Deck 4: Basic Probability

When using the general multiplication rule, P(A and B) is equal to

SCENARIO 4-1
Mothers Against Drunk Driving is a very visible group whose main focus is to educate the public
about the harm caused by drunk drivers. A study was recently done that emphasized the problem we
all face with drinking and driving. Four hundred accidents that occurred on a Saturday night were
analyzed. Two items noted were the number of vehicles involved and whether alcohol played a role
in the accident. The numbers are shown below: $$\begin{array} { c | | c c c | c } & { \text { Number of Vehicles } } \\& { \text { Involved } } \\\text { Did alcohol play a role? } & \mathbf { 1 } & \mathbf { 2 } & \mathbf { 3 } & \text { Totals } \\ \text { Yes } & 50 & 100 & 20 & 170 \\\text { No } & 25 & 175 & 30 & 230 \\\hline \text { Totals } & 75 & 275 & 50 & 400\end{array}$$

-Referring to Scenario 4-1, what proportion of accidents involved more than one vehicle?

A survey of banks revealed the following distribution for the interest rate being charged on a home loan (based on a 30-year mortgage with a 10% down payment) on a certain date in the past. $$\begin{array} { c | c | c | c | c | c } \text { Interest Rate } & \begin{array} { c } 3.20 \% \\\text { to } \\3.29 \%\end{array} & \begin{array} { c } 3.30 \% \\\text { to } \\3.39 \%\end{array} & \begin{array} { c } 3.40 \% \\\text { to } \\3.49 \%\end{array} & \begin{array} { c } 3.50 \% \\\text { to } \\3.59 \%\end{array} & \begin{array} { c } 3.60 \% \\\text { and } \\\text { above }\end{array} \\\hline \text { Probability } & 0.12 & 0.23 & 0.24 & 0.35 & 0.06\end{array}$$ If a bank is selected at random from this distribution, what is the chance that the interest rate charged
On a home loan will exceed 3.49%?

If either A or B must occur they are called mutually exclusive.

SCENARIO 4-2
An alcohol awareness task force at a Big-Ten university sampled 200 students after the midterm to
ask them whether they went bar hopping the weekend before the midterm or spent the weekend
studying, and whether they did well or poorly on the midterm. The following result was obtained.
Referring to Scenario 4-2, what is the probability that a randomly selected student did well on the midterm or went bar hopping the weekend before the midterm?

SCENARIO 4-2
An alcohol awareness task force at a Big-Ten university sampled 200 students after the midterm to
ask them whether they went bar hopping the weekend before the midterm or spent the weekend
studying, and whether they did well or poorly on the midterm. The following result was obtained. $$\begin{array} { | l | l | l | } \hline & \text { Did Well on Midterm } & \text { Did Poorly on Midterm } \\\hline \text { Studying for Exam } & 80 & 20 \\\hline \text { Went Bar Hopping } & 30 & 70 \\\hline\end{array}$$

-Referring to Scenario 4-2, the events "Did Well on Midterm" and "Studying for Exam" are

SCENARIO 4-1
Mothers Against Drunk Driving is a very visible group whose main focus is to educate the public
about the harm caused by drunk drivers. A study was recently done that emphasized the problem we
all face with drinking and driving. Four hundred accidents that occurred on a Saturday night were
analyzed. Two items noted were the number of vehicles involved and whether alcohol played a role
in the accident. The numbers are shown below: $$\begin{array} { c | | c c c | c } & { \text { Number of Vehicles } } \\& { \text { Involved } } \\\text { Did alcohol play a role? } & \mathbf { 1 } & \mathbf { 2 } & \mathbf { 3 } & \text { Totals } \\ \text { Yes } & 50 & 100 & 20 & 170 \\\text { No } & 25 & 175 & 30 & 230 \\\hline \text { Totals } & 75 & 275 & 50 & 400\end{array}$$

-Referring to Scenario 4-1, given that alcohol was not involved, what proportion of the accidents were single vehicle?

