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Probability & Statistics
Chapter 4
Elementary Probability Theory
I. What is Probability?
-In probability statements we use a number between 0 and 1 to indicate the
likelihood of an event.
-P(A) (read, “P of A”) is the notation to denote the probability of event A.
-An event is more likely to occur the closer the probability is to 1.
-If A is certain to occur the P(A) is 1.
Three major methods to find probabilities or assign them to events:
1) Intuition (sportscaster)
2) Relative Frequency (erroneous report)
3) Equally likely outcomes (T/F question)
Probability Formula of Relative Frequency
Probability of an event = relative frequency = n
f
where f is the frequency of an event, n is the sample size.
Law of Large Numbers
In the long run, as the sample size increases and increases, the relative frequencies
of outcomes get closer and closer to the theoretical (or actual) probability value.
Probability Formula When Outcomes are Equally Likely
Probability of an event = number of outcomes favorable to event
total number of outcomes
Probability & Statistics
Chapter 4
Elementary Probability Theory
Example 1
Assign a probability to the indicated event on the basis of the information provided.
Indicate the technique you use: intuition, relative frequency, or the formula for equally
likely outcomes.
(a) The director of the Readlot College Health Center wishes to open an eye
clinic. To justify the expense of such a clinic, the director reports the
probability that a student selected at random from the college roster needs
corrective lenses. She took a random sample of 500 students to compute this
probability and found that 375 of them needed corrective lenses. What is the
probability that a Readlot College student selected at random needs corrective
lenses?
(b) The Friends of the Library host a fund-raising barbecue. George is on the
cleanup committee. There are four members on this committee, and they
draw lots to see who will clean the grills. Assuming that each member is
equally likely to be drawn, what is the probability that George will be
assigned the grill cleaning job?
(c) Joanna photographs whales for Sea Life Adventure Films. On her next
expedition, she is to film blue whales feeding. Her boss asks her what she
thinks the probability of success will be for this particular assignment. She
gives an answer based on her knowledge of the habits of blue whales and the
region she is to visit. She is almost certain she will be successful. What
specific number do you suppose she gave the probability of success, and how
do you suppose she arrived at it?
Probability & Statistics
Chapter 4
Elementary Probability Theory
(a) In this case we are given a sample size of 500, and we are told that 375 of
these students need glasses. It is appropriate to use a relative frequency for
the desired probability:
P(student needs glasses) 75.0500
375
n
f
(b) There are four people on the committee, and each is equally likely to be
drawn. It is appropriate to use the formula for equally likely events. George
can be drawn in only one way, so there is only one outcome favorable to that
event.
P(George) = no. of favorable outcomes
total no. of outcomes
25.04
1
(c) Since Joanna is almost certain of success, she should make the probability
close to 1. We would say P(success) is above 0.90 but less than 1. We think
the probability assignment was based on intuition.
Probability & Statistics
Chapter 4
Elementary Probability Theory
Statistical experiment Any activity that results in a definite outcome.
Sample space The set of all possible outcomes n an experiment.
P(event A) = number of outcomes favorable to A
total number of outcomes
Example 2
Professor Herring is making up a final exam for a course in literature of the
Southwest. He wants the last three questions to be of the true-false type. In order to
guarantee that the answers do not follow his favorite pattern, he lists all possible true-
false combinations for three questions on slips of paper and then picks one at random
from a hat.
(a) Finish listing the outcomes in the given sample space.
TTT FTT TFT ________
TTF FTF TFF ________
(b) What is the probability that all three items will be false? Use the formula.
(c) What is the probability that exactly two items will be true?
Answers.
(a) The missing outcomes are FFT and FFF.
(b) There is only one outcome, FFF, favorable to all false so,
P(all F)8
1
(c) There are three outcomes that have exactly two true items: TTF. TFT, and
FTT. Thus,
P(two T) = 8
3
Probability & Statistics
Chapter 4
Elementary Probability Theory
The sum of all the probabilities assigned to outcomes in a sample space must be 1.
