1. 1.1 Lines
Increments
If a particle moves from the point (x1,y1) to the point
(x2,y2), the increments in its coordinates are

2. 1.1 Lines
Slope
Let P1= (x1,y1) and P2= (x2,y2) be points on a nonvertical
line L. The slope of L is
P1(x1,y1)
P2(x2,y2) Δy
Q(x2,y1) Δx

3. 1.1 Lines Theorem: If two lines are parallel, then they have the
same slope and if they have the same slope, then
they are parallel.
Proof: If L1 || L2, then θ1= θ2
and m1= m2. Conversely, if
m1 = m2, then θ1= θ2 and
L1 || L2. m1 m2 L1 L2
slope m1
slope m2 θ1 θ2 1

4. 1.1 Lines
Theorem: If two non vertical lines L1and L2 are perpendicular,
then their slopes satisfy m1m2 = -1 and conversely.
Proof: Δ ADC ~ ΔCDB L1 L2
Slope m2
Slope m1 A C B
m1 = tan θ1 = a/h
m2 = tan θ2 = -h/a h D a θ1 θ2
so m1m2 =(a/h)(-h/a) = -1

5. 1.1 Lines Equations of lines Point-Slope Formula y = m(x – x1) + y1
Slope-Intercept form y = mx + b
Standard form Ax + By = C
y = a Horizontal line slope of zero
x =a Vertical line no slope

6. 1.1 Lines Regression Analysis Plot the data
Find the regression equation y = mx + b
Superimpose the graph on the data points.
Use the regression equation to predict y-values.

7. 1.1 Lines Coordinate Proofs State given and prove. Draw a picture.
Label coordinates, use (0,0) if possible.
Fill in missing coordinates.
Use algebra to prove
parallel/perpendicular-slope
equidistant-distance formula
bisect-midpoint

8. 1.1 Lines Prove the midpoint of the hypotenuse
of a right triangle is equidistant
from the three vertices.
A(0,0)
C(b,0)
B(0,a)
M(b/2,a/2)
Given: ΔBAC is a right triangle
Prove: AM = BM = CM
Since AM = BM = CM, the
midpoint of the hypotenuse
of a right triangle is
equidistant from the three
vertices

14. 1.2 Functions and Graphs y = f(x) y is a function of x Function
A function from a set D to a set R is a rule that
assigns a unique element R to each element D.
y = f(x) y is a function of x

15. 1.2 Functions and Graphs Domain All possible x values
Range All possible y values

16. 1.2 Functions and Graphs a open a b closed a b half opened a ba
open a b
closed a b
half opened a b
half opened a b

17. 1.2 Functions and Graphs
y = mx
Domain (-∞ , ∞)
Range (-∞ , ∞)

18. 1.2 Functions and Graphs
y = x2
Domain (-∞ , ∞)
Range [0, ∞)

19. 1.2 Functions and Graphs
y = x3
Domain (-∞ , ∞)
Range (-∞ , ∞)

20. 1.2 Functions and Graphs
y = 1/x
Domain x ≠ 0
Range y ≠ 0

21. 1.2 Functions and Graphs
Domain [0, ∞)
Range [0, ∞)

22. 1.2 Functions and Graphs Function Domain Range y = x y = x2 y = |x|
[-3,3]
[0,3]

23. 1.2 Functions and Graphs Definitions Even Function, Odd Function
A function y = f(x) is an
even function of x if f(-x) = f(x)
odd function of x if f(-x) = -f(x)
for every x in the function’s domain.
Even Function – symmetrical about the y-axis.
Odd Function - symmetrical about the origin.