SCENARIO 4-1
Mothers Against Drunk Driving is a very visible group whose main focus is to educate the public
about the harm caused by drunk drivers. A study was recently done that emphasized the problem we
all face with drinking and driving. Four hundred accidents that occurred on a Saturday night were
analyzed. Two items noted were the number of vehicles involved and whether alcohol played a role
in the accident. The numbers are shown below: $$\begin{array} { c | | c c c | c } & { \text { Number of Vehicles } } \\& { \text { Involved } } \\\text { Did alcohol play a role? } & \mathbf { 1 } & \mathbf { 2 } & \mathbf { 3 } & \text { Totals } \\ \text { Yes } & 50 & 100 & 20 & 170 \\\text { No } & 25 & 175 & 30 & 230 \\\hline \text { Totals } & 75 & 275 & 50 & 400\end{array}$$

-Referring to Scenario 4-1, given that multiple vehicles were involved, what proportion of accidents involved alcohol?

If P(A) = 0.4 and P(B) = 0.6, then A and B must be collectively exhaustive.

SCENARIO 4-2
An alcohol awareness task force at a Big-Ten university sampled 200 students after the midterm to
ask them whether they went bar hopping the weekend before the midterm or spent the weekend
studying, and whether they did well or poorly on the midterm. The following result was obtained. $$\begin{array} { | l | l | l | } \hline & \text { Did Well on Midterm } & \text { Did Poorly on Midterm } \\\hline \text { Studying for Exam } & 80 & 20 \\\hline \text { Went Bar Hopping } & 30 & 70 \\\hline\end{array}$$

-Referring to Scenario 4-2, what is the probability that a randomly selected student did well on the midterm and also went bar hopping the weekend before the midterm?

If P(A) = 0.4 and P(B) = 0.6, then A and B must be mutually exclusive.

SCENARIO 4-1
Mothers Against Drunk Driving is a very visible group whose main focus is to educate the public
about the harm caused by drunk drivers. A study was recently done that emphasized the problem we
all face with drinking and driving. Four hundred accidents that occurred on a Saturday night were
analyzed. Two items noted were the number of vehicles involved and whether alcohol played a role
in the accident. The numbers are shown below: $$\begin{array} { c | | c c c | c } & { \text { Number of Vehicles } } \\& { \text { Involved } } \\\text { Did alcohol play a role? } & \mathbf { 1 } & \mathbf { 2 } & \mathbf { 3 } & \text { Totals } \\ \text { Yes } & 50 & 100 & 20 & 170 \\\text { No } & 25 & 175 & 30 & 230 \\\hline \text { Totals } & 75 & 275 & 50 & 400\end{array}$$

-Referring to Scenario 4-1, what proportion of accidents involved alcohol or a single vehicle?

If A and B cannot occur at the same time they are called mutually exclusive.

The collection of all the possible events is called a sample space.

SCENARIO 4-1
Mothers Against Drunk Driving is a very visible group whose main focus is to educate the public
about the harm caused by drunk drivers. A study was recently done that emphasized the problem we
all face with drinking and driving. Four hundred accidents that occurred on a Saturday night were
analyzed. Two items noted were the number of vehicles involved and whether alcohol played a role
in the accident. The numbers are shown below: $$\begin{array} { c | | c c c | c } & { \text { Number of Vehicles } } \\& { \text { Involved } } \\\text { Did alcohol play a role? } & \mathbf { 1 } & \mathbf { 2 } & \mathbf { 3 } & \text { Totals } \\ \text { Yes } & 50 & 100 & 20 & 170 \\\text { No } & 25 & 175 & 30 & 230 \\\hline \text { Totals } & 75 & 275 & 50 & 400\end{array}$$

-Referring to Scenario 4-1, given alcohol was involved, what proportion of accidents involved a single vehicle?

When A and B are mutually exclusive, P(A or B) can be found by adding P(A) and
P(B).