The probability that an event occurs is denoted by p.
The probability that an event does not occur is denoted by q.
1 qp since the sum of the probabilities of the outcomes must be 1
or pq 1
For any event A, the event not A is called the complement of A. To compute the
probability of the complement of A, we use:
P(not A) AP1
Example 3
A veterinarian tells you that if you breed two cream-colored guinea pigs, the
probability than an offspring will be pure white is 0.25. What is the probability that it
will not be pure white?
(a) P(pure white) + P(not pure white) = ________
(b) P(not pure white) = ________
Answers.
(a) 1
(b) 1-0.25, or 0.75
Probability & Statistics
Chapter 4
Elementary Probability Theory
Important facts about probabilities.
1. The probability of an event A is denoted by P(A).
2. The probability of any event is a number between 0 and 1. The
closer to 1 the probability is, the more likely the event is.
3. The sum of the probabilities of outcomes in a sample space is 1.
4. Probabilities can be assigned by using three methods: intuition,
relative frequencies, or the formula for equally likely outcomes.
5. The probability that an event occurs plus the probability that the
same event does not occur is 1.
Probability The field of study that makes statements about what will occur when
samples are drawn from a known population.
Statistics The field of study that describes how samples are to be obtained and how
inferences are to be made about unknown populations.
Illustration:
Box 1 contains three green balls, five red balls, and four white balls.
Box 2 contains a collection of colored balls, but the exact number and colors of
the balls are unknown.
The study of probability would investigate Box 1, where we already know the contents of
the box. Typical probability questions would be:
1) If one ball is drawn from Box 1, what is the probability that the
ball is green?
2) If three balls are drawn from Box 1, what is the probability that
one is white and two are red?
3) If four balls are drawn from Box 1, what is the probability that
none is red?
Box 1 Probability
Given: 3 green balls, 5 red balls, 4 white balls.
Box 2 Statistics
Exact number and colors of balls are unknown.
Probability & Statistics
Chapter 4
Elementary Probability Theory
II. Some Probability Rules – Compound Events
Independent Events The occurrence or nonoccurrence of one does not change the
probability that the other will occur.
Example: dice
For independent events,
P(A and B) = BPAP
Dependent Events The occurrence or nonoccurrence of one can change the
probability that the other will occur.
Example: cards
For dependent events,
P(A and B) BPAP ( , given that A has occurred)
P(A and B) APBP ( , given that B has occurred)
Example 4
Andrew is 55, and the probability that he will be alive in 10 years is 0.72. Ellen is
35, and the probability that she will be alive in 10 years is 0.92. Assuming that the life
span of one will have no effect on the life span of the other, what is the probability they
will both be alive in 10 years?
(a) Are these events dependent or independent?
(b) Use the appropriate multiplication rule to find
P(Andrew alive in 10 years and Ellen alive in 10 years).
Answers.
(a) Since the life span of one does not affect the life span of the other, the
events are independent.
(b) We use the rule for independent events.
P(A and B) = BPAP
P(Andrew alive and Ellen alive)
=P(Andrew alive) P(Ellen alive)
=(0.72)(0.92)=0.66
Probability & Statistics
Chapter 4
Elementary Probability Theory
Example 5
A quality-control procedure for testing Ready-Flash disposable cameras consists
of drawing two cameras at random from each lot of 100 without replacing the first
camera before drawing the second. If both are defective, the entire lot is rejected. Find
the probability that both cameras are defective if the lot contains 10 defective cameras.
Since we are drawing the cameras at random, assume that each camera in the lot has an
equal chance of being drawn.
(a) What is the probability of getting a defective camera on the first draw?
(b) The first camera drawn is not replaced, so there are only 99 cameras for
the second draw. What is the p probability of getting a defective camera
on the second draw if the first camera was defective?
(c) Are the probabilities computed in parts a and b different? Does drawing a
defective camera on the first draw change the probability of getting a
defective camera on the second draw? Are the events dependent?
