sullivan algebra and trigonometry: section 6.5 unit circle approach; properties of the trig...
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Sullivan Algebra and Trigonometry: Section 6.5
Unit Circle Approach; Properties of the Trig Functions
Objectives of this Section
• Find the Exact Value of the Trigonometric Functions Using the Unit Circle
• Determine the Domain and Range of the Trigonometric Functions
• Determine the Period of the Trigonometric Functions
• Use Even-Odd Properties to Find the Exact Value of the Trigonometric Functions
The unit circle is a circle whose radius is 1 and whose center is at the origin.
Since r = 1:
s r
becomes
s
(0, 1)
(-1, 0)
(0, -1)
(1, 0)
s
y
x
(0, 1)
(-1, 0)
(0, -1)
(1, 0)
t
y
x
P = (a, b)
Let t be a real number and let P = (a, b) be the point on the unit circle that corresponds to t.
The sine function associates with t the y-coordinate of P and is denoted by
sin t b
The cosine function associates with t the x-coordinate of P and is denoted by
cost a
as defined is the,0 If functiontangent a
tan tba
as defined is the,0 If functioncosecant b
csc tb
1
as defined is the,0 If functionsecant a
sec ta
1
as defined is the,0 If functioncotangent b
cot tab
functions.
ometricsix trigon theof eexact valu theFind
. toscorrespond that circleunit on thepoint the
be 4
15,
4
1let andnumber real a be Let
t
Pt
4
15,41, ba
sin t b 154
cost a 14
tan tba
15
41
415
4
15,41, ba
csc tb
1 115
4
415
4 1515
sec ta
1 11
44
cot tab
1
415
4
115
1515
(0, 1)
(-1, 0)
(0, -1)
(1, 0)
t
y
x
P = (a, b)
If radians, the six
are
defined as
t trigonometric
functions of the angle
sin sin
cos cos
tan tan
t
t
t
csc csc
sec sec
cot cot
t
t
t
y
x
r
a
b
For an angle in standard position, let
be any point on the terminal side of . Let
equal the distance from the origin to . Then
P a b
r
P
( , )
0 ,tan cos sin aa
b
r
a
r
b
0 ,cot 0 ,sec 0 ,csc bb
aa
a
rb
b
r
Given that sec = and sin > 0, find the
exact value of the remaining five trigonometric
functions.
52
P=(a,b)
(5, 0)
x y2 2 25
sec , ,
52
5 2ra
r aso
a b r bbr
2 2 2 with > 0 since sin > 0
2 52 2 2b
4 252 b
b2 21
b 21
a b r 2 21 5, ,
sin br
215
cos ar
25
tan
ba
212
212
csc rb
521
5 2121
cot ab
221
2 2121
(0, 1)
(-1, 0)
(0, -1)
(1, 0)
t
y
x
P = (a, b)
The domain of the sine function is the set of all real numbers.
The domain of the cosine function is the set of all real numbers.
The domain of the tangent function is the set of all real numbers except odd multiples of
2 90 .
The domain of the secant function is the set of all real numbers except odd multiples of
2 90 .
The domain of the cotangent function is the set of all real numbers except integral multiples of 180 .
The domain of the cosecant function is the set of all real numbers except integral multiples of 180 .
Let P = (a, b) be the point on the unit circle that corresponds to the angle . Then, -1 < a < 1 and -1 < b < 1.
sin b
1 1sincos a
1 1cos
sin 1 cos 1
Range of the Trigonometric Functions
11
sin
1csc
b
1cscor 1csc
1secor 1sec
11
cos
1sec
a
cot
tan
A function is called if there is a
positive number such that whenever is
in the domain of , so is , and
f
p
f p
periodic
f p f p
If there is a smallest such number p, this smallest value is called the (fundamental) period of f.
Periodic Properties
sin sin
cos cos
tan tan
2
2
csc csc
sec sec
cot cot
2
2
4
7cot (b) 390sec (a)
of eexact valu theFind
3
3230sec36030sec390sec (a)
14
3cot
4
3cot
4
7cot )b(
Even-Odd Properties
sin sin
cos cos
tan tan
csc csc
sec sec
cot cot
4cot (b) 30sin (a)
of eexact valu theFind
2
130sin30sin )a(
14
cot4
cot (b)
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