24. 1.2 Functions and Graphs Odd Function symmetrical about the origin.
Even Function
symmetrical about the y-axis.
(x,y)
(-x,y)
(x,y)
(-x,-y)

25. 1.2 Functions and Graphs Transformations
h(x) = af(x) vertical stretch or shrink
h(x) = f(ax) horizontal stretch or shrink
h(x) = f(x) + k vertical shift
h(x) = f(x + h) horizontal shift
h(x) = -f(x) reflection in the x-axis
h(x) = f(-x) reflection in the y-axis

26. 1.2 Functions and Graphs
Domain
Range
(-,)
Piece Functions
[-3, )

27. 1.2 Functions and Graphs
Piece Functions
Domain
Range
(-,)
[0, )

28. 1.2 Functions and Graphs Composite Functions f(g(x))
f(x) = x2, g(x) = 3x - 1
Find:
f(g(2))
g(f(-1))
g(f(x))
f(g(x)) 25 2
3x2 – 1
(3x – 1)2 = 9x2 – 6x + 1

29. 1.3 Exponential Functions
Definition Exponential Function
Let a be a positive real number other than 1,
the function f(x) = ax is the exponential
function with base a.

30. 1.3 Exponential Functions
Rules For Exponents
If a > 0 and b > 0, the following hold true for all real
numbers x and y.

31. 1.3 Exponential Functions
Use the rules for exponents to
solve for x.
4x = 128
(2)2x = 27
2x = 7
x = 7/2
2x = 1/32
2x = 2-5
x = -5

32. 1.3 Exponential Functions
27x = 9-x+1
(33)x = (32)-x+1
33x = 3-2x+2
3x = -2x+ 2
5x = 2
x = 2/5
(x3y2/3)1/2
x3/2y1/3

33. 49 9
1/9 5 4 5 81 32 2 1
1/8 2
80/9 8
9/4 36
1/25
1/49 4 5

34. 1.3 Exponential Functions
Properties of f (x) = ax
Domain: Range: Increasing for: Decreasing for: Point Shared On All Graphs: Asymptote:
(-∞, ∞)
(0, ∞)
a > 1
0 < a < 1
(0, 1)
y = 0

35. 1.3 Exponential Functions
Natural Exponential Function where e is the natural base and e  2.718…

36. 1.3 Exponential Functions
f(x) = 2x
h(x) = (0.5)x
g(x) = ex
Domain
Range
Increasing or Decreasing
Point Shared On All Graphs
(-∞, ∞)
(-∞, ∞)
(-∞, ∞)
(0, ∞)
(0, ∞)
(0, ∞)
Inc.
Dec.
Inc.
(0, 1)

37. 1.3 Exponential Functions
Use translation of functions to graph the following. Determine the domain and range of each.
1. f(x) = -5(x + 2) – 3
2. g(x) = (1/3)(x – 1) + 2

38. 1.3 Exponential Functions
Definitions Exponential Growth, Exponential Decay
The function y = k ax, k > 0 is a model for exponential
growth if a > 1, and a model for exponential decay
if 0 < a < 1.
y new amount
yo original amount
b base
t time
h half life

39. 1.3 Exponential Functions
An isotope of sodium, 24Na, has a half-life of 15 hours. A sample of this isotope has mass 2 g.
Find the amount remaining after t hours.
Find the amount remaining after 60 hours.
Estimate the amount remaining after 4 days.
Use a graph to estimate the time required for the mass to be reduced to 0.1 g.

40. 1.3 Exponential Functions
An isotope of sodium, Na, has a half-life of 15 hours. A sample of this isotope has mass 2 g.
Find the amount remaining after t hours.
Find the amount remaining after 60 hours.
a. y = yobt/h
y = 2 (1/2)(t/15)
b. y = yobt/h
y = 2 (1/2)(60/15)
y = 2(1/2)4
y = .125 g

41. 1.3 Exponential Functions
An isotope of sodium, 24Na, has a half-life of 15 hours. A sample of this isotope has mass 2 g.
(c.) Estimate the amount remaining after 4 days.
(d.) Use a graph to estimate the time required for the mass to be reduced to 0.1 g.
c. y = yobt/h
y = 2 (1/2)(96/15)
y = 2(1/2)6.4
y = .023 g d.