(d) Use the formula for dependent events,
P(A and B) = (PAP B, given A has occurred) to compute
P(1st camera defective and 2
nd camera defective).
Probability & Statistics
Chapter 4
Elementary Probability Theory
Answers.
(a) The sample space consists of all 100 cameras. Since each is equally likely
to be drawn and there are 10 defective ones,
P(defective camera) = 10
1
100
10
(b) If the first camera is defective, then there are only 9 defective cameras left
among the 99 remaining cameras in the lot.
P(defective camera on the 2nd
draw, given defective camera on 1st) =
11
1
99
9
(c) The answer to all these questions is yes.
(d) P(1st defective and 2
nd defective) = 009.0
110
1
11
1
10
1
Probability & Statistics
Chapter 4
Elementary Probability Theory
Another way to combine events is to consider the possibility of one event or another
occurring. (Example: car sales)
Example 6 Indicate how each of the following pairs of events are combined. Use either the
and combination or the or combination.
(a) Satisfying the humanities requirement by taking a course in history of
Japan or by taking a course in classical literature.
(b) Buying new tires and aligning the tires.
(c) Getting an A not only in psychology but also in biology.
(d) Having at least one of these pets: cat, dog, bird, rabbit.
Answers.
(a) or combination
(b) and combination
(c) and combination
(d) or combination
Examples:
1) P(jack or king) = P(jack) + P(king) = 13
2
52
8
52
4
52
4
2) P(king) = 52
4 P(diamond) =
52
13
P(king and diamond) = 52
1
3) P(king or diamond) = P(king) + P(diamond) - P(king and diamond)
13
4
52
16
52
1
52
13
52
4
Probability & Statistics
Chapter 4
Elementary Probability Theory
Mutually Exclusive or Disjoint Events Events A and B cannot occur together. A and B have no outcomes in common.
P(A and B) = 0
For mutually exclusive events A and B
P(A or B) = P(A) + P(B)
If the events are not mutually exclusive, use a more general formula.
For any events A an B,
P(A or B) = P(A) + P(B) – P(A and B)
Example 7
The Cost Less Clothing Store carries seconds in slacks. If you buy a pair of
slacks in your regular waist size without trying them on, the probability that the waist will
be too tight is 0.30 and the probability that it will be too loose is 0.10.
(a) Are the events too tight or too loose mutually exclusive?
(b) If you choose a pair of slacks at random in your regular waist size, what is
the probability that the waist will be too tight or too loose?
Answers.
(a) The waist cannot be both too tight and too loose at the same time, so the
events are mutually exclusive.
(b) Since the events are mutually exclusive,
P(too tight or too loose) = P(too tight) + P(too loose) = 0.03 + 0.10 = 0.40
Probability & Statistics
Chapter 4
Elementary Probability Theory
Example 8
Professor Jackson is in charge of a program to prepare people for a high school
equivalency exam. Records show that 80% of the students need work in math, 70% need
work in English, and 55% need work in both areas.
(a) Are the events need math and need English mutually exclusive?
(b) Use the appropriate formula to compute the probability that a student
selected at random needs math or needs English.
Answers.
(a) These events are not mutually exclusive, since some students need both.
In fact, P(need math and need English) = 0.55
(b) Since the events are mutually exclusive, we use:
P(need math or need English)
= P(need math) + P(need English) – P(need math and English)
=0.80 + 0.70 – 0.55 = 0.95
Probability & Statistics
Chapter 4
Elementary Probability Theory
Example 9 Using table 4-2 on P. 179, let’s consider other probabilities regarding the type of
employees at Hopewell and their political affiliation. This time let’s consider the
production of worker and the affiliation of Independent. Suppose an employee is selected
at random from a group of 140.
(a) Compute P(I) and P(PW).
(b) Compute P(I, given PW). This is a conditional probability. Be sure to
restrict your attention to production workers since that is the condition
given.
