Parametric Statistics

Mis-Leading Statistics Lesson Plan

Abstract

This lesson is designed to develop students' critical thinking skills by introducing them to misleading statistics. This lesson also introduces students to general statistical terms and concepts.

Standards (NCTM)

Data Analysis

Formulate questions that can be addressed with data and collect, organize, and display relevant data to answer them

know the characteristics of well-designed studies, including the role of randomization in surveys and experiments.

Select and use appropriate statistical methods to analyze data

find, use, and interpret measures of center and spread, including mean and interquartile range.
discuss and understand the correspondence between data sets and their graphical representations, especially histograms, stem-and-leaf plots, box plots, and scatterplots.

Develop and evaluate inferences and predictions that are based on data

use observations about differences between two or more samples to make conjectures about the populations from which the samples were taken;
use conjectures to formulate new questions and plan new studies to answer them.

Student Prerequisites

Educational:
Students should know:
- basic concept of average & data sets/collection.
- how data sets can be represented through different graphs.
Technological:
Students must be able to:
- perform basic mouse manipulations such as point, click and drag.
- use a browser such as Netscape for experimenting with the activities.

Teacher Preparation

Teachers will need:

a class roster.
magizines or newspapers containing statistics.
Statistics Test Scores data set.
1994 Braves Salaries data set.
Bar Graph Applet , Stem & Leaf Applet , Spinner Applet.

Students will need:

access to a browser.

Lesson Outline

Focus and Review

Have students introduce themselves to the class by saying something interesting about themselves.
Explain the rules of name tag.

Objectives

Guided Practice

Monitor the students playing name tag outside, while recording each time a student gets tagged.
As a class use the Bar Graph applet to create a bar graph portraying the number of times each student got tagged.

Teacher Input

Describe a scenario where Billy Bob is trying to recruit the fastest runner in the class.
Tell the class that the recruiter is examining the graph you created in order to determine the fastest runner.
Discuss with the class why this graph does not necessarily display the data Billy Bob needs to determine the fastest runner in the class and why this graph might be misleading.

Independent Practice

Have the students modify the graph without changing the data to try to convince Billy Bob to recruit them.

Teacher Input

Discuss a few of the students' graphs and what makes them misleading.
Review what makes graphs misleading.

Guided Practice

Go around the room and gather students' heights.
Split students up into small groups.
Have students graph the height data using the Bar Graph applet and discuss trends in the data.
To be sure students are working, have each student record their observations.

Teacher Input

Introduce/Review the terms sample, population, sample bias, and stratified random sample.
Discuss how these concepts relate to the tag and height data sets.
Important question to ask - Does every name or thing in the whole group have an equal chance to be in the sample?

Guided Practice

Allow students working in pairs to explore the concepts of mean, median, and mode by entering the height and tag data into the Stem and Leaf applet.
Students should record the shape or distribution of the data.
Students can play with the data values and see how they effect the mean, median, and mode values. Challenge students to create a data set where the mean, median, and mode have strikingly different values.

Teacher Input

Review the terms mean, median, and mode.
Present the students with the following scenario

Let students enter the data set into the Stem and Leaf applet.
Discuss which value Martha uses for the 81 statement. What about the other average values?
Point out that an average can be the mean, median, or mode.

Independent Practice

Split the class up into two groups.
Hand out a copy of the Atlanta Braves Salaries for 1994 to each group.
Group one must convince Group two to sign with the Atlanta Braves instead of another team.
Group two must convince Group one that they are underpaid and need a raise.
Groups can only use the concept of average to make their claim.

Teacher Input

Let students present their claims.
Point out which average they used and ask why?
Define standard deviation and variance.
Define normal, uniform, and skewed distributions.
Discuss the signifiance of 68% of the observations fall within one standard devation of the mean.

Guided Practice

Hand out pennies to groups of, or individual, students.
Students will flip their pennies 10 times and record the result each time.
After 10 flips, allow students to explore the probability of flipping a heads each time.

Teacher Input

Record the probability results on the board.
Theorical probability is 50/50, but the recorded probabilities aren't 50/50 why?
Have students repeat the experiment with the Spinner Applet increasing the number of trials.
Record those results on the board, beside the other results.
Sample size makes a difference in how close a person can get to the actual distribution.
With a large group, any difference produced by chance is likely to be small.

Independent Practice

Hand out the newspapers and magizines.
Students may look on the internet or through the papers for examples of statistics.
Define the term statistic and be sure to point out that everything covered in class today was statistics.

Closure

Discuss a few of the statistics students found.
Identify which statistics are misleading and how they are misleading.
Discuss how companies might use misleading statistics to convince consumers to buy their products.

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