Loading...

Let's see how we can use the property of the angles of an inscribed quadrilateral to solve problems.

We just proved that when you inscribe a quadrilateral inside a circle, the opposite angles are supplementary.

Inscribed Quadrilateral Theorem

A quadrilateral is inscribed in a circle if and only if the opposite angles are supplementary.

Let's use this theorem to solve problems involving inscribed quadrilaterals. Work through the following tabs to practice.

Example 1

Example 2

Example 3

What two equations can you write to show that opposite angles of inscribed quadrilaterals are supplementary?

Inscribed quadrilaterals are supplementary

m∠A + m∠C = 180°
m∠B + m∠D = 180°

Quadrilateral ABCD is inscribed in a circle. Find the measures of angles A and B.

Opposite angles of inscribed quadrilaterals are supplementary

Start with angle A. Let's call this unknown angle y. Since angles A and C are supplementary, you can write and solve the following equation:

y° + 80° = 180°
y° = 100°

Now, follow the same steps for angle B. Let's call this unknown angle x. Since angles B and D are supplementary, you can write and solve the following equation:

x° + 70° = 180°
x° = 110°

Quadrilateral ABCD is inscribed inside a circle. If angle A measures (3x + 6)° and angle C measures (2x + 4)°, find x.

Opposite angles of inscribed quadrilaterals are supplementary

Since these angles are opposite each other, they are also supplementary. You can write and solve the following equation:

m∠A + m∠C = 180°
(3x + 6) + (2x + 4) = 180
5x + 10 = 180
5x = 170
x = 34