Warm Up 5, 4, 6, 8, 7, 4, 6, 5, 9, 3, 6 Mean = 2. Median = 3. Mode =

Slides:

Advertisements

Similar presentations

Data Distributions Warm Up Lesson Presentation Lesson Quiz

Advertisements

Introduction Data sets can be compared and interpreted in the context of the problem. Data values that are much greater than or much less than the rest.

Measures of Center and Spread

Homework Questions. Quiz! Shhh…. Once you are finished you can work on the warm- up (grab a handout)!

Lesson 4 Compare datas.

Students in a Grade 7 class measured their pulse rates. Here are their results in beats per minute. 97, 69, 83, 66, 78, 8, 55, 82, 47, 52, 67, 76, 84,

Warm Up Simplify each expression. – 53

How do we construct a box plot?

6-5 Data Distributions Objective

5 Minute Check Find the measures of center for each data set. Round to the tenth and complete in your notes. 1. 8,13, 21,12, 29, , 76, 61, 58, 68.

5 Minute Check Complete on the back of your homework. 1. The number of songs downloaded per month by a group of friends were 8,12,6,4,2,0, and 10. Find.

3. Use the data below to make a stem-and-leaf plot.

Central Tendency & Range. Central Tendency Central Tendency is a value that describes a data set. Mean, Median, and Mode are the measures of Central Tendency.

5 Minute Check Find the measures of center and variability then make a line plot for the daily high temperatures. Round to the tenth, if needed. Describe.

Objectives Create and interpret box-and-whisker plots.

5 Minute Check Make a line plot for the data set. Find the median, mode, range and any outliers. Describe the data. Daily high temperatures in degrees.

6, 5, 3, 6, 8 01/10/11 Mean, Median, Mode Warm Up

Ratios & Percents To help us understand the data, calculate ratios for: –Infected to uninfected –Infected to total –Uninfected to total Use those ratios.

5 Minute Check A double stem and leaf plot, where the stem is in the middle and the leaves are on either side, shows the high temperatures for two cities.

7.3 Find Measures of Central Tendency and Dispersion p. 259.

Using Integers with Mean, Median, and Mode COURSE 3 LESSON 1-6 The prices of new books bought for the library are in dollars below. How does the outlier.

Measures of Central Tendency 10-3 Warm Up Warm Up Lesson Presentation Lesson Presentation Problem of the Day Problem of the Day Lesson Quizzes Lesson Quizzes.

Warm Up for 8/4 Make Sure to Get a Calculator Calculate the measures of central tendency for the data set above. 2. Determine.

Mean, Median, Mode, and Range

Mean, Median, Mode, & Range Finding measures of central tendency 1 © 2013 Meredith S. Moody.

Holt McDougal Algebra Data Distributions Warm Up Identify the least and greatest value in each set Use the data below to make a stem-and-

COMPUTATIONAL FORMULAS AND IQR’S. Compare the following heights in inches: BoysGirls

Data Analysis Goal: I can use shape, center, and the spread to describe characteristics of the data set. I can understand the effects of outliers on a.

Prerequisite Skills VOCABULARY CHECK Copy and complete the statement. 1. The probability of an event is a number from ? to ? that indicates the likelihood.

AP Statistics 5 Number Summary and Boxplots. Measures of Center and Distributions For a symmetrical distribution, the mean, median and the mode are the.

Holt McDougal Algebra 1 Data Distributions Holt Algebra 1 Warm Up Warm Up Lesson Presentation Lesson Presentation Lesson Quiz Lesson Quiz Holt McDougal.

Measures of Central Tendency and Variation

10-3 Data Distributions Warm Up Lesson Presentation Lesson Quiz

Mean, Median, Mode and Standard Deviation (Section 11-1)

Warm Up Identify the least and greatest value in each set.

Notes 13.2 Measures of Center & Spread

5 Minute Check Find the measures of center and variability, then make a line plot for the daily high temperatures. Round to the tenth, if needed. Describe.

