Post on 26-Dec-2015
transcript
1
Pre-CalculusChapter 4
Trigonometric Functions
2
4.5 Graphs of Sine and Cosine Functions
Objectives: Sketch the graphs of basic sine and cosine functions.
Use amplitude and period to help sketch the graphs of sine and cosine functions.
Sketch translations of graphs of sine and cosine functions.
Use sine and cosine functions to model real-life data.
3
Sine and the Unit Circle Applet:
http://www.ies.co.jp/math/java/samples/graphSinX.html
4
Graph Sine Complete the table of values and
create a graph of the sine function.
x 0 π/6 π/4 π/3 π/2 3π/
4
π 3π/
2
2π
sin x
5
Graph of Sine
6
Notes on the Graph of Sine Domain:
Range:
Period:
Symmetry:
Five Key Points in One Period:
7
Graph Cosine Complete the table of values and
create a graph of the sine function.
x 0 π/6 π/4 π/3 π/2 3π/
4
π 3π/
2
2π
cos x
8
Graph of Cosine
9
Notes on the Graph of Cosine Domain:
Range:
Period:
Symmetry:
Five Key Points in One Period:
10
General Form of Sine & Cosine The general form of sine and cosine
are:y = d + a sin (bx – c)
y = d + a cos (bx – c) Where |a| = amplitude 2π/b = period c = horizontal shift d = vertical shift
11
Example 1 On the same set of coordinate
axes, sketch the graph of each function by hand on the interval [–π, 4π]. Compare these with the graph of the parent function.a. y = ½ cos x
b. y = –3 cos x
12
Example 1
13
Example 2 On the same set of coordinate
axes, sketch the graph of each function by hand on the interval [–π, 4π]. Compare these with the graph of the parent function.a. y = sin (x/2)
b. y = sin 2x
14
Example 2
15
Graphs of Sine and Cosine The graphs of y = d + a sin (bx – c) and
y = d + a cos (bx – c) have the following characteristics:
Amplitude = |a|Period = 2π/b
The left and right endpoints of a one-cycle interval can be determined by solving the equations bx – c = 0 and bx – c = 2π.
16
Example 3 Analyze and sketch the graph of
y = ½ sin (x – π/3)
17
Example 4 Analyze and sketch the graph of
y = –3 cos (2πx + 4π)
18
Example 5 Analyze and sketch the graph of
y = 2 + 3 cos 2x
19
Example 6 Find the amplitude, period, and
phase shift for the sine function whose graph is shown. Write an equation for this graph.
20
Example 7 Find the amplitude, period, and
phase shift for the sine function whose graph is shown. Write an equation for this graph.
21
Mathematical Modeling Sine and cosine functions can be
used to model many real-life situations including: Electric currents Musical tones Radio waves Tides Weather patterns
22
Example 8Throughout the day, the depth of the water at the end of a dock in Bangor, WA varies with the tides. The table shows the depths (in feet) at various times during the morning.
a. Use a trig function to model this data.b. A boat needs at least 10 feet of water to
moor at the dock. During what times in the evening can it safely dock?
Time Midnight 2 AM
4 AM
6 AM
8 AM
10 AM Noon
Depth 3.1 7.8 11.3 10.9 6.6 1.7 0.9
23
Homework 4.5 Worksheet 4.5