Exercise Calculate the range for the following set of data: {1, 2, 3, 4, 5, 6, 7, 8, 9}. 8.

Slides:

Advertisements

Similar presentations

Introduction to Summary Statistics

Advertisements

Introduction to Summary Statistics

Frequency Tables Histograms. Frequency-How often something happens. Frequency Table- A way to organize data in equal intervals. Histogram- Shows how frequently.

Aim: How do we construct a cumulative frequency table/histogram?

Frequency Distribution and Variation Prepared by E.G. Gascon.

Quantitative Data Analysis Definitions Examples of a data set Creating a data set Displaying and presenting data – frequency distributions Grouping and.

1. Statistics 2. Frequency Table 3. Graphical Representations  Bar Chart, Pie Chart, and Histogram 4. Median and Quartiles 5. Box Plots 6. Interquartile.

Measures Of Central Tendency “AVERAGES”. Measures Of Central Tendency In finding the single number that you felt best described the position at which.

Objective To understand measures of central tendency and use them to analyze data.

Basic Statistics. Scales of measurement Nominal The one that has names Ordinal Rank ordered Interval Equal differences in the scores Ratio Has a true.

Introduction to Summary Statistics. Statistics The collection, evaluation, and interpretation of data Statistical analysis of measurements can help verify.

CHAPTER 36 Averages and Range. Range and Averages RANGE RANGE = LARGEST VALUE – SMALLEST VALUE TYPES OF AVERAGE 1. The MOST COMMON value is the MODE.

Objectives Describe the central tendency of a data set.

Course Stem-and-Leaf Plots 6-9 Stem-and-Leaf Plots Course 1 Warm Up Warm Up Lesson Presentation Lesson Presentation Problem of the Day Problem of.

Frequency Distributions and Their Graphs Section 2.1.

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.

The Central Tendency is the center of the distribution of a data set. You can think of this value as where the middle of a distribution lies. Measure.

WARM UP Find the mean, median, mode, and range 1. 5, 10, 19, 34, 16, , 22, 304, 425, 219, 304, 22, 975 When you are done the warm up put the calculator.

3.3 Working with Grouped Data Objectives: By the end of this section, I will be able to… 1) Calculate the weighted mean. 2) Estimate the mean for grouped.

DATA ANALYSIS n Measures of Central Tendency F MEAN F MODE F MEDIAN.

Thinking Mathematically

Statistics- a branch of mathematics that involves the study of data The purpose of statistical study is to reach a conclusion or make a decision about.

Frequency Distribution ScoresFrequency Classes/Intervals – Determined after finding range of data. Class width is the range of each class/interval. Rule.

By the end of this lesson you will be able to explain/calculate the following: 1. Mean for data in frequency table 2. Mode for data in frequency table.

Section 13.7 Stem and Leaf and Histograms Objective: Students will make stem and leaf plots and histograms and use these to answer data questions. Standard:

Statistical analysis and graphical representation In Psychology, the data we have collected (raw data) does not really tell us anything therefore we need.

Chapter II Methods for Describing Sets of Data Exercises.

13.7 Histograms SWBAT make and read a histogram SWBAT locate the quartiles of a set of data on a histogram SWBAT interpret a frequency polygon.

Chapter 14 Statistics and Data Analysis. Data Analysis Chart Types Frequency Distribution.

Statistics Unit Test Review Chapters 11 & /11-2 Mean(average): the sum of the data divided by the number of pieces of data Median: the value appearing.

Statistics Review  Mode: the number that occurs most frequently in the data set (could have more than 1)  Median : the value when the data set is listed.

Draw, analyze, and use bar graphs and histograms. Organize data into a frequency distribution table The Frequency Distribution.

6-9 Stem-and-Leaf Plots Warm Up Problem of the Day Lesson Presentation

12-3 Measures of Central Tendency and Dispersion

Frequency Distributions

Warm Up Problem of the Day Lesson Presentation Lesson Quizzes.

BUSINESS MATHEMATICS & STATISTICS.

Statistics Unit Test Review

7. Displaying and interpreting single data sets

Information used to create graphs and find statistics

6-9 Stem-and-Leaf Plots Warm Up Problem of the Day Lesson Presentation

Frequency Tables and Histograms

Unit 12: Statistics.