42. 1.3 Exponential Functions
A bacteria double every three days. There are 50 bacteria initially present
Find the amount after 2 weeks.
When will there be 3000 bacteria?
a. y = yobt/h
y = 50 (2)(14/3)
y = 1269 bacteria

43. 1.3 Exponential Functions
A bacteria double every three days. There are 50 bacteria initially present
When will there be 3000 bacteria?
b. y = yobt/h
3000 = 50 (2)(t/3)
60 = 2t/3

44. 1.4 Parametric Equations
Equations where x and y are functions of a third variable, such as t. That is,
x = f(t) and y = g(t).
The graph of parametric equations are called parametric curves and are defined by (x, y) = (f(t), g(t)).

45. 1.4 Parametric Equations
Equations defined in terms of x and y. These may or may not be functions. Some examples include:
x2 + y2 = 4
y = x2 + 3x + 2

46. 1.4 Parametric Equations
Sketch the graph of the parametric equation for t
in the interval [0,3] t x y 1 -1 3 2 -3 6 -5 9

47. 1.4 Parametric Equations
Eliminate the parameter t from the curve

48. 1.4 Parametric Equations If we let t = the angle, then: Circle: Since:
We could identify the parametric equations as a circle.

49. 1.4 Parametric Equations
Ellipse:
This is the equation of an ellipse.

50. 1.4 Parametric Equations
The path of a particle in two-dimensional space can be modeled by the parametric equations x = 2 + cos t and y = 3 + sin t. Sketch a graph of the path of the particle for 0  t  2.

51. How is t represented on this graph?
1.4 Parametric Equations
How is t represented on this graph?

52. 1.4 Parametric Equations 
 t = 
 t = 0 

53. 1.4 Parametric Equations
Graphing calculators and other mathematical software can plot parametric equations much more efficiently then we can. Put your graphing calculator and plot the following equations. In what direction is t increasing?
(a) x = t2, y = t3 (b)
(c) x = sec θ, y = tan θ; -/2 < θ < /2

54. (a) x = t2, y = t3 1.4 Parametric Equations
Parametric equations can easily be converted to Cartesian equations by solving one of the equations for t and substituting the result into the other equation.
(a) x = t2, y = t3

55. 1.4 Parametric Equations
(b)

56. 1.4 Parametric Equations (c) x = sec t, y = tan t
where -/2 < t < /2
Hint: sec2 θ – tan2 θ = 1

57. 1.4 Parametric Equations
Find a parametrization for the line segment with endpoints
(2,1) and (-4,5).
x = 2 + at y = 1 + bt
Cartesian Equation
m = (5 – 1)/(-4 – 2) = -2/3
when t = 1, a = -6
when t = 1, b = 4
y = mx + b
1 = (-2/3)(2) + b
b = 7/3
x = 2 – 6t and y = 1 + 4t
y = (-2/3)x + 7/3

58. 1.5 Functions and Logarithms
A function is one-to-one if two domain values do not have the same range value.
Algebraically, a function is one-to-one if
f (x1) ≠ f (x2) for all x1 ≠ x2.
Graphically, a function is one-to-one if its graph passes the horizontal line test. That is, if any horizontal line drawn through the graph of a function crosses more than once, it is not one-to-one.

59. 1.5 Functions and Logarithms
To be one-to-one, a function must pass the horizontal line test as well as the vertical line test.
one-to-one
not one-to-one
not a function
(also not one-to-one)

60. 1.5 Functions and Logarithms
Determine if the following functions are one-to-one.
(a) f (x) = 1 + 3x – 2x 4
(b) g(x) = cos x + 3x 2
(c)
(d)

61. 1.5 Functions and Logarithms
The inverse of a one-to-one function is obtained by exchanging the domain and range of the function. The inverse of a one-to-one function f is denoted with f -1.
Domain of f = Range of f -1
Range of f = Domain of f -1
To prove functions are
inverses show that
f(f-1(x)) = f-1(f(x)) = x
f −1(x) = y <=> f (y) = x

62. 1.5 Functions and Logarithms
To obtain the formula for the inverse of a function, do the following:
Let f (x) = y.
Exchange y and x.
Solve for y.
Let y = f −1(x).

