Deck 5: Some Important Discrete Probability Distributions

Instruction 5.1
The following table contains the probability distribution for X = the number of retransmissions necessary to successfully transmit a 1024K data package through a double satellite media.
$$\begin{array} { | c | c | c | c | c | } \hline X & 0 & 1 & 2 & 3 \\\hline p ( X ) & 0.35 & 0.35 & 0.25 & 0.05 \\\hline\end{array}$$

-Referring to Instruction 5.1,the mean or expected value for the number of retransmissions is ______.

Instruction 5.2
The following table contains the probability distribution for X = the number of traffic accidents reported in a day in Perth.
$$\begin{array} { | c | c | c | c | c | c | c | } \hline X & 0 & 1 & 2 & 3 & 4 & 5 \\\hline & 0.1 & 0.2 & 0.4 & 0.1 & 0.0 & 0.0 \\P ( X ) & 0 & 0 & 5 & 5 & 5 & 5 \\\hline\end{array}$$

-Referring to Instruction 5.2,the probability of three accidents is ______.

The standard deviation of a discrete random variable is the square root of the______

Instruction 5.2
The following table contains the probability distribution for X = the number of traffic accidents reported in a day in Perth.
$$\begin{array} { | c | c | c | c | c | c | c | } \hline X & 0 & 1 & 2 & 3 & 4 & 5 \\\hline & 0.1 & 0.2 & 0.4 & 0.1 & 0.0 & 0.0 \\P ( X ) & 0 & 0 & 5 & 5 & 5 & 5 \\\hline\end{array}$$

-Referring to Instruction 5.2,the variance of the number of accidents is ______

Numerical variables are classified as either discrete or continuous.

The variance of a discrete random variable is directly related to the standard deviation.

Instruction 5.2
The following table contains the probability distribution for X = the number of traffic accidents reported in a day in Perth.
$$\begin{array} { | c | c | c | c | c | c | c | } \hline X & 0 & 1 & 2 & 3 & 4 & 5 \\\hline & 0.1 & 0.2 & 0.4 & 0.1 & 0.0 & 0.0 \\P ( X ) & 0 & 0 & 5 & 5 & 5 & 5 \\\hline\end{array}$$

-Referring to Instruction 5.2,the mean or expected value of the number of accidents is ______.

A probability distribution for a discrete random variable is a mutually exclusive list of all possible numerical outcomes of the random variable with the probability of occurrence associated with each outcome.

For a probability distribution for a discrete random variable,the sum of the probabilities must equal 1.

Instruction 5.2
The following table contains the probability distribution for X = the number of traffic accidents reported in a day in Perth.
$$\begin{array} { | c | c | c | c | c | c | c | } \hline X & 0 & 1 & 2 & 3 & 4 & 5 \\\hline & 0.1 & 0.2 & 0.4 & 0.1 & 0.0 & 0.0 \\P ( X ) & 0 & 0 & 5 & 5 & 5 & 5 \\\hline\end{array}$$

-Referring to Instruction 5.2,the probability of at least one accident is ______.

Instruction 5.1
The following table contains the probability distribution for X = the number of retransmissions necessary to successfully transmit a 1024K data package through a double satellite media.
$$\begin{array} { | c | c | c | c | c | } \hline X & 0 & 1 & 2 & 3 \\\hline p ( X ) & 0.35 & 0.35 & 0.25 & 0.05 \\\hline\end{array}$$

-Referring to Instruction 5.1,the standard deviation of the number of retransmissions is ______.

Max wants to know how many pieces of mail he receives in 1 year.After recording the pieces of mail he receives every day for an entire year,Max calculates the total.The total number of pieces of mail he receives is a ______ variable.

Instruction 5.1
The following table contains the probability distribution for X = the number of retransmissions necessary to successfully transmit a 1024K data package through a double satellite media.
$$\begin{array} { | c | c | c | c | c | } \hline X & 0 & 1 & 2 & 3 \\\hline p ( X ) & 0.35 & 0.35 & 0.25 & 0.05 \\\hline\end{array}$$

-Referring to Instruction 5.1,the probability of no retransmissions is ______.

Instruction 5.2
The following table contains the probability distribution for X = the number of traffic accidents reported in a day in Perth.
$$\begin{array} { | c | c | c | c | c | c | c | } \hline X & 0 & 1 & 2 & 3 & 4 & 5 \\\hline & 0.1 & 0.2 & 0.4 & 0.1 & 0.0 & 0.0 \\P ( X ) & 0 & 0 & 5 & 5 & 5 & 5 \\\hline\end{array}$$

-Referring to Instruction 5.2,the standard deviation of the number of accidents is ______

A continuous variable has an outcome that arises from a counting process rather than a measuring process.

Instruction 5.1
The following table contains the probability distribution for X = the number of retransmissions necessary to successfully transmit a 1024K data package through a double satellite media.
$$\begin{array} { | c | c | c | c | c | } \hline X & 0 & 1 & 2 & 3 \\\hline p ( X ) & 0.35 & 0.35 & 0.25 & 0.05 \\\hline\end{array}$$

-Referring to Instruction 5.1,the probability of at least one retransmission is ______

Instruction 5.1
The following table contains the probability distribution for X = the number of retransmissions necessary to successfully transmit a 1024K data package through a double satellite media.
$$\begin{array} { | c | c | c | c | c | } \hline X & 0 & 1 & 2 & 3 \\\hline p ( X ) & 0.35 & 0.35 & 0.25 & 0.05 \\\hline\end{array}$$

-Referring to Instruction 5.1,the variance for the number of retransmissions is ______.

