Find the standardized variable Z if X has
Mean 16 and standard deviation 7.
Your answer:
Z = (X – ) /
Find the standardized variable Z if X has
Mean 58 and standard deviation 9.
Your answer:
Z = (X – ) /
Find the standardized variable Z if X has
Mean 151 and variance 4.
Your answer:
Z = (X – ) /
Find the area under the standard normal curve to the right of
z = -0.95
Round your answer to four decimal places.
Your answer:
P [Z > -0.95] =
the absolute tolerance is +/-0.0001
Find the area under the standard normal curve to the right of:
z = 0.40
Round your answer to four decimal places.
Your answer:
P [Z > 0.40] =
the absolute tolerance is +/-0.0001
Find the area under the standard normal curve over the interval z = −0.59 to z = 0.59. Compute probabilities using the standard normal table in Appendix B (Table 3). Round the answer to four decimal places.
Area = .
the absolute tolerance is +/-0.0015
Find the area under the standard normal curve over the interval z = 0.36 to z = 2.29. Compute probabilities using the standard normal table in Appendix B (Table 3). Round the answer to four decimal places.
Area = .
the absolute tolerance is +/-0.0001
For a standard normal random variable Z, find P[− 1.6 < z < 2.21]. Compute probabilities using the standard normal table in Appendix B (Table 3). Round the answer to four decimal places.
P[− 1.6 < z < 2.21] = .
Scores on a certain nationwide college entrance examination follow a normal distribution with a mean of 450 and a standard deviation of 100. Find the probability that a student will score:
Over 570.0.
Round your answer to four decimal places.
Your answer.
the absolute tolerance is +/-0.0001
Scores on a certain nationwide college entrance examination follow a normal distribution with a mean of 600 and a standard deviation of 100. Find the probability that a student will score:
Between 450 and 740.0.
Round your answer to four decimal places.
Your answer.
the absolute tolerance is +/-0.0001
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A population has mean 58 and standard deviation 17. Calculate for a random sample of size 14.
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A population has mean 62 and standard deviation 14. Calculate for a random sample of size 5. (Round to one decimal place.)
A population has standard deviation 7. What is the standard deviation of for a random sample of size (Round to one decimal place.)
A population has standard deviation 6. What is the standard deviation of for a random sample of size (Round to one decimal place.)
Suppose the weights of packages of lettuce coming off a packaging line have a normal distribution with mean 8.7 ounces and standard deviation 0.2 ounce. If every package is labeled 8.3 ounces, what proportion of the packages weigh less than the labeled amount? % (Round to the whole.)
Suppose the weights of the contents of cans of mixed nuts have a normal distribution with mean 32.8 ounces and standard deviation 0.4 ounce.
If two packages are randomly selected, what is the probability that the average weight is less than 32 ounces?
Round to one decimal place.
%
the tolerance is +/-2%
The number of complaints per day, X, received by a cable TV distributor has the probability distribution
|
X |
0 |
1 |
2 |
3 |
|
f(X) |
0.2 |
0.3 |
0.1 |
0.4 |
Find the expected number of complaints per day.
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