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Z-Scores
Z-Score: It is a measure of a the position specific value in a
data set relative to mean in terms of the standard deviation
units. It is sometimes called the Standard Score.
Value of 92 is 1.45
standard deviation units
above the mean
Value of 72 is 0.35
standard deviation units
below the mean
Section 2.5, Page 45
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Z Score Problems
2.50
Shelia and Joan competed in two events at a
track meet. In the long jump, Shelia’s jump was
0.5 meters above the mean of the group and
Joan’s jump was 0.3 meters beyond the mean.
The standard deviation was 0.25 meters.
In the 100 meter run Shelia’s time was 5
seconds faster than the mean and Joan’s time
was 8 seconds faster than the mean. The
standard deviation was 3 seconds.
Who had the best combined performance?
Why?
Problems, Page 52
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Normal Model
Values on the x-axis extend from -∞ to + ∞.
The total area under the curve equals 1.0.
The area above any interval on the x-axis equals the
percent of data values in the interval.
Section 6.1
3
Normal Models
Standard Normal Curve
μ = 0, σ = 1
(x  )2
f (x) 
e
2
2
 2

Section 6.1
4
Probabilities and Normal Curves
To demonstrate the process of finding probabilities
related to populations that can be described by a
normal curve, let’s consider IQ scores. IQ scores
are normally distributed with a mean of 100 and a
standard deviation of 16. If a person is picked at
random, what is the probability tat her IQ is between
100 and 115: that is, what is P(100<x<115)?
Section 6.3, Page 124
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Finding Areas with theTI-83
PRGM – NORMDIST
1 – ENTER
100 ENTER: Enters Lower Bound
115 ENTER: Enters Upper Bound
100 ENTER: Enters Mean
16 ENTER: Enters Standard Deviation
Displays results:
The area above the interval is .3257.
Therefore the probability of selecting a
person at random with an IQ between 100
and 115 is .3257 or 32.57%.
Section 6.3, Page 124
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Finding Areas with the TI-83
90 100
σ=16
Find P(x > 90)
PRGM – NORMDIST – ENTER
1 – ENTER
90 ENTER
2ND EE99 – ENTER: On the TI 83, 2nd E99 = ∞
100 – ENTER
16 – ENTER
Display:
P(x > 90) = .7340
Section 6.3, Page 125
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Problems
Problems, Page 133
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Problems
Problems, Page 133
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Standard Normal Curve
Z-Curve
z-axis
μ=0 σ=1
The standard normal curve or distribution is
simply a normal distribution with a mean of 0 and
a standard deviation of 1. The values on the
horizontal axis are z-values.
Before computers, all problems had to be
converted to a standard normal distribution and
then solved with tables in the book that relate the
z-values to the areas above the intervals.
Example: Find the area above the z-axis
bounded by -1.5<z<2.1
NORMDIST 1
LOWER BOUND = -1. 5
UPPER BOUND = 2.1
Mean = 0
STANDARD DEVIATION = 1
Answer: AREA = .9153
Section 6.2, Page 122
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Problems
Problems, Page 132
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Determine Data Values with TI-83
Suppose that in a large class, your instructor tells you
that you need to be in the top 10% of the class to get
an A. For a particular exam, the mean is 72 and the
standard deviation is 13. (Assume a normal
distribution) What grade is required for an A?
Top 10%
Area from the
left = 1-.10=.90
Area = .10
μ = 72, σ = 13
Score =
?
PRGM – NORMDIST – 2
.90 – ENTER
72 – ENTER
13 – ENTER
Display:
A test score of 88.66
or above is required to
be in the top 10%
Section 6.3, Page 125
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Problems
6.51 IQ scores are normally distributed with a
mean of 100 and a standard deviation of 16. Find
the following:
a. The 66th percentile.
b. The 80th percentile.
c. The minimum score required to be in the top
10%.
d. The minimum score to be in the top 25%.
6.52 Find the two z-scores that bound the middle
30% of the standard normal distribution.
Problems, Page 133
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