Deck 7: Random Variables and Discrete Probability Distributions

For a random variable X,E(X + 2)− 5 = E(X)− 3,where E refers to the expected value.

The Poisson probability distribution is a continuous probability distribution.

Given that X is a discrete random variable,then the laws of expected value and variance can be applied to show that E(X + 5)= E(X)+ 5,and V(X + 5)= V(X)+ 25.

For a random variable X,if V(cX)= 4V(X),where V refers to the variance,then c must be 2.

The length of time for which an apartment in a large complex remains vacant is a discrete random variable.

The time required to drive from New York to New Mexico is a discrete random variable.

A table,formula,or graph that shows all possible values a random variable can assume,together with their associated probabilities,is referred to as probability distribution.

The mean of a Poisson distribution,where μ is the average number of successes occurring in a specified interval,is μ.

The mean of a discrete probability distribution for X is the sum of all possible values of X,divided by the number of possible values of X.

The amount of milk consumed by a baby in a day is an example of a discrete random variable.

In a Poisson distribution,the mean and variance are equal.

Faculty rank (professor,associate professor,assistant professor,and lecturer)is an example of a discrete random variable.

The number of home insurance policy holders is an example of a discrete random variable

For a random variable X,V(X + 3)= V(X + 6),where V refers to the variance.

The Poisson random variable is a discrete random variable with infinitely many possible values.

The number of homeless people in Boston is an example of a discrete random variable.

Another name for the mean of a probability distribution is its expected value.

The number of accidents that occur at a busy intersection in one month is an example of a Poisson random variable.

A random variable is a function or rule that assigns a number to each outcome of an experiment.

In a Poisson distribution,the variance and standard deviation are equal.

The number of customers arriving at a department store in a 5-minute period has a Poisson distribution.

The largest value that a Poisson random variable X can have is n.

The number of customers making a purchase out of 30 randomly selected customers has a Poisson distribution.

In a Poisson distribution,the mean and standard deviation are equal.

The Poisson distribution is applied to events for which the probability of occurrence over a given span of time,space,or distance is very small.

A motorcycle insurance company evaluates many numerical variables about a person before deciding on an appropriate rate for motorcycle insurance.How long a person has been a licensed rider is an example of a(n)____________________ random variable.

The amount of time that a microcomputer is used per week is an example of a(n)____________________ random variable.

In a(n)____________________ experiment,the probability of a success in an interval is the same for all equal-sized intervals.

In a Poisson experiment,the probability of a success in an interval is ____________________ to the size of the interval.

The ____________________ of a Poisson distribution is the rate at which successes occur for a given period of time or interval of space.

A Poisson random variable is the number of successes that occur in a period of ____________________ or an interval of ____________________ in a Poisson experiment.

The dean of students conducted a survey on campus.Grade point average (GPA)is an example of a(n)____________________ random variable.

An auto insurance company evaluates many numerical variables about a person before deciding on an appropriate rate for automobile insurance.A person's age is an example of a(n)____________________ random variable.

A(n)____________________ random variable is one whose values are uncountable.

In Poisson experiment,the probability of more than one success in an interval approaches ____________________ as the interval becomes smaller.

A motorcycle insurance company evaluates many numerical variables about a person before deciding on an appropriate rate for motorcycle insurance.The distance a person rides in a year is an example of a(n)____________________ random variable.

The number of days that a microcomputer goes without a breakdown is an example of a(n)____________________ random variable.

An auto insurance company evaluates many numerical variables about a person before deciding on an appropriate rate for automobile insurance.The number of claims a person has made in the last 3 years is an example of a(n)____________________ random variable.

A(n)____________________ random variable is one whose values are countable.

In a Poisson experiment,the number of successes that occur in any interval of time is ____________________ of the number of success that occur in any other interval.

A motorcycle insurance company evaluates many numerical variables about a person before deciding on an appropriate rate for motorcycle insurance.The number of tickets a person has received in the last 3 years is an example of a(n)____________________ random variable.

Determine which of the following are not valid probability distributions,and explain why not.

The possible values of a Poisson random variable start at ____________________.

Number of Motorcycles
The probability distribution of a discrete random variable X is shown below,where X represents the number of motorcycles owned by a family. ​ ​
{Number of Motorcycles Narrative} Find the standard deviation of X.