SCENARIO 4-2
An alcohol awareness task force at a Big-Ten university sampled 200 students after the midterm to
ask them whether they went bar hopping the weekend before the midterm or spent the weekend
studying, and whether they did well or poorly on the midterm. The following result was obtained. $$\begin{array} { | l | l | l | } \hline & \text { Did Well on Midterm } & \text { Did Poorly on Midterm } \\\hline \text { Studying for Exam } & 80 & 20 \\\hline \text { Went Bar Hopping } & 30 & 70 \\\hline\end{array}$$

-Referring to Scenario 4-2, the events "Did Well on Midterm" and "Studying for Exam" are

SCENARIO 4-1
Mothers Against Drunk Driving is a very visible group whose main focus is to educate the public
about the harm caused by drunk drivers. A study was recently done that emphasized the problem we
all face with drinking and driving. Four hundred accidents that occurred on a Saturday night were
analyzed. Two items noted were the number of vehicles involved and whether alcohol played a role
in the accident. The numbers are shown below: $$\begin{array} { c | | c c c | c } & { \text { Number of Vehicles } } \\& { \text { Involved } } \\\text { Did alcohol play a role? } & \mathbf { 1 } & \mathbf { 2 } & \mathbf { 3 } & \text { Totals } \\ \text { Yes } & 50 & 100 & 20 & 170 \\\text { No } & 25 & 175 & 30 & 230 \\\hline \text { Totals } & 75 & 275 & 50 & 400\end{array}$$

-Referring to Scenario 4-1, given that alcohol was not involved, what proportion of the accidents were multiple vehicle?

SCENARIO 4-2
An alcohol awareness task force at a Big-Ten university sampled 200 students after the midterm to
ask them whether they went bar hopping the weekend before the midterm or spent the weekend
studying, and whether they did well or poorly on the midterm. The following result was obtained. $$\begin{array} { | l | l | l | } \hline & \text { Did Well on Midterm } & \text { Did Poorly on Midterm } \\\hline \text { Studying for Exam } & 80 & 20 \\\hline \text { Went Bar Hopping } & 30 & 70 \\\hline\end{array}$$

-Referring to Scenario 4-2, what is the probability that a randomly selected student who went bar hopping did well on the midterm?

If either A or B must occur they are called collectively exhaustive.

SCENARIO 4-1
Mothers Against Drunk Driving is a very visible group whose main focus is to educate the public
about the harm caused by drunk drivers. A study was recently done that emphasized the problem we
all face with drinking and driving. Four hundred accidents that occurred on a Saturday night were
analyzed. Two items noted were the number of vehicles involved and whether alcohol played a role
in the accident. The numbers are shown below: $$\begin{array} { c | | c c c | c } & { \text { Number of Vehicles } } \\& { \text { Involved } } \\\text { Did alcohol play a role? } & \mathbf { 1 } & \mathbf { 2 } & \mathbf { 3 } & \text { Totals } \\ \text { Yes } & 50 & 100 & 20 & 170 \\\text { No } & 25 & 175 & 30 & 230 \\\hline \text { Totals } & 75 & 275 & 50 & 400\end{array}$$

-Referring to Scenario 4-1, given that 3 vehicles were involved, what proportion of accidents involved alcohol?

SCENARIO 4-2
An alcohol awareness task force at a Big-Ten university sampled 200 students after the midterm to
ask them whether they went bar hopping the weekend before the midterm or spent the weekend
studying, and whether they did well or poorly on the midterm. The following result was obtained. $$\begin{array} { | l | l | l | } \hline & \text { Did Well on Midterm } & \text { Did Poorly on Midterm } \\\hline \text { Studying for Exam } & 80 & 20 \\\hline \text { Went Bar Hopping } & 30 & 70 \\\hline\end{array}$$

-Referring to Scenario 4-2, the events "Did Well on Midterm" and "Did Poorly on Midterm" are

SCENARIO 4-1
Mothers Against Drunk Driving is a very visible group whose main focus is to educate the public
about the harm caused by drunk drivers. A study was recently done that emphasized the problem we
all face with drinking and driving. Four hundred accidents that occurred on a Saturday night were
analyzed. Two items noted were the number of vehicles involved and whether alcohol played a role
in the accident. The numbers are shown below: $$\begin{array} { c | | c c c | c } & { \text { Number of Vehicles } } \\& { \text { Involved } } \\\text { Did alcohol play a role? } & \mathbf { 1 } & \mathbf { 2 } & \mathbf { 3 } & \text { Totals } \\ \text { Yes } & 50 & 100 & 20 & 170 \\\text { No } & 25 & 175 & 30 & 230 \\\hline \text { Totals } & 75 & 275 & 50 & 400\end{array}$$

-Referring to Scenario 4-1, what proportion of accidents involved alcohol and a single vehicle?