63. 1.5 Functions and Logarithms
Given an x value, we can find a y value.
Inverse functions:
Switch x and y:
Inverse functions are reflections about y = x.
Solve for y:

64. 1.5 Functions and Logarithms
Prove f(x) and f-1(x) are inverses.

65. 1.5 Functions and Logarithms
Determine the formula for the inverse of the following one-to-one functions.
(a)
(b)
(c)

66. 1.5 Functions and Logarithms
You can obtain the graph of the inverse of a one-to-one function by reflecting the graph of the original function through the line y = x.

67. 1.5 Functions and Logarithms

68. 1.5 Functions and Logarithms

69. 1.5 Functions and Logarithms
Sketch a graph of f (x) = 2x and sketch a graph of its inverse. What is the domain and range of the inverse of f.
Domain: (0, ∞)
Range: (-∞, ∞)

70. 1.5 Functions and Logarithms
The inverse of an exponential function is called a logarithmic function.
Definition: x = a y if and only if y = log a x

71. 1.5 Functions and Logarithms
The function f (x) = log a x is called a logarithmic function.
Domain: (0, ∞)
Range: (-∞, ∞)
Asymptote: x = 0
Increasing for a > 1
Decreasing for 0 < a < 1
Common Point: (1, 0)

72. 1.5 Functions and Logarithms
Find the inverse of g(x) = 3x.
Definition: x = a y if and only if y = log a x

73. 1.5 Functions and Logarithms
log a (ax) = x for all x  
alog ax = x for all x > 0
log a (xy) = log a x + log a y
log a (x/y) = log a x – log a y
log a xn = n log a x
Common Logarithm: log 10 x = log x
Natural Logarithm: log e x = ln x
All the above properties hold.

74. 1.5 Functions and Logarithms
The natural and common logarithms can be found on your calculator. Logarithms of other bases are not. You need the change of base formula.
where b is any other appropriate base.

75. 1.5 Functions and Logarithms
$1000 is invested at 5.25 % interest compounded annually.
How long will it take to reach $2500?
We use logs when we have an unknown exponent.
17.9 years
In real life you would have to wait 18 years.

76. 1.5 Functions and Logarithms
Example 7:
Indonesian Oil Production (million barrels per year):
Use the natural logarithm regression equation to estimate oil production in 1982 and 2000.
How do we know that a logarithmic equation is appropriate?
In real life, we would need more points or past experience.

77. 1.5 Functions and Logarithms
Determine the exact value of log 8 2.
Determine the exact value of ln e 2.3.
Evaluate log to four decimal places.
Write as a single logarithm: ln x + 2ln y – 3ln z.
Solve 2x + 5 = 3 for x.

78. 1.6 Trigonometric FunctionsA B θ s r
The Radian measure of angle ACB
at the center of the unit circle equals
the length of the arc that ACB cuts
from the unit circle.

79. 1.6 Trigonometric Functionsθ
terminal ray
initial ray y x r
P(x,y)

80. 1.6 Trigonometric Functions
(2,/4)
(5,5 /6)
(4, 11/6)
(-4, /2)

81. 1.6 Trigonometric Functions
Let a point P have rectangular coordinates (x,y)
and polar coordinates (r,). Then

82. 1.6 Trigonometric Functions
60° 1 2
30°
45° 1 S A T C

83. 1.6 Trigonometric Functions

85. 1.6 Trigonometric Functions
Even and Odd Trig Functions:
“Even” functions behave like polynomials with even exponents, in that when you change the sign of x, the y value doesn’t change.
Cosine is an even function because:
Secant is also an even function, because it is the reciprocal of cosine.
Even functions are symmetric about the y - axis.