FREQUENCY TABLES, LINE PLOTS, & HISTOGRAMS

how often something occurs

QUIZ Time : 90 minutes.

Analyzing graphs and histograms

Organizing and Displaying Data

Warm Up Problem Solve for x: 6x + 1 = 37.

Histograms & Comparing Graphs

8.3 Frequency Tables and Histograms

Scatter Plots Frequency Tables Histograms Line Plots Box and Whisker

During this survey, I went up to 50 random students and asked each one what time they woke up in the morning for school .These are the results I got…..

Warm Up Problem of the Day Lesson Presentation Lesson Quizzes.

COURSE 3 LESSON 10-1 Displaying Frequency

Bellwork Thursday, April 19th

Unit 2: Descriptive Statistics

Descriptive Statistics

6-9 Stem-and-Leaf Plots Warm Up Problem of the Day Lesson Presentation

Descriptive Statistics

6-9 Stem-and-Leaf Plots Warm Up Problem of the Day Lesson Presentation

Introduction to Basic Statistics

Descriptive Statistics

Measures of location: Mean

Objective - To make a histogram.

Creating Histograms Middle School Math

Line Plots, Frequency Tables and Histograms

Review of 6th grade material to help with new Statistics unit

ALGEBRA STATISTICS.

Presentation transcript:

Exercise Calculate the range for the following set of data: {1, 2, 3, 4, 5, 6, 7, 8, 9}. 8

Exercise Calculate the median for the following set of data: {1, 2, 3, 4, 5, 6, 7, 8, 9}. 5

Exercise Calculate the mean for the following set of data: {1, 2, 3, 4, 5, 6, 7, 8, 9}. 5

Exercise Calculate the mode for the following set of data: {1, 2, 3, 4, 5, 6, 7, 8, 9}. none

The median and mean, which would be 5 more. Exercise Which of these statistics would change if you added 5 to each piece of data? The median and mean, which would be 5 more.

92 88 96 100 76 88 96 72 84 80 68 76 88 88 86 76 100 80 72 92 88 96 80 84

Frequency Distribution Table A table used to organize a large set of data.

Frequency Distribution Table Data (D) Tally Frequency (f) Product (Df)

Data Column The data column of the frequency distribution table contains the data arranged in numerical order.

Frequency Column The frequency column of the frequency distribution table represents the number of times each number occurs (number of tallies). The number at the bottom of the column is the total number of data.

Product Column The product column of the frequency distribution table is the product of the numbers in the data column (D) and the frequency column (f). The number at the bottom of the column is the sum of all data.

Example Find the range, mean, median, and mode for Mrs. Koontz’s students’ test scores.

range: 100 – 68 = 32 mean: product total frequency total 2,046 24 = ≈ 85.3

median: twelfth score: 86 thirteenth score: 88 86 + 88 2 174 2 = = 87 mode: 88

Interval Frequency Table Age (interval) Frequency (f) 10–19 14 20–29 10 30–39 17 40–49 8 50–59 15 60–69 12 70–79 5 80–89 2

Histogram A histogram is a bar graph representing equal intervals, with no space between the bars.

Number of People Age

Age (interval) Midpoint (m) Frequency (f) Product (mf) 10–19 14.5 14 203 20–29 24.5 10 245 30–39 34.5 17 586.5 40–49 44.5 8 356 50–59 54.5 15 817.5 60–69 64.5 12 774 70–79 74.5 5 372.5 80–89 84.5 2 169 Total 83 3,523.5

Example The following are a set of scores on a twenty-five-point quiz: {17, 24, 19, 22, 23, 12, 24, 25, 25, 13, 18, 22, 24, 23, 22, 20, 18}.

Example The following numbers are the test scores: {60, 62, 68, 68, 69, 69, 70, 77, 78, 78, 78, 79, 79, 80, 80, 80, 81, 82, 82, 82, 83, 83, 83, 83, 83, 85, 89, 90, 91, 92, 92, 93, 93, 95, 99}.

Midpoint (m) Frequency (f) Product (mf) Interval