Warm Up What is the mean, median, mode and outlier of the following data: 16, 19, 21, 18, 18, 54, 20, 22, 23, 17 Mean: 22.8 Median: 19.5 Mode: 18 Outlier:

10-3 Data Distributions Warm Up Lesson Presentation Lesson Quiz

Measures of Central Tendency, Dispersion, IQR and standard deviation

Mean, Median, Mode, and Range

Ticket in the Door Find the mean, median and mode of the data.

Measures of Central Tendency & Range

Measures of Central Tendency

Mean, Median, Mode, and Range

Analyze Data: IQR and Outliers

Unit 4 Statistics Review

11.1 Measures of Center and Variation

Outliers and Skewed Data

Calculating IQR and Identifying Outliers

are two in the middle, find their average.

EOC Review Question of the Day.

Describing Distributions

10-3 Data Distributions Warm Up Lesson Presentation Lesson Quiz

Lesson Compare datas.

Statistics Vocabulary Continued

MCC6.SP.5c, MCC9-12.S.ID.1, MCC9-12.S.1D.2 and MCC9-12.S.ID.3

Creating Data Sets Central Tendencies Median Mode Range.

Thursday, February 6th What are the measures of center?

Warm Up #1 Round to the nearest tenth place.

5 Number Summaries.

EQ: What are the measures of center and what is the measure of variability for a data set? MCC6.SP3 and MCC6.SP.5.

Statistics Vocabulary Continued

Bell Work – Range, Measures of Center, and Dot Plot

Determine the five number summary for the data set above.

Warm Up #1 Round to the nearest tenth place.

Analyze Data: IQR and Outliers

7.3 Find Measures of Central Tendency and Dispersion

Presentation transcript:

Warm Up 5, 4, 6, 8, 7, 4, 6, 5, 9, 3, 6 Mean = 2. Median = 3. Mode = 4. IQR = 5. Range = 5.72 6 6 3 6

Calculate Mean, Median, Mode, IQR, and Range Quiz Calculate Mean, Median, Mode, IQR, and Range 5, 5, 6, 8, 7, 4, 6, 5, 9, 3, 6, 6, 9 15 Minutes

Objectives Understanding Outliers.

A value that is very different from the other values in a data set is called an outlier. In the data set below one value is much greater than the other values. Most of data Mean Much different value

Example 3: Determining the Effect of Outliers Identify the outlier in the data set {16, 23, 21, 18, 75, 21}, and determine how the outlier affects the mean, median, mode, and range of the data. 16, 18, 21, 21, 23, 75 Write the data in numerical order. Look for a value much greater or less than the rest. The outlier is 75. With the outlier: 16, 18, 21, 21, 23, 75 median: The median is 21. mode: 21 occurs twice. It is the mode. range: 75 – 16 = 59

Example 3 Continued Without the outlier: 16, 18, 21, 21, 23 median: The median is 21. mode: 21 occurs twice. It is the mode. range: 23 – 16 = 7 The outlier is 75; the outlier increases the mean by 9.2 and increases the range by 52. It has no effect on the median and the mode.

Example 4 Identify the outlier in the data set {21, 24, 3, 27, 30, 24} and determine how the outlier affects the mean, median, mode and the range of the data. 3, 21, 24, 24, 27, 30 Write the data in numerical order. Look for a value much greater or less than the rest. The outlier is 3. With the outlier: mean: 3+21+24+24+27+30 6 = 21.5 3, 21, 24, 24, 27, 30 median: The median is 24. mode: 24 occurs twice. It is the mode. range: 30 – 3 = 27

Example 4 Continued Without the outlier: mean: 21+24+24+27+30 5 = 25.2 21, 24, 24, 27, 30 median: The median is 24. mode: 24 occurs twice. It is the mode. range: 30 – 21 = 9 The outlier is 3; the outlier decreases the mean by 3.7 and increases the range by 18. It has no effect on the median and the mode.

An outlier can strongly affect the mean of a data set, having little or no impact on the median and mode. Therefore, the mean may not be the best measure to describe a data set that contains an outlier. In such cases, the median or mode may better describe the center of the data set.

Worksheet 10-3 Due: September 14th HOMEWORK Worksheet 10-3 Due: September 14th