Title: Stat 281: Ch' 2Presenting Data
1Stat 281 Ch. 2--Presenting Data
- An engineer, consultant and statistician were
driving down a steep mountain road. Suddenly, the
brakes failed and the car careened down the road
out of control. But half way down, the driver
somehow managed to stop the car by running it
against the embankment, narrowly avoiding going
over a very steep cliff. They all got out,
shaken, but otherwise unharmed. - The consultant said "To fix this problem we need
to organize a committee, have meetings, write
several interim reports and develop a solution
through a continuous improvement process." - The engineer said "No! That would take too long,
and besides that method has never really worked.
I have my trusty penknife here and will take
apart the brake system, isolate the problem and
correct it." - The statistician said "No - you're both wrong!
Let's all push the car back up the hill and see
if it happens again. We only have a sample size
of 1 here!!"
2Fizzy Cola Sales(Showing first 8 of 50)
3The Goal
- Display data in ways that elucidate the
information contained in them - Raw Data actually contains all the information
available, but it may not be easy to understand - Its not so much the information available that
countsits the information you get out!
4Ranked Fizzy Cola Sales
5Viewing Data Directly
- Ranked Data (aka an Array)
- Still contains all the information
- Can quickly see range (max and min)
- May also easily determine median, quartiles, etc.
- Stem and Leaf
- Arranges ranked data into chart-like form
6Fizzy Cola Stem Leaf
7More Complex Stem Leaf(MiniTab Style)
- Stem-and-Leaf of C1 N16
- Leaf Unit0.010
- 1 59 7
- 4 60 148
- (5) 61 02669
- 7 62 0247
- 3 63 58
- 1 64 3
8Dot Plot for Fizzy Cola Sales
- Dot plots display vertically stacked dots for
each data value. - They tend to bring out any clustering behavior
in the data. - Stem Leaf and Dot Plots begin to give us a
picture of the Distribution of Data.
9Summarized Data
- Frequency Tables
- Grouped or ungrouped
- Frequency Distribution
- Relative Frequency Distribution
- Bar Graphs
- Histogram (Numeric Data Only)
- Pie Charts
- Often used for Categorical Data
10Fizzy Cola Frequency Table
11Histogram of Fizzy Cola Sales
12Constructing a Histogram
- 1. Identify the high (H) and low (L) scores.
Find the range. Range H - L. - 2. Select a number of classes and a class width
so that the product is a bit larger than the
range. - 3. Pick a starting point a little smaller than L.
Count from L by the width to obtain the class
boundaries. Observations that fall on class
boundaries are placed into the class interval to
the right. - Note
- 1. The class width is the difference between the
upper- and lower-class boundaries. - 2. There is no best choice for class widths,
number of classes, or starting points.
13Terms Used With Histograms
- Symmetrical The sides of the distribution are
mirror images. There is a line of symmetry. - Uniform (rectangular) Every value appears with
equal frequency. - Skewed One tail is stretched out longer than the
other. The direction of skewness is on the side
of the longer tail (Positively vs. negatively
skewed). - J-shaped There is no tail on the side of the
class with the highest frequency. - Bimodal The two largest classes are separated by
one or more classes. Often implies two
populations are sampled. - Normal The distribution is symmetric about the
mean and bell-shaped.
14Bimodal Distribution
15Left-Skewed Distribution
Ages of Nuns
16Distribution of Categorical Data
Cars Sold in One Week
- Day Number Sold
- Monday 15
- Tuesday 23
- Wednesday 35
- Thursday 11
- Friday 12
- Saturday 42
17Basic Pie Chart
Cars Sold in One Week
Pie Charts focus our attention on fractions of
the whole, especially for the largest classes.
18Three-D Pie Chart
Cars Sold in One Week
Three-D Pie Charts are pretty but can also be
used to distort the image.
19Manipulating 3-D Pie Charts
Cars Sold in One Week
Changing the angle or turning the pie may affect
our perception of size.
20Bar Charts for Categorical Data
Cars Sold in One Week
(Bar charts for categorical data are drawn with
bars separated, while bars in histograms touch.)
21Manipulating Bar Charts
Cars Sold in One Week
Cutting off the vertical axis distorts
our perception of the differences between bars.
22Manipulating Bar Charts
Cars Sold in One Week
Removal of labels on the vertical axis allows
bars to be stretched upward to hide the
differences.
