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Introduction to Statistics for the Social Sciences SBS200 - Lecture Section 001, Spring 2017 Room 150 Harvill Building 9:00 - 9:50 Mondays, Wednesdays & Fridays. Welcome
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A note on doodling
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Schedule of readings Before next exam (February 10)
Please read chapters in OpenStax textbook Please read Appendix D, E & F online On syllabus this is referred to as online readings 1, 2 & 3 Please read Chapters 1, 5, 6 and 13 in Plous Chapter 1: Selective Perception Chapter 5: Plasticity Chapter 6: Effects of Question Wording and Framing Chapter 13: Anchoring and Adjustment
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Homework Assignment 7 & 8 Please complete the worksheet by hand
Please complete the memorandum Due: Friday, February 3rd
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Homework Assignment 7 & 8 Please complete the worksheet by hand
Please complete the memorandum Due: Friday, February 3rd
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By the end of lecture today 1/30/17
Use this as your study guide By the end of lecture today 1/30/17 Characteristics of a distribution Central Tendency Dispersion Measures of variability Range Standard deviation Variance Memorizing the four definitional formulae
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Lab sessions Everyone will want to be enrolled
in one of the lab sessions Labs continue this week
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Project 1 - Likert Scale - Correlations - Comparing two means (bar graph)
Questions?
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Overview Frequency distributions
The normal curve Mean, Median, Mode, Trimmed Mean Standard deviation, Variance, Range Mean Absolute Deviation Skewed right, skewed left unimodal, bimodal, symmetric
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Frequency distributions
The normal curve
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Some distributions are more
Variability What might this be? Some distributions are more variable than others Let’s say this is our distribution of heights of men on U of A baseball team 5’ 5’6” 6’ 6’6” 7’ 5’ 5’6” 6’ 6’6” 7’ Mean is 6 feet tall What might this be? 5’ 5’6” 6’ 6’6” 7’
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Dispersion: Variability
Some distributions are more variable than others 6’ 7’ 5’ 5’6” 6’6” A The larger the variability the wider the curve tends to be The smaller the variability the narrower the curve tends to be B Range: The difference between the largest and smallest observations C Range for distribution A? Range for distribution B? Range for distribution C?
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84” – 71” = 13” Wildcats Basketball team:
Tallest player = 84” (same as 7’0”) (Lauri Markkanen and Dusan Ristic) Shortest player = 71” (same as 5’11”) (Parker Jackson-Cartwritght) Fun fact: Mean is 78 Range: The difference between the largest and smallest scores 84” – 71” = 13” xmax - xmin = Range Range is 13”
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No reference is made to numbers between the min and max
Baseball Fun fact: Mean is 72 Wildcats Baseball team: Tallest player = 77” (same as 6’5”) (Kevin Ginkel) Shortest player = 68” (same as 5’8”) (Justin Behnke and Cody Ramer & Zach Gibbons) Range: The difference between the largest and smallest score 77” – 68” = 9” xmax - xmin = Range Range is 9” (77” – 68” ) Please note: No reference is made to numbers between the min and max
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Let’s build it up again… U of A Baseball team
Deviation scores Let’s build it up again… U of A Baseball team Diallo is 0” Diallo is 6’0” Diallo’s deviation score is 0 6’0” – 6’0” = 0 Diallo 5’8” 5’10” 6’0” 6’2” 6’4”
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Let’s build it up again… U of A Baseball team
