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TRIGONOMETRIC GRAPHS
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SINE GRAPHS The trig function “Sine” can be sketched Example 1:
a) Complete the table of y = sinx for x [0°; 360°] 0° 30° 45° 60° 90° 120° 135° 150° 180° y = sin x 210° 225° 240° 270° 300° 315° 330° 360° y = sin x
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Link between sinx as a ratio and as a graph
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b) Determine the following based on the graph:
The maximum value is…. 1 The minimum value is … -1 Amplitude = (maximum - minimum value) divided by 2 = (1-(-1)) = =1 c) Determine: The domain of the graph is … The range of the graph is …
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Example 2: a) Draw the graph of y = sin x for x [-360°; 360°] b) After how many degrees does the graph (pattern) start repeating itself? … 360° This is called the period of the graph.
![Example 2: a) Draw the graph of y = sin x for x [-360°; 360°]](http://slideplayer.com/slide/15014957/91/images/5/Example+2%3A+a%29+Draw+the+graph+of+y+%3D+sin+x+for+x+%5B-360%C2%B0%3B+360%C2%B0%5D.jpg "b) After how many degrees does the graph (pattern) start repeating itself … 360° This is called the period of the graph.")
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Exercise Graph Amplitude Maximum Minimum Period
y = sin x y = 2 sin x y =3 sin x y = - sin x y = - 2 sin x The effects of a in y = asinx Amplitude shifts of y = asinx
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Exercise Graph Amplitude Maximum Minimum Period
y = sin x y = sin x + 1 y = sin x - 2 Vertical shifts of y = sinx + q
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COS GRAPHS The trig function “Cosine” can be sketched Example 1:
a) Complete the table of y = cosx for x [0°; 360°] 0° 30° 45° 60° 90° 120° 135° 150° 180° y = cos x 210° 225° 240° 270° 300° 315° 330° 360° y = cos x
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Link between cosx as a ratio and as a graph
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b) Determine the following based on the graph:
The maximum value is…. 1 The minimum value is … -1 Amplitude = (maximum - minimum value) divided by 2 = (1-(-1)) = =1 c) Determine: The domain of the graph is … The range of the graph is …
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Example a) Draw the graph of y = cosx for x [-360°; 360°]
b) After how many degrees does the graph (pattern) start repeating itself? … 360° This is called the period of the graph.
![Example a) Draw the graph of y = cosx for x [-360°; 360°]](http://slideplayer.com/slide/15014957/91/images/11/Example+a%29+Draw+the+graph+of+y+%3D+cosx+for+x+%5B-360%C2%B0%3B+360%C2%B0%5D.jpg "b) After how many degrees does the graph (pattern) start repeating itself … 360° This is called the period of the graph.")
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Exercise Graph Amplitude Maximum Minimum Period y = cos x y= 2 cos x
y = - 2 scos x
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Exercise Graph Amplitude Maximum Minimum Period y = cos x
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TAN GRAPHS The trig function “Tangent” can be sketched Example 1:
a) Complete the table of y = tan x for x [0°; 360°] x is undefined at 90◦ and 270◦ Therefore, the tan graph has ASYMPTOTES at x = 90◦ and x = 270◦ 0° 45° 90° 135° 180° y = tan x 225° 270° 315° 360° y = tan x
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b) Determine the following based on the graph:
The maximum value is…. There is none! The minimum value is … There is none! Amplitude - There is none! However: y = atanx … a is the “amplitude” c) Determine: The domain of the graph is … The range of the graph is …
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Example a) Draw the graph of y = tan x for x [-360°; 360°]
b) After how many degrees does the graph (pattern) start repeating itself? … 180° This is called the period of the graph.
![Example a) Draw the graph of y = tan x for x [-360°; 360°]](http://slideplayer.com/slide/15014957/91/images/17/Example+a%29+Draw+the+graph+of+y+%3D+tan+x+for+x+%5B-360%C2%B0%3B+360%C2%B0%5D.jpg "b) After how many degrees does the graph (pattern) start repeating itself … 180° This is called the period of the graph.")
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Exercise Graph Amplitude Maximum Minimum Period y = tan x y= 2 tan x
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Exercise Graph Amplitude Maximum Minimum Period y = tan x
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