(c) Compute P(I and PW). In this case look at the entire sample space and at
the number of employees who are both Independent and in production.
(d) Use the multiplication rule for dependent events to calculate P(I and PW).
Is the result the same as that of part c?
(e) Compute P(I or PW). Are the events mutually exclusive?
Probability & Statistics
Chapter 4
Elementary Probability Theory
Answers.
(a) P(I) = no. of independents
total no. of employees
= 121.0140
17
P(PW) = no. of production workers
total no. of employees
= 657.040
92
(b) P(I given PW) = no. of independent production workers
no. of production workers
= 087.092
8
(c) P(I and PW) = no. of independent production workers
total no. of employees
= 057.0140
8
(d) By the multiplication rule,
P(I and PW) = ,()( IPPWP given PW) = 057.0140
8
92
8
140
92
The results are the same.
(e) Since the events are not mutually exclusive,
P(I or PW) = P(I) + P(PW) – P(I and PW)
= 721.0140
101
140
8
140
92
140
17
Probability & Statistics
Chapter 4
Elementary Probability Theory
III. Trees and Counting Techniques
When outcomes are equally likely, we compute the probability of an event by using the
formula
P(A) = no. of outcomes favorable to the event A
no. of outcomes in the sample space
This formula requires that we be able to determine the number of outcomes in the sample
space. This has been easy to do in the past sections because the number of outcomes was
small or the sample space consisted of fairly straightforward events. We will learn how
to count the number of possible outcomes in larger sample spaces or those formed by
more complicated events.
Tree Diagram helps display the outcomes of an experiment consisting of a series
of activities.
Probability & Statistics
Chapter 4
Elementary Probability Theory
Example 10 Louis plays three tennis matches. Use a tree diagram to list the possible win and
loss sequences Louis can experience for the set of three matches.
(a) On the first match Louis can win or lose.
From Start, indicate these two branches.
(b) Regardless of whether Louis wins or loses the first match, he plays the
second and can again win or lose. Attach branches representing these two
outcomes to each of the first match results.
(c) Louis may win or lose the third match. Attach branches representing these
two outcomes to each of the second match results.
(d) How many possible win-lose sequences are there for the three matches?
(e) Complete this list of win-lose sequences.
1st 2
nd 3
rd
W W W
W W L
W L W
W L L
Probability & Statistics
Chapter 4
Elementary Probability Theory
Answers.
(d) Since there are eight branches at the end, there are eight sequences.
(e)
1st 2
nd 3
rd
W W W
W W L
W L W
W L L
L W W
L W L
L L W
L L L
Probability & Statistics
Chapter 4
Elementary Probability Theory
Example 11
Suppose there are five balls in a jar, three of which are red and two of which are
blue. Replace the first ball before drawing the second.
(a) Draw a tree diagram for the outcomes of this experiment. Show the
probabilities of each stage on the appropriate branch. (Hint: Are the
stages dependent or independent?)
(b) List the four possible outcomes of the experiment. (i.e., list the sample
space.)
(c) Use the multiplication rule for independent events and the probabilities
shown on your tree to compute the probability of each outcome.
(d) Do the probabilities of the outcomes in the sample space add up to 1?
Probability & Statistics
Chapter 4
Elementary Probability Theory
Answers.
(b) Red on 1st and red on 2nd
Red on 1st and blue on 2
nd
Blue on 1st and red on 2
nd
Blue on 1st and blue on 2
nd
(c) P(1st R and 2
nd R) =
25
9
5
3
5
3 RPRP
P(1st R and 2
nd B) =
25
6
5
2
5
3 BPRP
P(1st B and 2
nd R) =
25
6
5
3
5
2 RPBP
P(1st B and 2
nd B) =
25
4
5
2
5
2 BPBP
(d) Yes, as they should.
Probability & Statistics
Chapter 4
Elementary Probability Theory
Multiplication Rule of Counting
If there are n possible outcomes for event E1 and m possible outcomes for event
E2, then there are a total of mn or nm possible outcomes for the series of events E1
followed by E2.
