Lesson 3 More “Sine” Language Solidify Understanding

Ready

1.

The circle has been divided into equal portions. Explain the meaning of each number in the equation $\frac{30 °}{360 °} = \frac{1}{12}$ .

In Geometry, we learned how to find the arc length of a portion of a circle when we are given the measure of the intercepted arc in degrees and the radius of the circle. We can find the fraction of the circle using $\frac{n °}{360 °}$ , where $n °$ is the measure of the intercepted arc. Then multiply the fraction of the circle times the circumference $\frac{n °}{360 °} \cdot C$ or $\frac{n °}{360 °} \cdot 2 π r$ .

Use the information in each drawing to find the length of the intercepted arc on the circle.

2.

3.

4.

5.

Set

A right triangle has been drawn from a point on a circle centered at $(0, 0)$ . The angle of rotation, $θ$ , has been drawn between the initial ray and the terminal ray.

Write the value of sine $θ$ as defined in today’s lesson. (You will need to find the radius.)
Use right angle trig to solve for angle $w$ inside the triangle.
Use the measure of $∠ w$ to find $m ∠ θ$ (the angle of rotation).

6.

a.

$\sin θ =$

b.

$w =$

c.

$θ =$

7.

a.

$\sin θ =$

b.

$w =$

c.

$θ =$

8.

a.

$\sin θ =$

b.

$w =$

c.

$θ =$

9.

a.

$\sin θ =$

b.

$w =$

c.

$θ =$

10.

Describe the angles of rotation that make the $y$ -values of the points be positive and the angles of rotation that make the $y$ -values be negative.

11.

What do you notice about the $y$ -values and the value of sine in the previous graphs?

12.

In the graph shown, the radius of the circle is $1$ unit. The intersections of the circle and the axes are labeled. Based on your observation in #11, what do you think the value of sine might be for the following values of $θ$ ?

a.

$90 °$ :

b.

$180 °$ :

c.

$270 °$ :

d.

$360 °$ :

Go

Make a sketch of the following problems, then solve.

13.

A kite is aloft at the end of a $1,500 foot$ string. The string makes an angle of $43 °$ with the ground.

a.

Sketch.

b.

How far above the ground is the kite? (Round your answer to the nearest whole number.)

14.

A ladder leans against a building. The top of the ladder reaches a point on the building that is $12 feet$ above the ground. The foot of the ladder is $4 feet$ from the building.

a.

Sketch.

b.

Find to the nearest degree the measure of the angle that the ladder makes with the level ground.

15.

The shadow of a flagpole is $40.6 meters$ long when the angle of elevation of the sun is $34.6 °$ .

a.

Sketch.

b.

Find the height of the flagpole.

16.

The angle of depression from the top of a building to a car parked in the parking lot is $32.5 °$ . The building is $252 meters$ high.

a.

Sketch.

b.

How far from the top of the building is the car on the ground?