introduction to statistics - part 1
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Quantitative Data Analysis: Statistics – Part 1
"... while man is an insoluble puzzle, in the aggregate he becomes a mathematical certainty. You can, for example, never foretell what any one man will do, but you can say with precision what an average number will be up to. Individuals vary, but percentages remain constant. So says the statistician."
Overview
Part 1 Picturing the Data Pitfalls of Surveys Averages Variance and Standard Deviation
Part 2 The Normal Distribution Z-Tests Confidence Intervals T-Tests
~ THE GOLDEN RULE ~
Statistics NEVER replace the judgment of the expert.
Approach to Statistical Research
1. Formulate a Hypothesis 2. State predictions of the hypothesis 3. Perform experiments or observations 4. Interpret experiments or observations 5. Evaluate results with respect to hypothesis 6. Refine hypothesis and start again
(Basically the same as all other research)
Hypothesis Testing
H0 : Null Hypothesis, status quo
HA : Alternative Hypothesis, research question
So, either :"The data does not support H0"
or"We fail to reject H0"
Types of Data
Continuous height, age, time
Discrete # of days worked this week, # leaves on a tree
Ordinal {Good, O.K., Bad}
Nominal {Yes/No}, {Teacher/Chemist/Haberdasher}
Picturing The Data
Time-Series Plots
Time related Data e.g. Stock Prices
Pie Charts
Nominal/Ordinal
Only suitable for data that adds up to 1
Hard to compare values in the chart
Bar Charts
Nominal/Ordinal
Easier to compare values than pie chart
Suitable for a wider range of data
Histograms
Continuous Data Divide Data into
ranges
Dot Plots
Nominal/Ordinal Represents all the
data
Difficult to read
Scatter Plots
Excellent for examining association between two variables
Box Plots
Nominal/Ordinal 1IQR, 3IQR - First
interquartile range (IQR), third interquartile range (3QR)
Outliers
John Tukey
• Born June 16, 1915• Died July 26, 2000• Born in New Bedford,
Massachusetts• He introduced the box
plot in his 1977 book,"Exploratory Data Analysis"
• Also the Cooley–Tukey FFT algorithm and jackknife estimation
• While working with John von Neumann on early computer designs, Tukey introduced the word "bit" as a contraction of "binary digit". The term "bit" was first used in an article by Claude Shannon in 1948.
• The term "software", which Paul Niquette claims he coined in 1953, was first used in print by Tukey in a 1958 article in American Mathematical Monthly, and thus some people attribute the term to him.
John Tukey Paul Niquette Claude Shannon John von Neumann
Question 1
In a telephone survey of 68 households, when asked do they have pets, the following were the responses :
16 : No Pets 28 : Dogs 32 : Cats
Draw the appropriate graphic to illustrate the results !!
Question 1 - Solution
Total number surveyed = 68Number with no pets = 16
=>Total with pets = (68 - 16) = 52But total 28 dogs + 32 cats = 60
=> So some people have both cats and dogs
Question 1 - Solution
How many? It must be (60 - 52) = 8 people No pets = 16 Dogs = 20 Cats = 24 Both = 8------------------------- Total = 68
Question 1 - Solution
Graphic: Pie Chart or Bar Chart
Question 1 - Solution
Graphic: Pie Chart or Bar Chart
Pitfalls of Surveys
The Literary Digest Poll
1936 US Presidential Election Alf Landon (R) vs. Franklin D. Roosevelt (D)
The Literary Digest Poll
The Literary Digest Poll
Literary Digest had been conducting successful presidential election polls since 1916
They had correctly predicted the outcomes of the 1916, 1920, 1924, 1928, and 1932 elections by conducting polls.
These polls were a lucrative venture for the magazine: readers liked them; newspapers played them up; and each “ballot” included a subscription blank.
