Session:6 The Normal Distribution
Practice
Introductory Business Statistics | Leadership Development – Micro-Learning Session
Rice University 2020 | Michael Laverty, Colorado State University Global Chris Littel, North Carolina State University| https://openstax.org/details/books/introductory-business-statistics
6.1 The Standard Normal Distribution
3.
X ~ N(1, 2)
σ = _______
4.
A company manufactures rubber balls. The mean diameter of a ball is 12 cm with a standard deviation of 0.2 cm. Define the random variable X in words. X = ______________.
5.
X ~ N(–4, 1)
What is the median?
6.
X ~ N(3, 5)
σ = _______
7.
X ~ N(–2, 1)
μ = _______
8.
What does a z-score measure?
9.
What does standardizing a normal distribution do to the mean?
10.
Is X ~ N(0, 1) a standardized normal distribution? Why or why not?
11.
What is the z-score of x = 12, if it is two standard deviations to the right of the mean?
12.
What is the z-score of x = 9, if it is 1.5 standard deviations to the left of the mean?
13.
What is the z-score of x = –2, if it is 2.78 standard deviations to the right of the mean?
14.
What is the z-score of x = 7, if it is 0.133 standard deviations to the left of the mean?
15.
Suppose X ~ N(2, 6). What value of x has a z-score of three?
16.
Suppose X ~ N(8, 1). What value of x has a z-score of –2.25?
17.
Suppose X ~ N(9, 5). What value of x has a z-score of –0.5?
18.
Suppose X ~ N(2, 3). What value of x has a z-score of –0.67?
19.
Suppose X ~ N(4, 2). What value of x is 1.5 standard deviations to the left of the mean?
20.
Suppose X ~ N(4, 2). What value of x is two standard deviations to the right of the mean?
21.
Suppose X ~ N(8, 9). What value of x is 0.67 standard deviations to the left of the mean?
22.
Suppose X ~ N(–1, 2). What is the z-score of x = 2?
23.
Suppose X ~ N(12, 6). What is the z-score of x = 2?
24.
Suppose X ~ N(9, 3). What is the z-score of x = 9?
25.
Suppose a normal distribution has a mean of six and a standard deviation of 1.5. What is the z-score of x = 5.5?
26.
In a normal distribution, x = 5 and z = –1.25. This tells you that x = 5 is ____ standard deviations to the ____ (right or left) of the mean.
27.
In a normal distribution, x = 3 and z = 0.67. This tells you that x = 3 is ____ standard deviations to the ____ (right or left) of the mean.
28.
In a normal distribution, x = –2 and z = 6. This tells you that x = –2 is ____ standard deviations to the ____ (right or left) of the mean.
34.
Suppose X ~ N(15, 3). Between what x values does 68.27% of the data lie? The range of x values is centered at the mean of the distribution (i.e., 15).
35.
Suppose X ~ N(–3, 1). Between what x values does 95.45% of the data lie? The range of x values is centered at the mean of the distribution(i.e., –3).
36.
Suppose X ~ N(–3, 1). Between what x values does 34.14% of the data lie?
Use the following information to answer the next two exercises: The life of Sunshine CD players is normally distributed with mean of 4.1 years and a standard deviation of 1.3 years. A CD player is guaranteed for three years. We are interested in the length of time a CD player lasts.
41.
Define the random variable X in words. X = _______________.
42.
X ~ _____(_____,_____)
6.3 Estimating the Binomial with the Normal Distribution
43. How would you represent the area to the left of one in a probability statement?
44.
What is the area to the right of one?
45.
Is P(x < 1) equal to P(x ≤ 1)? Why?
46. How would you represent the area to the left of three in a probability statement?
47. What is the area to the right of three?
48.
If the area to the left of x in a normal distribution is 0.123, what is the area to the right of x?
Use the following information to answer the next four exercises:
X ~ N(54, 8)
50.
Find the probability that x > 56.
51.
Find the probability that x < 30.
52.
X ~ N(6, 2)
Find the probability that x is between three and nine.
53.
X ~ N(–3, 4)
Find the probability that x is between one and four.
54.
X ~ N(4, 5)
Find the maximum of x in the bottom quartile.
55. Use the following information to answer the next three exercise: The life of Sunshine CD players is normally distributed with a mean of 4.1 years and a standard deviation of 1.3 years. A CD player is guaranteed for three years. We are interested in the length of time a CD player lasts. Find the probability that a CD player will break down during the guarantee period.
- Sketch the situation. Label and scale the axes. Shade the region corresponding to the probability.
Figure 6.17
- P(0 < x < ____________) = ___________ (Use zero for the minimum value of x.)
56. Find the probability that a CD player will last between 2.8 and six years.
- Sketch the situation. Label and scale the axes. Shade the region corresponding to the probability.
Figure 6.18
- P(__________ < x < __________) = __________