Lesson 9 Circling Triangles Develop Understanding

Ready

Factor.

1.

2.

3.

4.

5.

6.

7.

8.

9.

Set

10.

Circle is centered at the origin. Each of the four right triangles inside has a hypotenuse that measures . Write the equation of .

Circle A with right triangles with hypotenuse = 8. xy

11.

Circle is centered at the origin. Each of the four right triangles inside has a hypotenuse that measures . Write the equation of .

Circle B with right triangles with hypotenuse = 3. xy

12.

Point is centered at the origin and is the midpoint of . Write an equation of a circle that passes through points and and has at its center.

Given: .

Coordinate axis with Coordinate C (0,0), right triangles in Quadrant I and III share Point C and WN=40. xy

13.

Write the equation of a circle that passes through the point and is centered at the origin.

14.

Write the equation of a circle that passes through the point and is centered at the origin.

15.

Let point be .

  • Draw a circle centered at the origin that passes through point . Use the Pythagorean theorem to identify three additional points in each of the Quadrants I, II, and III that lie on the circle and do not contain the numbers and . Label the points on the circle.

  • Write the equation of the circle.

a blank 17 by 17 grid

Go

Each arc is shown in blue.

Each indicated angle is the central angle that intercepts the given arc.

16.

Given: and

Find in radians.

Circle C with inscribed angle ACB

17.

Given: and

Find in radians.

Circle M with inscribed angle LMN

18.

Given: and

Find in radians.

Circle F with inscribed angle EFG

19.

Given: and

Find in radians.

Circle R with inscribed angle PRQ

20.

Each radius and arc length includes a unit such as feet or meters. Explain why radian measures do not include a unit.