12KC Assessing Normality & Normal as Approximation to Binomial

A Both of the requirements are NOT met! The Normal Distribution cannot be used to approximate the Binomial Disribution.
n≥100 is a true statement.
nq≥5 is NOT a true statement.

B Both of the requirements are NOT met! The Normal Distribution cannot be used to approximate the Binomial Disribution.
n≥100 is NOT a true statement.
np≤10 is a true statement.

C np≤10 is NOT a true statement.
np≥5 is NOT a true statement.
Both of the requirements are NOT met! The Normal Distribution cannot be used to approximate the Binomial Disribution.

D np≥5 is a true statement.
Both of the requirements are met! The mean and standard deviation of the Binomial Distribution may be used for Normal Distribution calculations.
nq≥5 is a true statement.

Question #5

Acme’s widgets have a defect rate of 3%. When dealing with a 400-pack, may probabilities for the number of broken widgets be approximated/estimated using the Poisson Distribution? Why, or why not?

A np≤10 is NOT a true statement.
n≥100 is a true statement.
Both of the requirements are NOT met! The Poisson Distribution cannot be used to approximate the Binomial Disribution.

B Both of the requirements are met! The mean of the Binomial Distribution may be used for Poisson Distribution calculations.
np≤10 is a true statement
nq≥5 is NOT a true statement.

C np≥5 is NOT a true statement.
np≥5 is a true statement.
Both of the requirements are met! The mean of the Binomial Distribution may be used for Poisson Distribution calculations.

D nq≥5 is a true statement.
Both of the requirements are met! The mean of the Binomial Distribution may be used for Poisson Distribution calculations.
n≥100 is NOT a true statement.

Question #6

Acme’s widgets have a defect rate of 3%. Approximate/estimate the probability that 8 widgets are broken in a 200-pack using the Normal Distribution. (Express your answer as a decimal rounded to the nearest ten-thousandth.)

A 0.137

B 0.129

C 0.117

D 0.127

Question #7

Acme’s widgets have a defect rate of 3%. Approximate/estimate the probability that 8 widgets are broken in a 200-pack using the Poisson Distribution. (Express your answer as a decimal rounded to the nearest ten-thousandth.)

A 0.1055

B 0.1088

C 0.1033

D 0.1133

Question #8

Acme’s widgets have a defect rate of 3%. Find the probability that 8 widgets are broken in a 200-pack using the Binomial Distribution. (Express your answer as a decimal rounded to the nearest ten-thousandth.)

A 0.1043

B 0.1085

C 0.1033

D 0.1185

Question #9

Acme’s widgets have a defect rate of 3%. Find the standard deviation for the number of widgets that are broken in a 200-pack? (Round to the nearest ten-thousandth.)

A 2.4125

B 2.1125

C 3.4125

D 2.2122

Question #10

Acme’s widgets have a defect rate of 3%. When dealing with a 200-pack, may probabilities for the number of broken widgets be approximated/estimated using the Normal Distribution? Why, or why not?

A Both of the requirements are NOT met! The Normal Distribution cannot be used to approximate the Binomial Disribution.
n≥100 is a true statement.
n≥100 is NOT a true statement.

B Both of the requirements are NOT met! The Normal Distribution cannot be used to approximate the Binomial Disribution.
nq≥5 is NOT a true statement.
np≥5 is NOT a true statement.

C Both of the requirements are met! The mean and standard deviation of the Binomial Distribution may be used for Normal Distribution calculations.
nq≥5 is a true statement.
np≥5 is a true statement.

D n≥100 is a true statement.
np≤10 is NOT a true statement.
Both of the requirements are NOT met! The Normal Distribution cannot be used to approximate the Binomial Disribution.

Question #11

Acme’s widgets have a defect rate of 3%. When dealing with a 200-pack, may probabilities for the number of broken widgets be approximated/estimated using the Poisson Distribution? Why, or why not?

A np≤10 is a true statement.
n≥100 is a true statement.
Both of the requirements are met! The mean of the Binomial Distribution may be used for Poisson Distribution calculations.

B Both of the requirements are NOT met! The Poisson Distribution cannot be used to approximate the Binomial Disribution.
np≥5 is a true statement.
np≤10 is a true statement.

C np≥5 is NOT a true statement.
np≤10 is NOT a true statement.
Both of the requirements are NOT met! The Poisson Distribution cannot be used to approximate the Binomial Disribution.

D Both of the requirements are NOT met! The Poisson Distribution cannot be used to approximate the Binomial Disribution.
n≥100 is NOT a true statement.
nq≥5 is a true statement.

Question #12

Acme’s widgets have a defect rate of 3%. Would it be unusual to purchase a 12-pack containing 3 broken widgets?

A Purchasing a 12-pack containing 3 broken widget is NOT unusual because the probability of 3 or fewer successes is NOT 0.05 or less.

B Purchasing a 12-pack containing 3 broken widgets is unusual because the probability of 3 or more successes is NOT 0.05 or less.

C Purchasing a 12-pack containing 3 broken widgets is NOT unusual because the probability of 3 or more successes is 0.05 or less.

D Purchasing a 12-pack containing 3 broken widget is unusual because the z-score of 3 is NOT between -2 and 2.

E Purchasing a 12-pack containing 3 broken widgets is unusual because the probability of 3 or more successes is 0.05 or less.

F Purchasing a 12-pack containing 3 broken widget is unusual because the probability of 3 or fewer successes is 0.05 or less.

Question #13

Acme’s widgets have a defect rate of 3%. Find the standard deviation for the number of widgets that are broken in a 12-pack? (Round to the nearest ten-thousandth.)

A 0.5627

B 0.5909

C 0.5819

D 0.4809

Question #14

Acme’s widgets have a defect rate of 3%. Would 3 broken widgets in a 12-pack be significantly high?

A 3 broken widgets in a 12-pack would NOT be significantly high because the probability of 3 or fewer successes is 0.05 or less.

B 3 broken widgets in a 12-pack would NOT be significantly high because the probability of 3 or more successes is NOT 0.05 or less.

C 3 broken widgets in a 12-pack would be significantly high because the z-score of 3 is NOT between -2 and 2.

D 3 broken widgets in a 12-pack would be significantly high because the probability of 3 or more successes is NOT 0.05 or less.

E 3 broken widgets in a 12-pack would NOT be significantly high because the z-score of 3 is NOT between -2 and 2.

F 3 broken widgets in a 12-pack would be significantly high because the probability of 3 or more successes is 0.05 or less.

Question #15

Acme’s widgets have a defect rate of 3%. What is the probability that more than 2 widgets are broken in a 12-pack? (Express your answer as a decimal rounded to the nearest ten-thousandth.)

A 0.0036

B 0.0044

C 0.0048

D 0.0038

Question #16

Acme’s widgets have a defect rate of 3%. Find the probability that 4 widgets are broken in a 12-pack? (Express your answer as a decimal rounded to the nearest ten-thousandth.)

A 0.0001

B 0.0003

C 0.0002

D 0.0004

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12KC Assessing Normality & Normal as Approximation to Binomial

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