent alternate interior angles. Alternate interior angles lie between the parallel lines, on opposite sides of the transversal. In our example, ∠a and ∠z are alternate interior angles, and so are ∠c and ∠w.

We now have the three angles of our triangle carefully redrawn and sharing Point b as a common vertex. We have ∠z as a stand-in for ∠a, then ∠b, and finally ∠w as a stand-in for ∠c. And look, they form a straight line!

A straight line measures 180°. This is the same type of proof as the parallel lines proof. The three angles of any triangle always add up to 180°, or a straight line.

Triangle Angle Sum Theorem

Our formula for this is a + b + c =  180° where a, b, and c are the interior angles of any triangle.

Angles In A Triangle Sum To 180° Proof

You need four things to do this amazing mathematics trick. You need a straightedge, scissors, paper, and pencil. Draw a neat, large triangle on a piece of paper. Any triangle -- scalene, isosceles, equilateral, acute, obtuse -- whatever you like.

Label the inside corners (the vertices that form interior angles) with three letters, like R-A-T. Cut the triangle out, leaving a little border around it so you can still see all three edges

Now tear off the three corners of your triangle. Do not use the scissors, because you want jagged edges, which help you avoid confusing them with the straight sides you drew. You will have three smaller triangular bits, each with an interior angle labelled R, A or T. Each little piece has two neat sides and a rough edge.

You will also have a rough hexagon that is the leftover part of the original, larger triangle.

Take your three little labelled corners and arrange them together so the rough-cut edges are all away from you. The only way to do that is to make them line up, to form a straight line. The three interior angles, RAT, have added up to make a straight angle, also called a straight line.

There; you did it!

Lesson Summary

If you carefully studied this lesson, you now are able to identify and label the three interior angles of any triangle, and you can recall that the interior angles of all triangles add to 180°. You can also demonstrate a proof of the sum of interior angles of triangles and apply a formula, a + b + c = 180° , where a, b, and c are the interior angles of the triangle. Further, you can calculate the missing measurement of any interior angle of any triangle using two different methods.

Next Lesson:

Sum of Interior & Exterior Angles