FINAL EXAM AND HOMEWORK7
Name _______________________________________
MBA 501 Math & Stats for Business
Week 14 In-class Assignment
Instructions
1. This assignment is to be done individually . This is not a group assignment.
1. The In-class assignment is due in the end of the class.
1. Only explained and detailed answers will be accepted.
1. Use the back of the page for calculations
1. A normal distribution of scores has a standard deviation of 10. Find the z-scores corresponding to each of the following values: ( 1 Point Each )
a) A score that is 20 points above the mean.
b) A score that is 10 points below the mean.
c) A score that is 15 points above the mean.
d) A score that is 30 points below the mean.
2. For the numbers below, find the area between the mean and the z-score: ( 1 Point Each )
a) z = 1.17
b) z = -1.37
3. For a normal distribution, find the z-score that separates the distribution as follows: ( 1 Point Each )
a) Separate the highest 30% from the rest of the distribution.
b) Separate the lowest 40% from the rest of the distribution.
c) Separate the highest 75% from the rest of the distribution.
4. Pat and Chris both took a spatial abilities test (mean = 80, std. dev. = 8). Pat scores a 76 and Chris scored a 94. What percent of individuals would score between Pat and Chris? ( 2 Points )
5. IQ scores have a mean of 100 and a standard deviation of 16. Albert Einstein reportedly had an IQ of 160. ( 1 Point Each )
a) What is the difference between Einstein’ IQ and the mean?
b) How many standard deviations is that?
c) Convert Einstein’s IQ score to a z score.
d) If we consider “usual IQ scores to be those that convert z scores between -2 and 2, is Einstein’s IQ usual or unusual?
6. A state department of corrections has a policy whereby it accepts as correctional officers only those who score in the top 5 % of a qualifying exam. ( 5 Points )
The mean of this test is 80.
Standard deviation is 10.
a) Would a person with a raw score of 95 be accepted? ( Hint: Calculate a Z score: score – mean/st.dev. = )
b) Given a normal distribution of raw scores with a mean of 60 and a standard deviation of 8, what proportion of cases fall:
a) between a raw score of 50 and 80?
b) between a raw score of 48 and 57?