Z-Scores & Percentiles
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Transcript Z-Scores & Percentiles
20, 22, 23, 24, 24, 25, 25, 27, 35
Are there any outliers?
Draw a skeleton boxplot.
Draw a modified boxplot.
Boys vs Girls Boxplot
Measures of
Position
Percentiles
Z-scores
The following represents my results
when playing an online sudoku
game…at www.websudoku.com.
0 min
30 min
Introduction
A student gets a test back with a score of 78 on
it.
A 10th-grader scores 46 on the PSAT Writing
test
Isolated numbers don’t always provide enough
information…what we want to know is where we
stand.
Where Do I Stand?
Let’s make a dotplot of our heights from 58
to 78 inches.
How many people in the class have
heights less than you?
What percent of the dents in the class
have heights less than yours?
This
is your percentile in the distribution of
heights
Finishing….
Calculate the mean and standard deviation.
Where does your height fall in relation to the
mean: above or below?
How many standard deviations above or below
the mean is it?
This
is the z-score for your height.
Let’s discuss
What would happen to the class’s height
distribution if you converted each data value
from inches to centimeters. (2.54cm = 1 in)
How would this change of units affect the
measures of center, spread, and location
(percentile & z-score) that you calculated.
National Center for Health
Statistics
Look at Clinical Growth Charts at
www.cdc.gov/nchs
Percentiles
Value such that r% of the observations in
the data set fall at or below that value.
If you are at the 75th percentile, then 75%
of the students had heights less than
yours.
Test scores on last AP Test. Jenny made
an 86. How did she perform relative to her
classmates?
6
7
7
8
8
9
7
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03
Her score was greater than
21 of the 25 observations.
Since 21 of the 25, or 84%,
of the scores are below
hers, Jenny is at the 84th
percentile in the class’s test
score distribution.
Find the percentiles for
the following students….
6
7
7
8
8
9
Mary, who earned a 74.
Two students who earned scores of 80.
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5777899
00123334
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03
Cumulative Relative Frequency Table:
Age of First 44 Presidents When They Were Inaugurated
Age
Frequency
Relative
frequency
Cumulative
frequency
Cumulative
relative frequency
40-44
2
2/44 = 4.5%
2
2/44 =
4.5%
45-49
7
7/44 = 15.9%
9
9/44 = 20.5%
50-54
13
13/44 = 29.5%
22
22/44 = 50.0%
55-59
12
12/44 = 34%
34
34/44 = 77.3%
60-64
7
7/44 = 15.9%
41
41/44 = 93.2%
65-69
3
3/44 = 6.8%
44
44/44 = 100%
Cumulative Relative Frequency
Graph:
Cumulative relative frequency (%)
100
80
60
40
20
0
40
45
50 at inauguration
55 60 65
Age
70
Interpreting…
When does it slow down?
Why?
100
Cumulative relative frequency (%)
Why does it get very steep
beginning at age 50?
80
60
What percent were
inaugurated before age 70?
40
20
What’s the IQR?
0
40
45
50 at inauguration
55 60 65
Age
70
Obama was 47….
Interpreting Cumulative Relative Frequency Graphs
11
47
58
Describing Location in a
Distribution
Use the graph from page 88 to answer
the following questions.
Was Barack Obama, who was
inaugurated at age 47, unusually
young?
65 and interpret the 65th
Estimate
percentile of the distribution
What is the relationship between
percentiles and quartiles?
Z-Score – (standardized score)
It represents the number of deviations
from the mean.
If it’s positive, then it’s above the mean.
If it’s negative, then it’s below the mean.
It standardized measurements since it’s in
terms of st. deviation.
Discovery:
Mean = 90
St. dev = 10
Find z score for
80
95
73
Z-Score Formula
x mean
z
standard deviation
Compare…using z-score.
History Test
Math Test
Mean = 92
Mean = 80
St. Dev = 3
St. Dev = 5
My Score = 95
My Score = 90
Compare
Math: mean = 70
x = 62
s=6
English: mean = 80
x = 72
s=3
Be Careful!
Being better is relative to the situation.
What if I wanted to compare race times?
Find the following percentiles.
X
3
Rel.
Freq
0.05
1. 40th percentile?
C.F.
0.05
4
5
6
0.12
0.23
0.08
0.17
0.4
0.45
7
8
0.02
0.18
0.5
0.68
9
10
0.24
0.08
0.92
1
2. 17th percentile?
3. 70th percentile?
4. 25th percentile?
Homework
Worksheet