Unit 7, Lesson 4
Quadrilaterals in Circles
Geometry
4.1
Warm-up
Instructional Routines
NoneMaterials
To Gather
Geometry toolkits (HS)Activity Narrative
Students experiment with finding circles that circumscribe a quadrilateral. They observe that this appears to be possible for only some quadrilaterals. They’ll analyze the properties of quadrilaterals with circumscribed circles, or cyclic quadrilaterals, in the activities in this lesson.
Monitor for students who successfully circumscribe Quadrilateral B.
Launch
NoneActivity
NoneFor each quadrilateral, use a compass to see if you can draw a circle that passes through all 4 of the quadrilateral’s vertices.
A
B
C
Student Response
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Building on Student Thinking
Students may draw a curved shape that is not a circle to circumscribe Quadrilateral C. Ask these students if their shape could be created by a compass.
Activity Synthesis
The goal is for students to share their ideas with the group before new vocabulary is made explicit.
Invite students to share their results. Ask which shape was the easiest to draw a circle around (most likely Quadrilateral A, the square). Display a successful result for Quadrilateral B, and be sure students come to the conclusion that such a circle can’t be drawn for Quadrilateral C.
Tell students that a circle is said to be circumscribed about a polygon if all the vertices of the polygon lie on the circle. If it is possible to draw a circumscribed circle for a quadrilateral, the quadrilateral is called a cyclic quadrilateral.
Lesson Synthesis
The goal is to continue to think about the center of the circumscribed circle of a cyclic quadrilateral as being equidistant from the vertices of the figure. Display this image for all to see.
Tell students that each vertex of the quadrilateral represents a town. A construction company says it is planning to build a shopping mall the same distance from each town. Clare claims this is impossible. How does she know? Give students 1 minute of quiet work time and then 1 minute to share their work with a partner. Follow with a whole-class discussion.
Sample response: If there were a point that was the same distance from all four town centers, then it would be possible to draw a circle centered at this point that passed through all 4 vertices. That is, the towns would form a cyclic quadrilateral. In that case, the opposite angles of the quadrilateral must be supplementary. However, the opposite angles of our quadrilateral are not supplementary, so it can’t be cyclic.
Student Lesson Summary
A circle is said to be circumscribed about a polygon if all the vertices of the polygon lie on the circle. If it is possible to draw a circumscribed circle for a quadrilateral, the figure is called a cyclic quadrilateral. Not all quadrilaterals have this property.
We can prove that the opposite angles of a cyclic quadrilateral are supplementary. Consider opposite angles and , labeled and .
Angle is inscribed in the arc from to through . Angle is inscribed in the arc from to through . Together, the two arcs trace out the entire circumference of the circle, so their measures add to 360 degrees. By the Inscribed Angle Theorem, the sum of and must be half of 360 degrees, or 180 degrees. So angles and are supplementary. The same argument can be applied to the other pair of opposite angles.