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,what is the variance of the gain in value for the house in neighbourhood A?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,what is the standard deviation of the value gain for the house in neighbourhood A?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,if you can invest 90% of your money on the house in neighbourhood A and the remaining on the house in neighbourhood B,what is the portfolio risk of your investment?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,if you can invest 70% of your money on the house in neighbourhood A and the remaining on the house in neighbourhood B,what is the portfolio expected return of your investment?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,what is the expected value gain for the house in neighbourhood A?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,what is the expected value gain for the house in neighbourhood B?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,what is the expected value gain if you invest in both houses?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,if you can invest 30% of your money on the house in neighbourhood A and the remaining on the house in neighbourhood B,what is the portfolio risk of your investment?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,if you can invest 90% of your money on the house in neighbourhood A and the remaining on the house in neighbourhood B,what is the portfolio expected return of your investment?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,what is the total standard deviation of value gain if you invest in both houses?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,if you can invest half of your money on the house in neighbourhood A and the remaining on the house in neighbourhood B,what is the portfolio expected return of your investment?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,what is the standard deviation of the value gain for the house in neighbourhood B?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,if your investment preference is to maximise your expected return while exposing yourself to the minimal amount of risk,will you choose a portfolio that will consist of 10%,30%,50%,70% or 90% of your money on the house in neighbourhood A and the remaining on the house in neighbourhood B?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,if you can invest 30% of your money on the house in neighbourhood A and the remaining on the house in neighbourhood B,what is the portfolio expected return of your investment?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,if you can invest 10% of your money on the house in neighbourhood A and the remaining on the house in neighbourhood B,what is the portfolio risk of your investment?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,what is the variance of the gain in value for the house in neighbourhood B?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,if you can invest half of your money on the house in neighbourhood A and the remaining on the house in neighbourhood B,what is the portfolio risk of your investment?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,if you can invest 70% of your money on the house in neighbourhood A and the remaining on the house in neighbourhood B,what is the portfolio risk of your investment?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,what is the total variance of value gain if you invest in both houses?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,if you can invest 10% of your money on the house in neighbourhood A and the remaining on the house in neighbourhood B,what is the portfolio expected return of your investment?

If p remains constant in a binomial distribution,an increase in n will not change the mean.

The number of males selected in a sample of 5 students taken without replacement from a class of 9 females and 18 males has a binomial distribution.

If the covariance between two investments is zero,the variance of the sum of the two investments will be equal to the sum of the variances of the investments.

Suppose that a judge's decisions follow a binomial distribution and that his verdict is correct 90% of the time.In his next 10 decisions,the probability that he makes fewer than 2 incorrect verdicts is 0.736.

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,what is the covariance of the two houses?

The diameters of 10 randomly selected bolts have a binomial distribution.

The covariance between two investments is equal to the sum of the variances of the investments.

If p remains constant in a binomial distribution,an increase in n will increase the variance.

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,if your investment preference is to maximise your expected return and not worry at all about the risk that you have to take,will you choose a portfolio that will consist of 10%,30%,50%,70% or 90% of your money on the house in neighbourhood A and the remaining on the house in neighbourhood B?

Instruction 5.3
There are two houses with almost identical characteristics available for investment in two different neighbourhoods with drastically different demographic composition. The anticipated gain in value when the houses are sold in 10 years has the following probability distribution:
Returns
$$\begin{array} { | c | c | c | } \hline \text { Probability } & \text { Neighbourhood A } & \text { Neighbourhood B } \\\hline 0.25 & - \$ 22,500 & \$ 30,500 \\\hline 0.40 & \$ 10,000 & \$ 25,000 \\\hline 0.35 & \$ 40,500 & \$ 10,500 \\\hline\end{array}$$

-Referring to Instruction 5.3,if your investment preference is to minimise the amount of risk that you have to take and do not care at all about the expected return,will you choose a portfolio that will consist of 10%,30%,50%,70% or 90% of your money on the house in neighbourhood A and the remaining on the house in neighbourhood B?

The variance of the sum of two investments will be equal to the sum of the variances of the two investments plus twice the covariance between the investments.

The expected return of a two-asset portfolio is equal to the product of the weight assigned to the first asset and the expected return of the first asset plus the product of the weight assigned to the second asset and the expected return of the second asset.

A covariance of zero shows that two variables X and Y are ______.

The expected return of the sum of two investments will be equal to the sum of the expected returns of the two investments plus twice the covariance between the investments.

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

The variance of the sum of two investments will be equal to the sum of the variances of the two investments when the covariance between the investments is zero.

Instruction 5.4
The probability that a particular type of smoke alarm will function properly and sound an alarm in the presence of smoke is 0.8. You have two such alarms in your home and they operate independently.

-Referring to Instruction 5.4,the probability that both sound an alarm in the presence of smoke is ______

Instruction 5.5
A certain type of new business succeeds 60% of the time. Suppose that three such businesses open (where they do not compete with each other, so it is reasonable to believe that their relative successes would be independent).

-Referring to Instruction 5.5,the probability that all three businesses succeed is______

Instruction 5.4
The probability that a particular type of smoke alarm will function properly and sound an alarm in the presence of smoke is 0.8. You have two such alarms in your home and they operate independently.

-Referring to Instruction 5.4,the probability that neither sounds an alarm in the presence of smoke is ______

Instruction 5.4
The probability that a particular type of smoke alarm will function properly and sound an alarm in the presence of smoke is 0.8. You have two such alarms in your home and they operate independently.
Referring to Instruction 5.4,which distribution would you use to determine the probability that all the smoke alarms will function properly in case of a fire?

Instruction 5.4
The probability that a particular type of smoke alarm will function properly and sound an alarm in the presence of smoke is 0.8. You have two such alarms in your home and they operate independently.

-Referring to Instruction 5.4,the probability that at least one sounds an alarm in the presence of smoke is ______