86. 1.6 Trigonometric Functions
Even and Odd Trig Functions:
“Odd” functions behave like polynomials with odd exponents, in that when you change the sign of x, the sign of the y value also changes.
Sine is an odd function because:
Cosecant, tangent and cotangent are also odd, because their formulas contain the sine function.
Odd functions have origin symmetry.

87. 1.6 Trigonometric Functions
Definition Periodic Function, Period
A function f(x) is periodic if there is a positive
number p such that f(x + p) = f(x)
for every value of x. The smallest
such value of p is the period of p.

88. 1.6 Trigonometric Functions
Vertical stretch or shrink;
reflection about x-axis
Vertical shift
Positive d moves up.
is a stretch.
Horizontal shift
Horizontal stretch or shrink;
reflection about y-axis
Positive c moves left.
is a shrink.

89. 1.6 Trigonometric Functions
is the
amplitude.
Vertical shift
is the period.
Horizontal shift B A C D

90. 1.6 Trigonometric Functions

91. 1.6 Trigonometric Functions

92. 1.6 Trigonometric Functions

93. 1.6 Trigonometric Functions

94. 1.6 Trigonometric Functions

95. 1.6 Trigonometric Functions

96. 1.6 Trigonometric Functions
Let  be the acute angle of a right triangle with sin  = 3/5.
Find the exact values of the other five trig functions.
Show all your work. 3  4 5

97. 1.6 Trigonometric FunctionsIf
and
find the exact value of  -1

98. 1.6 Trigonometric Functions
Find the amplitude, period, and frequency of the
simple harmonic motion.
Amplitude ¾
Frequency ¼

99. 1.6 Trigonometric Functions
Find the exact values without using a calculator:
(a) tan (11/6) (b) sec(-3/4) (c) cot (-5/3)

100. 1.6 Trigonometric Functions-3 -5 
Given that tan  = 3/5,  in quadrant III,
and cos  = -1/2,  in quadrant II, Find
(a) cos( - ) (b) sin 2
(a) cos  cos  + sin  sin   -1 2
(b) sin 2
sin 2 = 2 sin  cos 

101. 1.6 Trigonometric Functions
Verify the identities. Show all your work.
(a) (b)
(c) sin(π + x) = -sin x
sin  cos x + sin x cos 
0 cos x + sin x (-1) = -sin x

102. 1.6 Trigonometric Functions
Find the exact values without using a calculator.
(a) (b)
(c) sec-1 (2)
120º 240º
150º 330º
60º 300º

103. 1.6 Trigonometric Functions
Find the exact values without a calculator.
(c) tan(sec-1x)
(a)
(b)  5 3 4   1
cos 2 =cos2 - sin2

104. 1.6 Trigonometric Functions
Solve each equation for exact solutions in the interval [0,2).
(a) cos2 x – 1 = (b) 2 cos2 x + 1 = -3 cos x
cos2 x = cos2 x + 3 cos x+ 1 = 0
cos x = 1 or cos x = (2cos x + 1)(cos x + 1) = 0
x = 0, x =  x = 2/3, 4/3 x = 
sin2x = 0
2sin x cos x = 0
sin x = 0 or cos x = 0
x = 0, /2, ,3/2

105. 1.6 Trigonometric Functions
Solve each equation for exact solutions in the interval [0,2).
(a) tan x sin x – sin x = (b) 2cos x sin x - cos x = 0
sin x(tan x – 1) = cos x(2sin x – 1) = 0
sin x= 0 or tan x – 1 = cos x = 0 or 2 sin x – 1 = 0
x = 0,  x = /4, 5/ x = /2, 3/2 or sin x = ½
x = /6, 5/6
(c) tan2 x = 3
x = /3, 2/3 4/3 5/3