Number of Horses ​
The random variable X represents the number of horses per family in a rural area in Iowa,with the probability distribution: p(x)= 0.05x,x = 2,3,4,5,or 6. ​ ​
{Number of Horses Narrative} Find the expected number of horses per family.

Blackjack
The probability distribution of a random variable X is shown below,where X represents the amount of money (in $1,000s)gained or lost in a particular game of Blackjack. ​ ​
{Blackjack Narrative} Find the following probabilities:
a.P(X ≤ 0)
b.P(X > 3)
c.P(0 ≤ X ≤ 4)
d.P(X = 5)

Gym Visits
Let X represent the number of times a student visits a gym in a one month period.Assume that the probability distribution of X is as follows: ​ ​
{Gym Visits Narrative} Find the mean μ and the standard deviation σ of this distribution.

Gym Visits
Let X represent the number of times a student visits a gym in a one month period.Assume that the probability distribution of X is as follows: ​ ​
{Gym Visits Narrative} What is the probability that the student visits the gym at least once in a month?

Number of Horses ​
The random variable X represents the number of horses per family in a rural area in Iowa,with the probability distribution: p(x)= 0.05x,x = 2,3,4,5,or 6. ​ ​
{Number of Horses Narrative} Find the variance and standard deviation of X.

A Poisson random variable is a(n)____________________ random variable.

Number of Motorcycles
The probability distribution of a discrete random variable X is shown below,where X represents the number of motorcycles owned by a family. ​ ​
{Number of Motorcycles Narrative} Find the expected value of X.

In the Poisson distribution,the ____________________ is equal to the variance.

In the Poisson distribution,the mean is equal to the ____________________.

Number of Motorcycles
The probability distribution of a discrete random variable X is shown below,where X represents the number of motorcycles owned by a family. ​ ​
{Number of Motorcycles Narrative} Find the following probabilities:
a.P(X > 1)
b.P(X ≤ 2)
c.P(1 ≤ X ≤ 2)
d.P(0 < X < 1)
e.P(1 ≤ X < 3)

Number of Motorcycles
The probability distribution of a discrete random variable X is shown below,where X represents the number of motorcycles owned by a family. ​ ​
{Number of Motorcycles Narrative} Apply the laws of expected value to find the following:
a.E(X²)
b.E(2X² + 5)
c.E(X − 2)²

Number of Horses ​
The random variable X represents the number of horses per family in a rural area in Iowa,with the probability distribution: p(x)= 0.05x,x = 2,3,4,5,or 6. ​ ​
{Number of Horses Narrative} Find the following probabilities:
a.P(X ≥ 4)
b.P(X > 4)
c.P(3 ≤ X ≤ 5)
d.P(2 < X < 4)
e.P(X = 4.5)

Number of Horses ​
The random variable X represents the number of horses per family in a rural area in Iowa,with the probability distribution: p(x)= 0.05x,x = 2,3,4,5,or 6. ​ ​
{Number of Horses Narrative} Express the probability distribution in tabular form.

Gym Visits
Let X represent the number of times a student visits a gym in a one month period.Assume that the probability distribution of X is as follows: ​ ​
{Gym Visits Narrative} Find the mean and the standard deviation of Y = 2X − 1.

Number of Motorcycles
The probability distribution of a discrete random variable X is shown below,where X represents the number of motorcycles owned by a family. ​ ​
{Number of Motorcycles Narrative} Apply the laws of expected value and variance to find the following:
a.V(3X)
b.V(3X − 2)
c.V(3)
d.V(3X)− 2

Blackjack The probability distribution of a random variable X is shown below,where X represents the amount of money (in $1,000s)gained or lost in a particular game of Blackjack. ​ ​
{Blackjack Narrative} Find the following values and indicate their units.
a.E(X)
b.V(X)
c.Standard deviation of X

For each of the following random variables,indicate whether the variable is discrete or continuous,and specify the possible values that it can assume.
a.X = the number of traffic accidents in Albuquerque on a given day.
b.X = the amount of weight lost in a month by a randomly selected dieter.
c.X = the average number of children per family in a random sample of 175 families.
d.X = the number of households out of 10 surveyed that own a convection oven.
e.X = the time in minutes required to obtain service in a restaurant.