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Published byAusten Boone Modified over 9 years ago
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CC-34: Measures of Central Tendency and Dispersion
Objective: To find mean, median, mode, and range. By: Yolanda Torres, Daniel Cutino, Gabriella Castillo, George Guardia, Michael Montoya
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Player 1 Player 2 Game Points Assists 1 12 8 23 5 2 10 4 3 15 11 25 Which player would you rather have on your team? How can you use the data to determine which player scores more points and which player makes more assists? You can find the total number of points scored and the total number of assists made for each player. Essential Understanding: You can use different measures to interpret and compare sets of data.
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One way to summarize a set of data is to use a measure of central tendency. Mean, median and mode are all Measures of central tendency. You get the mean of the data when you add all the numbers, and then divide that value, by the number of numbers. You use the mean to find the average of a set of data. Mean = Average Mean
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The median is the number in the middle of a set of numbers
The median is the number in the middle of a set of numbers. Ex: 45,47,48,49,51; the median of this set of numbers would be 48. Median
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The mode is the value in a set of numbers that repeats the most
The mode is the value in a set of numbers that repeats the most. Ex: 3,4,5,6,6,7,7,7,8,9; the mode would be 7 because it repeats the most. Mode
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You get the range of a set of data, when you get the biggest number and subtract it by the smallest number. Ex: 15,9,7,8,14 First, you get 15 and 7 and then write it out. 15-7=? The range is 8 Range
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Do it yourself! Which class has a higher standard for being in the top half of the quiz scores? In order to be in the top half of the quiz scores, a student must have a greater quiz score than 50%. The median is the middle value, therefore 50% of the data are less than the median and 50% of the data are greater than the median. You need to calculate the median of each data set to determine which class has a higher standard for being in the top half of the quiz. Class A: Median: 3+4/2= 7/2=3.5 Class B: Median: 5
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Try some yourself Find the mean, median, and mode of each data set.
Weights of books(oz): 12,10,9,15,16,10 Golf scores: 98,96,98,134,99 3. Time spent on the Internet (min/day): 75,38,43,120,65,48,52 Mean: Median: Mode: 10 Mean: Median: Mode: 98 Mean: Median: Mode: No Mode
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