3.2 Modeling data and scenarios with sinusoidal functions

Cards (73)

Sinusoidal functions are trigonometric functions that oscillate in a repeating pattern
The amplitude of a sinusoidal function represents the vertical distance from the midline to the maximum or minimum value
The vertical shift of a sinusoidal function is represented by the variable $D$  
True
A positive phase shift translates the graph to the left
False
Match the characteristic with its transformation:
Amplitude ↔️ Vertical stretch or compression
Period ↔️ Horizontal stretch or compression
Phase Shift ↔️ Horizontal translation
Vertical Shift ↔️ Vertical translation
How is the period of a sinusoidal function affected by the coefficient $B$ ? 
Horizontal stretch or compression
What type of transformation does the period of a sinusoidal function represent?
Horizontal stretch or compression
The period of ocean tides is approximately 12.4 hours
The period of a sinusoidal function is calculated using the coefficient $B$ in the equation 
True
What is a phase shift in a sinusoidal function?
Horizontal translation
The period of a sinusoidal function is the length of one complete cycle
The period of solar power generation is 24 hours. 
True
What does the vertical shift parameter (D) in a sinusoidal function represent?
Vertical translation
Sinusoidal functions can model ocean tides and solar power generation due to their periodic behavior.
True
The amplitude of ocean tides represents the vertical distance from the average sea level to the high or low tide
What does the amplitude $|A|$ represent in a sinusoidal function? 
Vertical distance from midline
What does the vertical shift $D$ represent in a sinusoidal function? 
Upward or downward translation
Match the characteristic with its definition in the general form of a sinusoidal function:
Amplitude ↔️ The vertical distance from the midline to the maximum or minimum value
Period ↔️ The length of one complete cycle of the function
Phase Shift ↔️ The horizontal shift of the graph
Vertical Shift ↔️ The upward or downward translation of the graph
The amplitude of a sinusoidal function represents the vertical distance from the midline to the maximum or minimum value
Match the transformation with its effect on the standard sine or cosine function:
Phase Shift ↔️ Horizontal translation
Vertical Shift ↔️ Vertical translation
Period ↔️ Horizontal stretch or compression
Match the characteristic with its real-world application:
Amplitude ↔️ Variation in solar panel power efficiency
Period ↔️ Approximately 12.4 hours for semidiurnal tide
Phase Shift ↔️ Depends on sunrise and sunset times
Vertical Shift ↔️ Average power output
How is the period of a sinusoidal function calculated?
$\frac{2\pi}{|B|}$
What does the phase shift of a sinusoidal function represent?
The horizontal shift
The amplitude of a sinusoidal function is denoted by the symbol |A|
The period of a sinusoidal equation is calculated as \frac{2\pi}{|B|}</latex> using the parameter B
The first step in using a sinusoidal equation for problem-solving is to identify the parameters
What does the period of a sinusoidal function represent?
Length of one complete cycle
How does the amplitude affect the graph of a sinusoidal function?
Vertical stretch or compression
A vertical shift of $D$ moves the graph up or down
Sinusoidal functions can model phenomena like tides and sound waves 
True
The phase shift $C$ in a sinusoidal equation represents a horizontal translation of the graph 
True
The key characteristics of sinusoidal functions include amplitude, period, phase shift, and vertical shift 
True
The phase shift of a sinusoidal function corresponds to a horizontal translation of the graph 
True
The vertical shift in a sinusoidal model of solar power generation represents the average power output
True
Which component of a sinusoidal equation represents the vertical translation of the graph?
D</latex>
A vertical shift of a sinusoidal function results in a horizontal translation.
False
Match the characteristic with its definition:
Amplitude ↔️ Vertical distance from midline
Period ↔️ Length of one complete cycle
Phase Shift ↔️ Horizontal shift
Vertical Shift ↔️ Vertical translation
What are the two general forms of sinusoidal functions?
$y =$ $A \sin(B(x - C)) +$ $D$ and $y =$ $A \cos(B(x - C)) +$ $D$
Sinusoidal functions can model ocean tides and solar power generation by adjusting their parameters.
True
Match the characteristic with its example in ocean tides and solar power generation:
Amplitude ↔️ Vertical distance from average sea level to high/low tide
Period ↔️ Approximately 12.4 hours (semidiurnal tide)
Phase Shift ↔️ Depends on location and tidal patterns
Vertical Shift ↔️ Average sea level