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Which function is this the graph of?
The graph is of the tangent function.
It is a periodic graph with the following features:
x-intercepts at -180º, 0º, 180º, 360º (and every 180º in either direction),
a y-intercept at (0, 0),
asymptotes at -90º, 90º, 270º (and every 180º in either direction),
and a range of .
Which function is this the graph of?
The graph is of the cosine function.
It is a periodic graph with the following features:
x-intercepts at -90º, 90º, 270º (and every 180º in either direction),
a y-intercept at (0, 1),
and a range of -1 ≤ y ≤ 1.
Which function is this the graph of?
The graph is of the sine function.
It is a periodic graph with the following features:
x-intercepts at -180º, 0º, 180º, 360º (and every 180º in either direction),
a y-intercept at (0, 0),
and a range of -1 ≤ y ≤ 1.
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Which function is this the graph of?
The graph is of the tangent function.
It is a periodic graph with the following features:
x-intercepts at -180º, 0º, 180º, 360º (and every 180º in either direction),
a y-intercept at (0, 0),
asymptotes at -90º, 90º, 270º (and every 180º in either direction),
and a range of .
Which function is this the graph of?
The graph is of the cosine function.
It is a periodic graph with the following features:
x-intercepts at -90º, 90º, 270º (and every 180º in either direction),
a y-intercept at (0, 1),
and a range of -1 ≤ y ≤ 1.
Which function is this the graph of?
The graph is of the sine function.
It is a periodic graph with the following features:
x-intercepts at -180º, 0º, 180º, 360º (and every 180º in either direction),
a y-intercept at (0, 0),
and a range of -1 ≤ y ≤ 1.
True or False?
The graph of sin x passes through the origin.
True.
The graph of sin x passes through the origin.
What is the period of tan x?
The period of tan x is 180º (or radians).
What is the period of sin x and cos x?
The period of both sin x and cos x is 360º (or 2 radians).
Define the range of sin x and cos x.
The range of both sin x and cos x is -1 ≤ y ≤ 1.
Define the range of tan x.
The range of tan x is . I.e., tan x can take any real number value (positive, negative or zero).
What are the equations of the asymptotes in the graph of tan x, .
The equations of the asymptotes in the graph of tan x, are
, and .
What is the relationship between sin(-x) and sin(x)?
The relationship between sin(-x) and sin(x) is sin(-x) = -sin(x).
What is the relationship between cos(-x) and cos(x)?
The relationship between cos(-x) and cos(x) is cos(-x) = cos(x).
True or False?
tan(x) = tan(x ± 180°)
True.
tan(x) = tan(x ± 180°) or tan(x ± )
What is the relationship between sin(x) and sin( - x)?
The relationship between sin(x) and sin( - x), is sin(x) = sin( - x), (or sin(x) = sin(180° - x) ).
What does represent?
represents a vertical translation of by units in the positive y-direction.
How is a horizontal translation to the left by units represented for ?
For , a horizontal translation to the left by units is represented by .
What transformation does represent?
represents a transformation of by a vertical stretch with scale factor .
How is a horizontal stretch with scale factor represented for ?
For , a horizontal stretch with scale factor is represented by .
What transformation does represent?
represents a reflection of about the x-axis.
In the function , what does the absolute value of represent?
In the function , the absolute value of represents the amplitude of the graph.
What is the period of in degrees?
The period of in degrees is .
In , what does represent?
In , the represents a horizontal translation.
What is the equation of the principal axis for the function ?
The equation of the principal axis for the function is .
What is the period of in radians?
The period of is radians.
True or False?
The order of applying transformations doesn't matter.
False.
The order in which transformations are applied is important.
In what order should transformations be applied?
Any stretches should be applied first, followed by any translations. Reflections should be applied last.
What line will the maximum points for lie on?
The maximum points for will lie on the line .
What type of phenomena can be modelled using trigonometric functions?
Any phenomena that fluctuates periodically can be modelled using a trigonometric function.
E.g. the vertical height above the ground of a person on a Ferris wheel over time, or the water depth of a tidal river over time, could be modelled using a trig function.
If a trigonometric function is used to model the water depth of a tidal river, what would represent?
In a trigonometric model , the absolute value of represents the amplitude of the function.
If the function is used to model the water depth of a tidal river, would represent the maximum distance that the water depth would be above and below the principal axis.
In the trigonometric function , how does the value of affect the model?
In the trigonometric function , changing the value of changes the period of the function. The bigger the value of , the quicker the function repeats a cycle.
In the trigonometric function , how does the value of affect the model?
In the trigonometric function , is the principal axis.
As the value of increases, the graph is shifted up, as the value of decreases, the graph is shifted down.
In the trigonometric function , what does represent?
In the trigonometric function , the horizontal shift of the graph is represented by .
True or False?
In real-life scenarios modelled by trigonometric functions, the time to complete a cycle always remains constant.
False.
In real-life scenarios modelled by trigonometric functions, the time to complete a cycle does not always remain constant.
The time taken to complete a cycle may change over time.
This is one of the limitations of a trigonometric model.
True or False?
One limitation of a trigonometric model is that the the amplitude is constant.
True.
One limitation of a trigonometric model is that the the amplitude is constant.
In real life, the amplitude is not always constant.
For example, the function may get closer to the principal axis over time.