Presentation is loading. Please wait.

Presentation is loading. Please wait.

The Normal Distribution (Gaussian Distribution)

Published bySylvia Neal Modified over 9 years ago

Similar presentations

Presentation on theme: "The Normal Distribution (Gaussian Distribution)"β€” Presentation transcript:

1 The Normal Distribution (Gaussian Distribution)
Honors Analysis Learning Target: I can analyze data using the normal distribution.

2 Carl Friedrich Gauss (1777-1855)
German mathematician Influenced statistics, algebra, number theory, geometry, physics. Child prodigy! Constructed heptadecagon Triangular numbers Proved Fundamental Theorem of Algebra Influenced development of statistics, including Normal Distribution (Gaussian Distribution) Carl Friedrich Gauss ( )

3 Imagine you took a test in two different classes.
In the first class, you made a 93%. The class mean was a 96%, and the standard deviation was 3%. In the second class, you made a 78%. The class mean was a 74%, and the standard deviation was 2%. Which test performance was better?

4 Normal Distribution (Gaussian Distribution)
𝜎=π‘ π‘‘π‘Žπ‘›π‘‘π‘Žπ‘Ÿπ‘‘ π‘‘π‘’π‘£π‘–π‘Žπ‘‘π‘–π‘œπ‘› πœ‡=π‘šπ‘’π‘Žπ‘› Normal Distribution (Gaussian Distribution)

5 68-95-99.7 Rule (Approximately) 68% within 1 std dev. of mean
95% within 2 std. deviations of mean 99.7% fall within 3 standard deviations of mean Rule

6 Labeling a Simple Normal Curve
Calculate the mean (central value on curve) Each region increases or decreases by one standard deviation from the mean Ex: Test score mean: 74% Std. dev: 2% Labeling a Simple Normal Curve

7 So what happens if you want to calculate a percentage for a value that ISN’T on your normal curve?
Ex: PSAT math test with mean of 48 and a std. deviation of 3. What percent of scores are below 50?

8 Standard Normal Distribution
Normal distribution with a mean of 0 and a standard deviation of 1. Total area under curve = 1 Area to left of a given value on the curve gives the percentile rank – percent of scores LOWER than a given score. Standard Normal Distribution

9 You can convert values to standard normal distribution form by calculating a z-score:
𝑍= π‘‹βˆ’πœ‡ 𝜎 Z-Score percentages can be looked up in a table or on a calculator. Z-Scores

10 Example

11

12

13

14

15 Solution

16 Example Part II

17

18

19

20

21

22

23 Types of Bias Unrepresentative Sample
Undercoverage (Convenience sample, voluntary sample) Non-response Bias Voluntary response Bias Measurement Error Response Bias (Leading questions, social desirability) Types of Bias

Download ppt "The Normal Distribution (Gaussian Distribution)"

Similar presentations

Percentiles and the Normal Curve

Percentiles and the Normal Curve
Chapter 13 Statistics Β© 2008 Pearson Addison-Wesley. All rights reserved.

Chapter 13 Statistics Β© 2008 Pearson Addison-Wesley. All rights reserved.
Objectives Look at Central Limit Theorem Sampling distribution of the mean.

Objectives Look at Central Limit Theorem Sampling distribution of the mean.
The Normal Curve Z Scores, T Scores, and Skewness.

The Normal Curve Z Scores, T Scores, and Skewness.
CONFIDENCE INTERVALS HONORS ADVANCED ALGEBRA PRESENTATION 1-9.

CONFIDENCE INTERVALS HONORS ADVANCED ALGEBRA PRESENTATION 1-9.
AP Statistics HW: p95 22 – 24, 27 (skip part c) Obj: to understand and use a z-score and standard normal distribution Do Now: The mean monthly cost of.

AP Statistics HW: p95 22 – 24, 27 (skip part c) Obj: to understand and use a z-score and standard normal distribution Do Now: The mean monthly cost of.
PPA 415 – Research Methods in Public Administration Lecture 5 – Normal Curve, Sampling, and Estimation.

PPA 415 – Research Methods in Public Administration Lecture 5 – Normal Curve, Sampling, and Estimation.
Lesson #17 Sampling Distributions. The mean of a sampling distribution is called the expected value of the statistic. The standard deviation of a sampling.

Lesson #17 Sampling Distributions. The mean of a sampling distribution is called the expected value of the statistic. The standard deviation of a sampling.

z-Scores What is a z-Score? How Are z-Scores Useful? Distributions of z-Scores Standard Normal Curve.

z-Scores What is a z-Score? How Are z-Scores Useful? Distributions of z-Scores Standard Normal Curve.
Discrete and Continuous Random Variables Continuous random variable: A variable whose values are not restricted. 12.5 – The Normal Distribution Discrete.

Discrete and Continuous Random Variables Continuous random variable: A variable whose values are not restricted – The Normal Distribution Discrete.
Chapter 5 DESCRIBING DATA WITH Z-SCORES AND THE NORMAL CURVE.

Chapter 5 DESCRIBING DATA WITH Z-SCORES AND THE NORMAL CURVE.
Unit 5 Data Analysis.

Unit 5 Data Analysis.
Quiz 5 Normal Probability Distribution.

Quiz 5 Normal Probability Distribution.
Chapter 7 Confidence Intervals and Sample Sizes

Chapter 7 Confidence Intervals and Sample Sizes
1 Applied Calculus II Confidence Tests Slides subject to change.

1 Applied Calculus II Confidence Tests Slides subject to change.
Many times in statistical analysis, we do not know the TRUE mean of a population of interest. This is why we use sampling to be able to generalize the.

Many times in statistical analysis, we do not know the TRUE mean of a population of interest. This is why we use sampling to be able to generalize the.
In 2009, the mean mathematics score was 21 with a standard deviation of 5.3 for the ACT mathematics section. ReferenceReference Draw the normal curve in.

In 2009, the mean mathematics score was 21 with a standard deviation of 5.3 for the ACT mathematics section. ReferenceReference Draw the normal curve in.
Many times in statistical analysis, we do not know the TRUE mean of a population of interest. This is why we use sampling to be able to generalize the.

Many times in statistical analysis, we do not know the TRUE mean of a population of interest. This is why we use sampling to be able to generalize the.
Population All members of a set which have a given characteristic. Population Data Data associated with a certain population. Population Parameter A measure.

Population All members of a set which have a given characteristic. Population Data Data associated with a certain population. Population Parameter A measure.

Similar presentations

Ads by Google