Standard Deviation. Two classes took a recent quiz. There were 10 students in each class, and each class had an average score of 81.5.

Slides:

Advertisements

Similar presentations

Brought to you by Tutorial Support Services The Math Center.

Advertisements

Measures of Spread The Range, Variance, and Standard Deviation.

Measures of Variability or Dispersion

Variability Measures of spread of scores range: highest - lowest standard deviation: average difference from mean variance: average squared difference.

As with averages, researchers need to transform data into a form conducive to interpretation, comparisons, and statistical analysis measures of dispersion.

Measures of Variability: Range, Variance, and Standard Deviation

Chapter 4 SUMMARIZING SCORES WITH MEASURES OF VARIABILITY.

Objectives The student will be able to: find the variance of a data set. find the standard deviation of a data set. SOL: A

Chapter 3 Averages and Variations

Standard Deviation!. Let’s say we randomly select 9 men and 9 women and ask their GPAs and get these data: MENWOMEN

Chapter 3 Descriptive Measures

Statistics Recording the results from our studies.

BUS250 Seminar 4. Mean: the arithmetic average of a set of data or sum of the values divided by the number of values. Median: the middle value of a data.

Understanding Numerical Data

Describing Location in a Distribution. Measuring Position: Percentiles Here are the scores of 25 students in Mr. Pryor’s statistics class on their first.

Statistics: For what, for who? Basics: Mean, Median, Mode.

Objectives The student will be able to: find the variance of a data set. find the standard deviation of a data set.

Standard Deviation Link for follow along worksheet:

Psychology’s Statistics. Statistics Are a means to make data more meaningful Provide a method of organizing information so that it can be understood.

Warm-Up To become president of the United States, a candidate does not have to receive a majority of the popular vote. The candidate does have to win a.

Describing Quantitative Data Numerically Symmetric Distributions Mean, Variance, and Standard Deviation.

Educ 200C Wed. Oct 3, Variation What is it? What does it look like in a data set?

Measures of Spread 1. Range: the distance from the lowest to the highest score * Problem of clustering differences ** Problem of outliers.

Chapter 3: Averages and Variation Section 2: Measures of Dispersion.

What is Mean Absolute Deviation?  Another measure of variability is called the mean absolute deviation. The mean absolute deviation (MAD) is the average.

Objectives The student will be able to:

Measure of Central Tendency and Spread of Data Notes.

Thinking Mathematically Statistics: 12.3 Measures of Dispersion.

1.4 Defining Data Spread An average alone doesn’t always describe a set of data effectively or completely. An average doesn’t indicate whether the data.

Standard Deviation A Measure of Variation in a set of Data.

Answering Descriptive Questions in Multivariate Research When we are studying more than one variable, we are typically asking one (or more) of the following.

Standard Deviation. Two classes took a recent quiz. There were 10 students in each class, and each class had an average score of 81.5.

Notes 5.1 Measures of Central Tendency A measure of central tendency is a single number that is used to represent a set of data. Measures of central tendency.

Organizing and Analyzing Data. Types of statistical analysis DESCRIPTIVE STATISTICS: Organizes data measures of central tendency mean, median, mode measures.

Welcome to… The Exciting World of Descriptive Statistics in Educational Assessment!

Section 12.4 Measures of Variation Math in Our World.

Normal Distribution. Normal Distribution Curve A normal distribution curve is symmetrical, bell-shaped curve defined by the mean and standard deviation.

CHAPTER 11 Mean and Standard Deviation. BOX AND WHISKER PLOTS  Worksheet on Interpreting and making a box and whisker plot in the calculator.

Lesson Topic: The Mean Absolute Deviation (MAD) Lesson Objective: I can…  I can calculate the mean absolute deviation (MAD) for a given data set.  I.

Ebola. Maths warm-up (2–3 hours)  Recap Stem and Leaf Diagrams  Recap Histograms  Recap Cumulative Frequency and Box Plots  Recap types of data 2.

