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Describing Location in a Distribution

Describing Location in a Distribution. Text. 2.1 Measures of Relative Standing and Density Curves. 6 | 7 7 | 2334 7 | 5777899 8 | 00123334 8 | 5 6 9 9 | 03. Her score is “above average”... but how far above average is it?. Sample Data.

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Describing Location in a Distribution

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  1. Describing Location in a Distribution Text • 2.1 Measures of Relative Standing • and Density Curves

  2. 6 | 7 7 | 2334 7 | 5777899 8 | 00123334 8 | 569 9 | 03 Her score is “above average”... but how far above average is it? Sample Data • Consider the following test scores for a small class: Julia’s score is noted in red. How did she perform on this test relative to her peers?

  3. Standardized Value: “z-score” If the mean and standard deviation of a distribution are known, the “z-score” of a particular observation, x, is: Standardized Value • One way to describe relative position in a data set is to tell how many standard deviations above or below the mean the observation is.

  4. Calculating z-scores • Consider the test data and Julia’s score. According to Minitab, the mean test score was 80 while the standard deviation was 6.07 points. Julia’s score was above average. Her standardized z-score is: Julia’s score was almost one full standard deviation above the mean. What about Kevin: x=72

  5. 6 | 7 7 | 2334 7 | 5777899 8 | 00123334 8 | 569 9 | 03 Calculating z-scores Julia: z=(86-80)/6.07 z= 0.99 {above average = +z} Kevin: z=(72-80)/6.07 z= -1.32 {below average = -z} Katie: z=(80-80)/6.07 z= 0 {average z = 0}

  6. Statistics Chemistry Comparing Scores • Standardized values can be used to compare scores from two different distributions. • Statistics Test: mean = 80, std dev = 6.07 • Chemistry Test: mean = 76, std dev = 4 • Jenny got an 86 in Statistics and 82 in Chemistry. • On which test did she perform better? Although she had a lower score, she performed relatively better in Chemistry.

  7. 6 | 7 7 | 2334 7 | 5777899 8 | 00123334 8 | 569 9 | 03 Percentiles • Another measure of relative standing is a percentile rank. • pth percentile: Value with p % of observations below it. • median = 50th percentile {mean=50th %ile if symmetric} • Q1 = 25th percentile • Q3 = 75th percentile Jenny got an 86. 22 of the 25 scores are ≤ 86. Jenny is in the 22/25 = 88th %ile.

  8. Density Curve: An idealized description of the overall pattern of a distribution. Area underneath = 1, representing 100% of observations. Density Curve • In Chapter 1, you learned how to plot a dataset to describe its shape, center, spread, etc. • Sometimes, the overall pattern of a large number of observations is so regular that we can describe it using a smooth curve.

  9. Density Curves • Density Curves come in many different shapes; symmetric, skewed, uniform, etc. • The area of a region of a density curve represents the % of observations that fall in that region. • The median of a density curve cuts the area in half. • The mean of a density curve is its “balance point.”

  10. Example • Pretend you are rolling a die. The numbers 1,2,3,4,5,6 are the possible outcomes. In 120 rolls, how many of each number would you expect to roll? • Calculator can do a simulation: • Clear L1 in your calc. Use random integer generator to generate 120 random whole numbers between 1 and 6 then store in L1 • RandInt (1, 6, 120) STO-> L1 • Set viewing window: X (1,7) by Y (-5,25). • Specify a histogram using the data in L1 • Repeat simulation several times. 2nd Enter will recall/reuse the previous command. In theory we should expect a uniform outcome...

  11. Summary • We can describe the overall pattern of a distribution using a density curve. • The area under any density curve = 1. This represents 100% of observations. • Areas on a density curve represent % of observations over certain regions. • An individual observation’s relative standing can be described using a z-score or percentile rank.

  12. Normal Distributions • Normal Curves: symmetric, single-peaked, bell-shaped. and median are the same. Size of the will affect the spread of the normal curve.

  13. Example • Scores on the SAT verbal test in recent years follow approximately the N (505, 110) distribution. How high must a student score in order to place in the top 10% of all students taking the SAT? • 1. State the problem and draw a picture. Shade the area we’re looking for. • 2. Find the Z score with the table • 3. Convert to raw score.

  14. Assessing Normality • Method 1: Construct a histogram, see if graph is approximately bell-shaped and symmetric. Median and Mean should be close. Then mark off the -2, -1, +1, +2 SD points and check the 68-95-99.7 rule.

  15. Normal Probability Plot • Method 2: Construct Normal Probability Plot • 1. Arrange the observed data values from smallest to largest. Record what percentile of the data each value occupies (example, the smallest observation in a set of 20 is at the 5% point, the second is at 10% etc.) • Use Table A to find the Z’s at these same percentiles (example -1.645 is @ 5%, -1.28 is @10% • Plot each data point against the corresponding Z (x-values on the horizontal axis, z-scores on the vertical axis is what I do, either is fine)

  16. rkgnt • Normal w/Outliers Right Skew Normal Interpretation: draw your X = Y line with a straight edge- points shouldn’t vary too much

  17. Constructing Probability Plot on Calculator • Students in math class • X values on horizontal axis

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