23Hmmm
- It is proven that the celebration of birthdays is
healthy. Statistics show that people who
celebrate the most birthdays become the oldest. - In earlier times, they had no statistics, so they
had to fall back on lies. (Stephen Leacock)
24Measures of Central Tendency
- Statistics used to locate the middle of a set of
numeric data, or where the data is clustered. - The term average is often associated with all
measures of central tendency (book, not me). - The mode for discrete data is the value that
occurs with greatest frequency. - The modal class of a histogram is the class with
the greatest frequency. - A bimodal distribution has two high-frequency
classes separated by classes with lower
frequencies.
25Summation Notation
26The Mean
- Mean The regular average. The sum of all the
values divided by the total number of values. - The population mean, m, (lowercase Greek mu) is
the mean of all x values for the population. It
is a parameter of the distribution. - We usually cannot measure m but would like to
estimate its value.
27The Sample Mean
- The sample mean, , (read x-bar) is the mean of
all x values for the sample. It is a statistic. - The mean can be greatly influenced by outliers.
- E.g. Bill Gates moves to town.
28Median
- Median The value of the data that occupies the
middle position when the data are ranked
according to size. - The sample median (statistic) may be denoted by
x tilde - .
- The population median (parameter), M, (uppercase
Greek mu), is the data value in the middle of the
population. - To find the median
- 1. Rank the data.
- 2. Determine the depth of the median.
- 3. Determine the value of the median.
29Mode
- Mode The mode is the value of x that occurs most
frequently. - Note If two or more values in a sample are tied
for the highest frequency (number of
occurrences), there is no mode. - Midrange The number exactly midway between a
lowest value data L and a highest value data H.
It is found by averaging the low and the high
values.
30Dispersion
- How spread apart are the data?
- Two populations with the same mean can have very
different distributionswould like to take
measure spread somehow. - Range (max-min)
- Values in middle are ignored
- Dispersion of middle could be very different
- Use the idea of deviation from the mean
- MAD
- Variance
- Standard Deviation
31Deviations from the Mean
deviations
mean
x-values
32Some example data
33Calculate the mean
34Deviation From the Mean
35Mean Absolute Deviation (MAD)
36Formula
37Use of Squared Deviations
38Sums of Squares
- The sum of squared deviations is denoted by SS(x)
and often called the Sum of Squares for x. - There are also other notations used, including
SSx and Sxx
39Variance
- The Variance is the statisticians favorite
measure of dispersion, but in reports or
everyday use the standard deviation is more
commonly given. - The Standard Deviation is the square root of the
variance. - The Variance may be thought of as the average
squared deviation from the mean. - For a sample, divide by n-1.
- For a population, divide by N.
40Formulas
41Formulas
42- Example Find the variance and standard deviation
for the data 5, 7, 1, 3, 8.
43Interpretation of s
- Need to get a sense of the meaning of different
values of dispersion measures. - Are units same as data or squared?
- Empirical Rule 68, 95, 99.7
- Test of Normality
- Range as estimator of s
44z-Scores
- Also standardized scores or just standard
scores. - Expresses a quantity in terms of its distance
from the mean in standard deviation units.
45More z-Scores
- The z-score measures the number of standard
deviations away from the mean. - z-scores typically range from -3.00 to 3.00.
- z-scores may be used to make comparisons of raw
scores. - You can calculate back from z-score to raw data
value by using the inverse
46Percentiles
- Values of the variable that divide a set of
ranked data into 100 equal subsets. - Each set of data has 99 percentiles.
- The kth percentile, Pk, is a value such that at
most k of the data are smaller than Pk and at
most (100-k) are larger.
47- Procedure for finding Pk
- 1. Rank the n observations, lowest to highest.
- 2. Compute A (nk)/100.
- 3. If A is an integer
- d(Pk) A.5 (depth)
- Pk is halfway between the value of the datum in
the Ath position and the value of the next
datum. - If A is a fraction
- d(Pk) B, the next largest integer.
- Pk is the value of the data in the Bth position.
- Some programs like Excel also do interpolation
48Quartiles
- Like percentiles except dividing the data set
into 4 equal subsets. - The first quartile, Q1, is the same as the 25th
percentile, and - The third quartile, Q3, is the same as the 75th
percentile. - The second quartile is the 50th percentile, which
is the median. - Sometimes finding Q1 and Q3 is described as
finding the medians of the bottom half and top
half of the data, respectively.
49Five Number Summary
- The Min, Q1, Median, Q3, and Max
- Indicate how the data is spread out in each
quarter. - Interquartile Range is the distance between Q1
and Q3. - The Midquartile is the average of Q1 and Q3,
another measure of central tendency.
50Box and Whisker Plots
51Hmmm
- What did the Box Plot say to the outlier?
- Dont you dare get close to my whisker!