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Download AP Statistics 1.3 Describing Quantative Data With Numbers: Five
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AP Statistics 1.3 Describing Quantative Data With Numbers: Five Number Summary and Boxplots, Measuring Spread-Standard Deviation, Choosing Measures of Center and Spread The Five-Number Summary The minimum & maximum values alone tell us little about the Likewise, the median & quartiles tell us little about the To get a quick summary of both center & spread, combine Five-Number Summary of a distribution consists of: 1. The smallest 2. The 3. The 4. The 5. The largest *** written in order from Minimum 𝑸𝟏 M 𝑸𝟑 Maximum to *** Boxplots (Box-and-Whisker Plots) The five-number summary divides the distribution roughly into This leads to a new way to display , the boxplot. How to Make a Boxplot 1. Draw & label a 2. Draw a central box from 3. Note the 4. Extend lines (whiskers) from the box out to the Example using the “Stuck in Traffic” data. Activity: Technology Corner Page 61. Use calculators to make boxplots with data on page 53 Measuring Spread: The Standard Deviation Standard deviation is the most common measure of spread that looks at Example using the number of pets owned by a group of 9 children 1. Calculate the mean: 𝑥̅ = 2. Calculate each deviation: deviation = observation – mean 3. Square each deviation. 4. Find the “average” squared deviation. Calculate the sum of the squared deviations divided by (𝑛 − 1)…this is called variance. 5. Calculate the square root of the variance…this is the standard deviation. AP Statistics 1.3 Describing Quantative Data With Numbers: Five Number Summary and Boxplots, Measuring Spread-Standard Deviation, Choosing Measures of Center and Spread Standard Deviation (𝑺𝒙 ) measures the average . It is calculated by finding an average and then taking the square root. This squared average is called the . (x1 - x ) 2 + (x 2 - x ) 2 + ...+ (x n - x ) 2 1 variance = s = = (x i - x ) 2 å n -1 n -1 2 x 1 2 standard deviation = sx = (x x ) å i n -1 Choosing Measures of Center & Spread We now have a choice between 2 descriptions for center & spread: 1. Mean & 2. Median & The Median & IQR are usually better than the mean & standard deviation for Use mean & standard deviation only for NOTE: Numerical summaries . ALWAYS PLOT YOUR DATA! Assignment on Pages 71-74. Do Problems: 91, 93, 95, 97, 103, 105, & 107-110 Take Quiz 1.3 A Review Chapter 1. Chapter 1 AP Statistics Practice Test on Pages 78-81. Take Chapter 1 Test