Objectives The student will be able to: describe the variation of the data. find the mean absolute deviation of a data set.

Normal Distribution Students will be able to: find the variance of a data set. find the standard deviation of a data set. use normal distribution curve.

Chapter 2 The Mean, Variance, Standard Deviation, and Z Scores.

Objectives The student will be able to:

Objectives The student will be able to:

Unit 3 Standard Deviation

Do-Now-Day 2 Section 2.2 Find the mean, median, mode, and IQR from the following set of data values: 60, 64, 69, 73, 76, 122 Mean- Median- Mode- InterQuartile.

DESCRIBING A POPULATION

Standard Deviation.

Standard Deviation.

Standard Deviation.

Standard Deviation Calculate the mean Given a Data Set 12, 8, 7, 14, 4

11.1 Measures of Center and Variation

Standard Deviation.

Objectives The student will be able to:

Chapter 3 Variability Variability – how scores differ from one another. Which set of scores has greater variability? Set 1: 8,9,5,2,1,3,1,9 Set 2: 3,4,3,5,4,6,2,3.

Learning Targets I can: find the variance of a data set.

Math in Our World Section 12.4 Measures of Variation.

Measures in Variability

10.2 Variance Math Models.

What does the following mean?

Objectives The student will be able to:

A class took a quiz. The class was divided into teams of 10

Objectives The student will be able to:

Statistics 5/19/2019.

Standard Deviation.

Standard Deviation Mean - the average of a set of data

Numerical Statistics Measures of Variability

Calculating Standard Deviation

Standard Deviation.

Presentation transcript:

Standard Deviation

Two classes took a recent quiz. There were 10 students in each class, and each class had an average score of 81.5

Since the averages are the same, can we assume that the students in both classes all did pretty much the same on the exam?

The answer is… No. The average (mean) does not tell us anything about the distribution or variation in the grades.

Here are Dot-Plots of the grades in each class:

Mean

So, we need to come up with some way of measuring not just the average, but also the spread of the distribution of our data.

Why not just give an average and the range of data (the highest and lowest values) to describe the distribution of the data?

Well, for example, lets say from a set of data, the average is and the range is 23. But what if the data looked like this:

Here is the average And here is the range But really, most of the numbers are in this area, and are not evenly distributed throughout the range.

The Standard Deviation is a number that measures how far away each number in a set of data is from their mean.

If the Standard Deviation is large, it means the numbers are spread out from their mean. If the Standard Deviation is small, it means the numbers are close to their mean. small, large,

Here are the scores on the math quiz for Team A: Average: 81.5

The Standard Deviation measures how far away each number in a set of data is from their mean. For example, start with the lowest score, 72. How far away is 72 from the mean of 81.5? =

Or, start with the lowest score, 89. How far away is 89 from the mean of 81.5? =

So, the first step to finding the Standard Deviation is to find all the distances from the mean Distance from Mean

So, the first step to finding the Standard Deviation is to find all the distances from the mean Distance from Mean

Next, you need to square each of the distances to turn them all into positive numbers Distance from Mean Distances Squared

Next, you need to square each of the distances to turn them all into positive numbers Distance from Mean Distances Squared

Add up all of the distances Distance from Mean Distances Squared Sum: 214.5

Divide by (n - 1) where n represents the amount of numbers you have Distance from Mean Distances Squared Sum: (10 - 1) = 23.8

Finally, take the Square Root of the average distance Distance from Mean Distances Squared Sum: (10 - 1) = 23.8 = 4.88

This is the Standard Deviation Distance from Mean Distances Squared Sum: (10 - 1) = 23.8 = 4.88

Now find the Standard Deviation for the other class grades Distance from Mean Distances Squared Sum: (10 - 1) = = 15.91

Now, lets compare the two classes again Team ATeam B Average on the Quiz Standard Deviation