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Chapter 5.4, Problem 31P

a.

To determine

Explain the reason for a negative binomial distribution to be appropriate for a given random variable and define a formula for P(n) in the given context of application.

a.

Expert Solution
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Answer to Problem 31P

There are binomial trials with probability of success 0.80 and failure 0.20 with n as a random variable that represents a number of contacts needed to get 12th successful sale.

The formula for probability that Person S makes 12 successful sales is. P(n)=Cn1,11(0.80)12(0.20)n12_

Explanation of Solution

Calculation:

There are binomial trials with probability of success p=0.80 and failure as q=0.20.

Let n follow a negative binomial distribution that represents the number of contacts needed to get 12th sale.

Probability of success p=0.80

Probability of failure q=0.20

Number of successful sales k=12

Negative binomial probability:

The probability that kth success occurs on nth trial is given below:

P(n)=Cn1,k1pkqnk

Here, n is the number of trials in which kth  success occurs, k is the number of successes, p is the probability of success, and q is the probability of failure.

The formula for probability that Person S makes 12 successful sales is given below:

P(n)=Cn1,k1pkqnk         =Cn1,121(0.80)12(0.20)n12         =Cn1,11(0.80)12(0.20)n12

Thus, the formula for probability that Person S makes 12 successful sales is P(n)=Cn1,11(0.80)12(0.20)n12_.

b.

To determine

Calculate the given probabilities.

b.

Expert Solution
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Answer to Problem 31P

The probability that Person S needs 12 contacts to get bonus is 0.0687.

The probability that Person S needs 13 contacts to get bonus is 0.1649.

The probability that Person S needs 14 contacts to get bonus is 0.2144.

Explanation of Solution

Calculation:

The probability that Person S needs 12 contacts to get bonus is given below:

P(12)=C121,121(0.80)12(0.20)1212         =C11,11(0.80)12(0.20)0         =(11!11!0!)(0.80)12(0.20)0         =0.0687

Thus, the probability that Person S needs 12 contacts to get bonus is 0.0687.

The probability that Person S needs 13 contacts to get bonus is given below:

P(13)=C131,121(0.80)12(0.20)1312         =C12,11(0.80)12(0.20)1         =(12!11!1!)(0.80)12(0.20)1         =0.1649

Thus, the probability that Person S needs 13 contacts to get bonus is 0.1649.

The probability that Person S needs 14 contacts to get bonus is given below:

P(14)=C141,121(0.80)12(0.20)1412         =C13,11(0.80)12(0.20)2         =(13!11!2!)(0.80)12(0.20)2         =0.2144

Thus, the probability that Person S needs 14 contacts to get bonus is 0.2144.

c.

To determine

Calculate the probability that Person S will require 12 to 14 contacts to get bonus.

c.

Expert Solution
Check Mark

Answer to Problem 31P

The probability that Person S will require 12 to 14 contacts to get bonus is 0.4480.

Explanation of Solution

Calculation:

The probability that Person S will require 12 to 14 contacts to get bonus is calculated as follows:

P(12n14)=P(12)+P(13)+P(14)                       =C121,121(0.80)12(0.20)1212+C131,121(0.80)12(0.20)1312+C141,121(0.80)12(0.20)1412                       =0.0687+0.1649+0.2144                       =0.4480

Thus, the probability that Person S will require 12 to 14 contacts to get bonus is 0.4480.

d.

To determine

Calculate the probability that Person S will require more than 14 contacts to get bonus.

d.

Expert Solution
Check Mark

Answer to Problem 31P

The probability that Person S will require more than 14 contacts to get bonus is 0.5520.

Explanation of Solution

Calculation:

The probability that Person S will require more than 14 contacts to get bonus is calculated follows:

P(n>14)=1P(n14)               =1P(12n14)               =10.4480               =0.5520

Thus, the probability that Person S will require more than 14 contacts to get bonus is 0.5520.

e.

To determine

Calculate the expected value of n.

Calculate the standard deviation of n.

e.

Expert Solution
Check Mark

Answer to Problem 31P

The expected value of n.is 15.

The standard deviation of n is 1.94.

Explanation of Solution

Calculation:

The expected value of n is calculated as follows:

μ=kp   =120.80   =15

Thus, the expected value of n is 15.

The standard deviation of n is calculated as follows:

σ=kqp   =12×0.200.80   =1.94

Thus, the standard deviation of n is 1.94.

Interpretation:

The expected number of contacts that the twelfth sale will occur is 15 with a standard deviation of 1.94.

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Chapter 5 Solutions

Bundle: Understandable Statistics: Concepts And Methods, 12th + Jmp Printed Access Card For Peck's Statistics + Webassign Printed Access Card For ... And Methods, 12th Edition, Single-term

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