Deviation scores Diallo is 0” Let’s build it up again… U of A Baseball team Preston is 2” Diallo is 6’0” Diallo’s deviation score is 0 Preston is 6’2” Preston Preston’s deviation score is 2” 6’2” – 6’0” = 2 5’8” 5’10” 6’0” 6’2” 6’4”
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Let’s build it up again… U of A Baseball team
Deviation scores Diallo is 0” Let’s build it up again… U of A Baseball team Preston is 2” Mike is -4” Hunter is -2 Diallo is 6’0” Diallo’s deviation score is 0 Hunter Preston is 6’2” Mike Preston’s deviation score is 2” Mike is 5’8” Mike’s deviation score is -4” 5’8” – 6’0” = -4 5’8” 5’10” 6’0” 6’2” 6’4” Hunter is 5’10” Hunter’s deviation score is -2” 5’10” – 6’0” = -2
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Let’s build it up again… U of A Baseball team
Deviation scores Diallo is 0” Let’s build it up again… U of A Baseball team Preston is 2” Mike is -4” Hunter is -2 Shea is 4 David is 0” Diallo’s deviation score is 0 David Preston’s deviation score is 2” Mike’s deviation score is -4” Shea Hunter’s deviation score is -2” Shea is 6’4” Shea’s deviation score is 4” 5’8” 5’10” 6’0” 6’2” 6’4” 6’4” – 6’0” = 4 David is 6’ 0” David’s deviation score is 0 6’ 0” – 6’0” = 0
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Let’s build it up again… U of A Baseball team
Deviation scores Diallo is 0” Let’s build it up again… U of A Baseball team Preston is 2” Mike is -4” Hunter is -2 Shea is 4 David is 0” Diallo’s deviation score is 0 David Preston’s deviation score is 2” Mike’s deviation score is -4” Shea Hunter’s deviation score is -2” Shea’s deviation score is 4” David’s deviation score is 0” 5’8” 5’10” 6’0” 6’2” 6’4”
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Let’s build it up again… U of A Baseball team
Deviation scores Diallo is 0” Let’s build it up again… U of A Baseball team Preston is 2” Mike is -4” Hunter is -2 Shea is 4 David is 0” 5’8” 5’10” 6’0” 6’2” 6’4”
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Standard deviation: The average amount
Deviation scores Standard deviation: The average amount by which observations deviate on either side of their mean Diallo is 0” Preston is 2” Mike is -4” Hunter is -2 Shea is 4 David is 0” 5’8” 5’10” 6’0” 6’2” 6’4”
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Standard deviation: The average amount
Deviation scores Standard deviation: The average amount by which observations deviate on either side of their mean Diallo is 0” Preston is 2” Mike is -4” Hunter is -2 Shea is 4 David is 0” 5’8” 5’10” 6’0” 6’2” 6’4”
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How far away is each score from the mean?
Diallo is 0” Mike is -4” Hunter is -2 Shea is 4 David is 0” Preston is 2” Deviation scores (x - µ) Deviation scores: The amount by which observations deviate on either side of their mean (x - µ) How far away is each score from the mean? Mean Diallo Deviation score Mike Preston Shea (x - µ) = ? Hunter Mike 5’8” ’0” = - 4” 5’9” ’0” = - 3” 5’10’ - 6’0” = - 2” 5’11” - 6’0” = - 1” 6’0” ’0 = 0 6’1” ’0” = + 1” 6’2” ’0” = + 2” 6’3” ’0” = + 3” 6’4” ’0” = + 4” Diallo How do we find each deviation score? (x - µ) Preston Hunter Diallo Mike Preston Find distance of each person from the mean (subtract their score from mean)
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How far away is each score from the mean?
Diallo is 0” Mike is -4” Hunter is -2 Shea is 4 David is 0” Preston is 2” Deviation scores (x - µ) Deviation scores: The amount by which observations deviate on either side of their mean (x - µ) How far away is each score from the mean? Mean Diallo Deviation score Preston Shea (x - µ) = ? Mike 5’8” ’0” = - 4” 5’9” ’0” = - 3” 5’10’ - 6’0” = - 2” 5’11” - 6’0” = - 1” 6’0” ’0 = 0 6’1” ’0” = + 1” 6’2” ’0” = + 2” 6’3” ’0” = + 3” 6’4” ’0” = + 4” Remember It’s relative to the mean Based on difference from the mean
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How far away is each score from the mean?