Example 12
The Old Sage Inn offers a special dinner menu each night. There are two
appetizers to choose from, three main courses, and four desserts. A customer can select
one item from each category. How many different meals can be ordered from the special
dinner menu?
(a) Each special dinner consists of three items. List the item and the number
of choices per item.
(b) To find the number of different dinners composed of the three items,
multiply the number of choices per item together.
Answers.
(a) Appetizer – 2 Main Course – 3 Dessert – 4
(c) (2)(3)(4) = 24
There are 24 different dinners that can be ordered from the special dinner
menu.
Probability & Statistics
Chapter 4
Elementary Probability Theory
Factorial Notation
For a counting number n,
n! = n(n-1)(n-2) . . . 1
0! = 1
1! = 1
Example 13
(a) Evaluate 3!
(b) How many different ways can three objects be arranged in order? How
many choices do you have for the first position? for the second? for the
third?
(c) Verify step b with a three-stage three diagram.
Answers.
(a) 3! = (3)(2)(1) = 6
(b) We have three choices for the first position, two for the second, and one
for the third. By the multiplication rule we have
(3)(2)(1) = 3! = 6
Probability & Statistics
Chapter 4
Elementary Probability Theory
Counting Rule for Permutations
The number of ways to arrange in order n distinct objects, taking them r at a time
is,
!
!,
rn
nP rn
where n and r are whole numbers and rn
Example 14 The board of directors of Belford Community Hospital has 12 members. Three
officers – president, vice president, and treasurer – must be elected from the members.
How many different possible slates of officers are there? We will view a slate of officers
as a list of three people with one person for president listed first, one person for vice
president listed second, and one person for treasurer listed third. For instance, If Mr.
Acosta, Ms. Hill, and ;Mr. Smith wish to be on a slate together, there are several different
slates possible, depending on which one will run for president, which for vice president,
and which for treasurer. Not only are we asking for the number of different groups of
three names for a slate, we are also concerned about order, since it makes a difference
which name is listed in which position.
(a) What is the size of the group from which the slates of officers will be
selected? This is the value of n.
(b) How many people will be selected for each slate of officers? This is the
value of r.
(c) Each slate of officers is composed of three candidates. Different slates
occur as we arrange the three candidates in the positions of president, vice
president, and treasurer. For this reason, we need to consider the number
of permutations of 12 items arranged in groups of 3. Computer rnP , .
Probability & Statistics
Chapter 4
Elementary Probability Theory
Answers.
(a) n = 12
(b) r = 3
(c) !
!,
rn
nP rn
320,1
880,362
600,001,479
!9
!12
!312
!123,12
P
There are 1320 different possible slates of officers.
Counting Rule for Combinations
The number of combinations of n objects taken r at a time is
!!
!,
rnr
nC rn
where n and r are whole numbers and rn . Other commonly used notations for
combinations include rn C and
r
n.
Example 15
In your political science class you are given a list of 10 books. You are to select 4
to read during the semester. How many different combinations of 4 books are available
from the list of 10?
(a) Is the order in which you read the books relevant to the task of selecting
the books?
(b) Do we use the number of permutations or combinations of 10 books taken
4 at a time?
(c) How many books are available from which to select? How many must
you read? What is the value of n? of r?
(d) Compute 4,10C to determine the number of different groups of 4 books
from the list of 10.
Probability & Statistics
Chapter 4
Elementary Probability Theory
Answers. (a) No.
(b) Since consideration of order in which the books are selected is not
relevant, we compute the number of combinations of 10 books taken 4 at a time.
(c) There are 10 books among which you must select 4 to read.
n = 10 and r = 4.
(d)
!!
!,
rnr
nC rn
210
72024
800,628,3
!6!4
!10
!410!4
!104,10
C
There are 210 different groups of 4 books to select from the list of 10.
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