The Literary Digest Poll
In 1936 they sent out 10 million ballots to two groups of people: prospective subscribers, “who were chiefly
upper- and middle-income people” a list designed to "correct for bias" from the
first list, consisting of names selected from telephone books and motor vehicle registries
The Literary Digest Poll
Response rate: approximately 25%, or 2,376,523 responses
Result: Landon in a landslide (predicted 57% of the vote, Roosevelt predicted 40%)
The Literary Digest Poll
Response rate: approximately 25%, or 2,376,523 responses
Result: Landon in a landslide (predicted 57% of the vote, Roosevelt predicted 40%)
Election result: Roosevelt received approximately 60% of the vote
The Literary Digest Poll
POSSIBLE CAUSES OF ERROR Selection Bias: By taking names and addresses from
telephone directories, survey systematically excluded poor voters. Republicans were markedly overrepresented in 1936, Democrats did not have as many phones,
not as likely to drive cars, and did not read the Literary Digest
“Sampling Frame” is the actual population of individuals from which a sample is drawn: Selection bias results when sampling frame is not representative of the population of interest
The Literary Digest Poll
POSSIBLE CAUSES OF ERROR Non-response Bias: Because only 20% of 10
million people returned surveys, non-respondents may have different preferences from respondents Indeed, respondents favored Landon Greater response rates reduce the odds of
biased samples
Definitions and Formula
Terminology Population: is a set of entities concerning which
statistical inferences are to be drawn. Sample: a number of independent observations
from the same probability distribution Parameter: the distribution of a random variable as
belonging to a family of probability distributions, distinguished from each other by the values of a finite number of parameters
Bias: a factor that causes a statistical sample of a population to have some examples of the population less represented than others.
Outliers (and their treatment)
Outliers (and their treatment)
An "outlier" is an observation that does not fit the pattern in the rest of the data
Check the data Check with the measurer If reason to believe it is NOT real, change it if possible,
otherwise leave it out (but note). If reason to believe it is real, leave it out and note.
The Mean
The Mean (Arithmetic) The mean is defined as the sum of all
the elements, divided by the number of elements.
The statistical mean of a set of observations is the average of the measurements in a set of data
The Mode
The mode is defined as the most frequently element in a set of elements. For example [1, 3, 6, 6, 6, 6, 7, 7, 12, 12, 17]
has a mode of 6. Given the list of data [1, 1, 2, 4, 4] the mode
is not unique - the dataset may be said to be bimodal, while a set with more than two modes may be described as multimodal.
The Median
The median is defined as the middle element, or the value separating the higher half of a sample from the lower half.
If there is an even number of elements, it is half the sum of the middle two elements.
Given the list of data [1, 1, 2, 4, 4] the median is 2.
The Variance
But there can be a lot of variance in individual elements,
e.g. teacher salariesAverage = €22,000Lowest = € 12,000Difference = 12,000 - 22,000 = -10,000
The Variance
The Variance
The Variance
The Variance
Sum of (Sample - Average) = 0, thus we need to define variance.
The variance of a set of data is a cumulative measure of the squares of the difference of all the data values from the mean divided by sample size minus one.
Standard Deviation
The standard deviation of a set of data is the positive square root of the variance.
- 1
- 1
Born 27 March 1857 Died 27 April 1936 Born in Islington, London, England Father of Mathematical Statistics protégé of Francis Galton Inventor of the P-value, the Pearson correlation coefficient, Chi distance, the Method of
moments, and Principal Component Analysis
Karl Pearson
Karl Pearson the term "standard deviation" in 1893, "although the idea was by then nearly a century old" (Abbott; Stigler, page 328). The term "standard deviation" was introduced in a lecture of 31 January 1893, as a convenient substitute for the cumbersome "root mean square error" and the older
expressions "error of mean square" and "mean error." The term was first used in a publication in 1894 by Pearson in "Contributions to the Mathematical Theory of Evolution," (Philosophical Transactions of the Royal
Society A, 185, (1894), 71-110.).
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Question 2
Find the mean and variance of the following sample values :
36, 41, 43, 44, 46
Question 2
Mean:
=(36 + 41 + 43 + 44 + 46) / 5
=210 / 5
=42
Question 2
Variance
Difference Square36 – 42 = -6 3641 – 42 = -1 143 – 42 = 1 144 – 42 = 2 446 – 42 = 4 16 ------------------------------------ 58
Variance = 58 / (5 -1) = 58 / 4 = 14.5
Standard Deviation = SquareRoot(14.5) = 3.8
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http://mathforum.org/library/drmath/view/65410.html