Standard deviation: The average amount by which observations deviate on either side of their mean Deviation scores (x - µ) Diallo is 0” Preston is 2” How far away is each score from the mean? Mike is -4” Hunter is -2 Shea is 4 Mean David is 0” Add up Deviation scores Diallo Preston Σ (x - µ) = ? Shea Mike 5’8” ’0” = - 4” 5’9” ’0” = - 3” 5’10’ - 6’0” = - 2” 5’11” - 6’0” = - 1” 6’0” ’0 = 0 6’1” ’0” = + 1” 6’2” ’0” = + 2” 6’3” ’0” = + 3” 6’4” ’0” = + 4” How do we find the average height? N Σx = average height How do we find the average spread? Σ(x - x) = 0 Σ(x - µ) N = average deviation Σ(x - µ) = 0
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How far away is each score from the mean?
Standard deviation: The average amount by which observations deviate on either side of their mean Deviation scores (x - µ) Diallo is 0” Preston is 2” How far away is each score from the mean? Mike is -4” Hunter is -2 Shea is 4 Mean David is 0” Diallo Preston Σ (x - µ) = ? Shea Mike 5’8” ’0” = - 4” 5’9” ’0” = - 3” 5’10’ - 6’0” = - 2” 5’11” - 6’0” = - 1” 6’0” ’0 = 0 6’1” ’0” = + 1” 6’2” ’0” = + 2” 6’3” ’0” = + 3” 6’4” ’0” = + 4” Square the deviations Big problem Σ(x - x) 2 2 Σ(x - x) = 0 Σ(x - µ) N Σ(x - µ) 2 Σ(x - µ) = 0
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Writing Assignment: Let’s try two problems
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Standard deviation (definitional formula) - Let’s do one
This numerator is called “sum of squares” Each of these are deviation scores _ X - µ _ 1 - 5 = - 4 (X - µ)2 16 Step 1: Find the mean _ X_ 1 2 3 4 5 6 7 8 9 45 Step 2: Subtract the mean from each score Step 3: Square the deviations Step 4: Find standard deviation
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Standard deviation (definitional formula) - Let’s do one
This numerator is called “sum of squares” Each of these are deviation scores _ X - µ _ 1 - 5 = - 4 2 - 5 = - 3 3 - 5 = - 2 4 - 5 = - 1 5 - 5 = 0 6 - 5 = 1 7 - 5 = 2 8 - 5 = 3 9 - 5 = 4 (X - µ)2 16 9 4 1 60 Step 1: Find the mean _ X_ 1 2 3 4 5 6 7 8 9 45 ΣX = 45 ΣX / N = 45/9 = 5 Step 2: Subtract the mean from each score Step 3: Square the deviations Step 4: Find standard deviation This is the Variance! a) 60 / 9 = b) square root of = Σ(x - µ) = 0 This is the standard deviation!
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Standard deviation - Let’s do one
Definitional formula How many kids? Step 1: Find the mean X - µ_ 3 - 3 = 0 (X - µ)2 _ X_ 3 2 1 4 8 Step 2: Subtract the mean from each score (deviations) Step 3: Square the deviations Step 4: Add up the squared deviations Step 5: Find standard deviation Σ(x - µ) = 0 Σx = 30 Σ(x - µ)2 = 38
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Standard deviation - Let’s do one
Definitional formula How many kids? Step 1: Find the mean X - µ_ 3 - 3 = 0 2 - 3 = -1 1 - 3 = -2 4 - 3 = 1 8 - 3 = 5 (X - µ)2 1 4 25 _ X_ 3 2 1 4 8 = 30 = 30/10 = 3 Step 2: Subtract the mean from each score (deviations) Step 3: Square the deviations Step 4: Add up the squared deviations Step 5: Find standard deviation Σ(x - µ) = 0 Σx = 30 Σ(x - µ)2 = 38 This is the Variance! a) 38 / 10 = 3.8 b) square root of 3.8 = 1.95 This is the standard deviation!
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Thank you! See you next time!!
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