SCENARIO 4-4
Suppose that patrons of a restaurant were asked whether they preferred water or whether they
preferred soda. 70% said that they preferred water. 60% of the patrons were male. 80% of the males
preferred water.
Referring to Scenario 4-4, the probability a randomly selected patron prefers soda is __________.

SCENARIO 4-3
A survey is taken among customers of a fast-food restaurant to determine preference for hamburger or
chicken. Of 200 respondents selected, 75 were children and 125 were adults. 120 preferred hamburger
and 80 preferred chicken. 55 of the children preferred hamburger.
Referring to Scenario 4-3, the probability that a randomly selected individual is a child or prefers
hamburger is __________.

If P(A and B) = 0, then A and B must be mutually exclusive.

Suppose A and B are events where P(A) = 0.4, P(B) = 0.5, and P(A and B) = 0.1. Then P(A|B) =
__________.

SCENARIO 4-3
A survey is taken among customers of a fast-food restaurant to determine preference for hamburger or
chicken. Of 200 respondents selected, 75 were children and 125 were adults. 120 preferred hamburger
and 80 preferred chicken. 55 of the children preferred hamburger.
Referring to Scenario 4-3, the probability that a randomly selected individual is an adult or a child
is __________.

Suppose A and B are independent events where P(A) = 0.4 and P(B) = 0.5. Then P(A and B) =
__________.

SCENARIO 4-3
A survey is taken among customers of a fast-food restaurant to determine preference for hamburger or
chicken. Of 200 respondents selected, 75 were children and 125 were adults. 120 preferred hamburger
and 80 preferred chicken. 55 of the children preferred hamburger.
Referring to Scenario 4-3, the probability that a randomly selected individual is an adult is
__________.

SCENARIO 4-3
A survey is taken among customers of a fast-food restaurant to determine preference for hamburger or
chicken. Of 200 respondents selected, 75 were children and 125 were adults. 120 preferred hamburger
and 80 preferred chicken. 55 of the children preferred hamburger.
Referring to Scenario 4-3, assume we know the person is a child. The probability that this
individual prefers hamburger is __________.

Suppose A and B are events where P(A) = 0.4, P(B) = 0.5, and P(A and B) = 0.1. Then P(A or B)
= __________.

Suppose A and B are events where P(A) = 0.4, P(B) = 0.5, and P(A and B) = 0.1. Then P(B|A) =
__________.

SCENARIO 4-3
A survey is taken among customers of a fast-food restaurant to determine preference for hamburger or
chicken. Of 200 respondents selected, 75 were children and 125 were adults. 120 preferred hamburger
and 80 preferred chicken. 55 of the children preferred hamburger.
Referring to Scenario 4-3, the probability that a randomly selected individual is a child and
prefers chicken is __________.

SCENARIO 4-3
A survey is taken among customers of a fast-food restaurant to determine preference for hamburger or
chicken. Of 200 respondents selected, 75 were children and 125 were adults. 120 preferred hamburger
and 80 preferred chicken. 55 of the children preferred hamburger.
Referring to Scenario 4-3, the probability that a randomly selected individual is an adult and
prefers chicken is __________.

If P(A and B) = 0, then A and B must be collectively exhaustive.

Suppose A and B are independent events where P(A) = 0.4 and P(B) = 0.5. Then P(A or B) =
__________.

If P(A and B) = 1, then A and B must be collectively exhaustive.

If P(A or B) = 1.0, then A and B must be collectively exhaustive.

If P(A and B) = 1, then A and B must be mutually exclusive.

Suppose A and B are mutually exclusive events where P(A) = 0.4 and P(B) = 0.5. Then P(A or B)
= __________.

If P(A or B) = 1.0, then A and B must be mutually exclusive.

Suppose A and B are mutually exclusive events where P(A) = 0.4 and P(B) = 0.5. Then P(A and
B) = __________.