Exercises: Graphs of sin, cos, tan (amplitude, period, phase shift) - ACT Math

A

Recall / Warm-Up

1.

What is the value of $\sin\!\left(\frac{\pi}{2}\right)$ ?

A.

0

B.

1

C.

-1

D.

$\frac{1}{2}$

2.

What is the value of $\cos(\pi)$ ?

A.

1

B.

0

C.

-1

D.

$\frac{\sqrt{2}}{2}$

3.

How many radians are in a full rotation around the unit circle?

A.

$\pi$

B.

$2\pi$

C.

360

D.

$\frac{\pi}{2}$

B

Fluency Practice

C

Varied Practice

D

Word Problems / Application

E

Error Analysis

1.

Taylor solved this problem:

"Find the period and amplitude of $y = \sin(3x)$ ."

Taylor's work:

Amplitude $= 3$
Period $= 2\pi$

What error did Taylor make?

A.

Taylor identified the amplitude incorrectly. The amplitude is 1 and the period is unchanged.

B.

Taylor confused amplitude and period. The amplitude is 1 and the period is $\frac{2\pi}{3}$ .

C.

Taylor's amplitude is correct but the period should be $6\pi$ .

D.

Taylor's work is correct.

2.

Jordan solved this problem:

"Find the phase shift of $y = \sin(2x + \pi)$ ."

Jordan's work:

The phase shift is $-\pi$ (opposite sign of $C$ ).
The graph shifts $\pi$ units to the left.

What error did Jordan make, and what is the correct phase shift?

A.

Jordan forgot to divide by $B$ . The phase shift is $-\frac{\pi}{2}$ (left by $\frac{\pi}{2}$ ).

B.

Jordan used the wrong sign. The phase shift is $\pi$ to the right.

C.

Jordan's answer is correct.

D.

Jordan should have multiplied by $B$ . The phase shift is $-2\pi$ .

F

Challenge / Extension

1.

Which of the following is equivalent to $y = -\cos(x)$ ?

A.

$y = \cos(x + \pi)$

B.

$y = \cos\!\left(x + \frac{\pi}{2}\right)$

C.

$y = \sin(x)$

D.

$y = \cos(x) - 1$

2.