Presentation is loading. Please wait.

Presentation is loading. Please wait.

Sampling Distribution Models

Published byDale Stafford Modified over 5 years ago

Similar presentations

Presentation on theme: "Sampling Distribution Models"— Presentation transcript:

1 Sampling Distribution Models
Population – all items of interest. Population Parameter Inference We are ready to start putting together the pieces to come up with how to use sample statistics to make inferences, educated guesses, about population parameters. Remember our picture of the population and sample. We will not complete the process by introducing the idea of using a sample statistics as an estimate of the population parameter. But before that we need to know a little more about how sample statistics based on random samples from a population behave. Sample – a few items from the population. Sample Statistic Random selection

2 Proportions So far we have used the sample proportion, , to make inferences about the population proportion p. To do this we needed the distribution of .

3 Distribution of Shape: Approximately Normal if conditions are met.
Center: The mean is p. Spread: The standard deviation is

4 Categorical Variable When the response variable of interest is categorical, the parameter is the proportion of the population that falls in a particular category, p.

5 Quantitative Variable
When the response variable of interest is quantitative, the parameter is the mean of the population, .

6 Means We will use the sample mean,
, to make inferences about the population mean, . To do this we need the distribution of .

7 Simulation

8 Simulation Simple random sample of size n=5. Repeat many times.
Record the sample mean, , to simulate the distribution of .

9 Simulation Different samples will produce different sample means.
There is variation in the sample means. Can we model this variation?

10

11 Population Shape: Basically normal Center: Mean,
Spread: Standard Deviation,

12 Distribution of n = 5 Shape: Normal Center: Mean,
Spread: Standard Deviation,

13

14 Population Shape: Not normal, skewed right Center: Mean,
Spread: Standard Deviation,

15 Distribution of n = 5 Shape: Approximately normal Center: Mean,
Spread: Standard Deviation,

16

17 Population Shape: Not normal, skewed right Center: Mean,
Spread: Standard Deviation,

18 Distribution of n = 25 Shape: Approximately normal Center: Mean,
Spread: Standard Deviation,

19 Central Limit Theorem When selecting random samples from a population with a distribution that is not normal, the sampling distribution of will be approximately normally distributed. The larger the sample the better the approximation.

20 Conditions Random sampling condition 10% condition
Samples must be selected at random from the population. 10% condition When sampling without replacement, the sample size should be less than 10% of the population size.

21 Summary Distribution of Shape: Approximately normal Center: Spread:

Download ppt "Sampling Distribution Models"

Similar presentations

Statistics : Statistical Inference Krishna.V.Palem Kenneth and Audrey Kennedy Professor of Computing Department of Computer Science, Rice University 1.

Statistics : Statistical Inference Krishna.V.Palem Kenneth and Audrey Kennedy Professor of Computing Department of Computer Science, Rice University 1.
Copyright © 2010 Pearson Education, Inc. Chapter 18 Sampling Distribution Models.

Copyright © 2010 Pearson Education, Inc. Chapter 18 Sampling Distribution Models.
6-1 6-2 Chapter Six Sampling Distributions McGraw-Hill/Irwin Copyright © 2004 by The McGraw-Hill Companies, Inc. All rights reserved.

Chapter Six Sampling Distributions McGraw-Hill/Irwin Copyright © 2004 by The McGraw-Hill Companies, Inc. All rights reserved.
Chapter 7: Variation in repeated samples – Sampling distributions

Chapter 7: Variation in repeated samples – Sampling distributions
Normal and Sampling Distributions A normal distribution is uniquely determined by its mean, , and variance,  2 The random variable Z = (X-  /  is.

Normal and Sampling Distributions A normal distribution is uniquely determined by its mean, , and variance,  2 The random variable Z = (X-  /  is.
QUIZ CHAPTER Seven Psy302 Quantitative Methods. 1. A distribution of all sample means or sample variances that could be obtained in samples of a given.

QUIZ CHAPTER Seven Psy302 Quantitative Methods. 1. A distribution of all sample means or sample variances that could be obtained in samples of a given.
UNIT FOUR/CHAPTER NINE “SAMPLING DISTRIBUTIONS”. (1) “Sampling Distribution of Sample Means” > When we take repeated samples and calculate from each one,

UNIT FOUR/CHAPTER NINE “SAMPLING DISTRIBUTIONS”. (1) “Sampling Distribution of Sample Means” > When we take repeated samples and calculate from each one,
STA 291 - Lecture 161 STA 291 Lecture 16 Normal distributions: ( mean and SD ) use table or web page. The sampling distribution of and are both (approximately)

STA Lecture 161 STA 291 Lecture 16 Normal distributions: ( mean and SD ) use table or web page. The sampling distribution of and are both (approximately)
AP Statistics Chapter 9 Notes.

AP Statistics Chapter 9 Notes.
STA291 Statistical Methods Lecture 16. Lecture 15 Review Assume that a school district has 10,000 6th graders. In this district, the average weight of.

STA291 Statistical Methods Lecture 16. Lecture 15 Review Assume that a school district has 10,000 6th graders. In this district, the average weight of.
LECTURE 16 TUESDAY, 31 March STA 291 Spring 2009 1.

LECTURE 16 TUESDAY, 31 March STA 291 Spring
Copyright © 2009 Pearson Education, Inc. Chapter 18 Sampling Distribution Models.

Copyright © 2009 Pearson Education, Inc. Chapter 18 Sampling Distribution Models.
Statistics Workshop Tutorial 5 Sampling Distribution The Central Limit Theorem.

Statistics Workshop Tutorial 5 Sampling Distribution The Central Limit Theorem.
Population and Sample The entire group of individuals that we want information about is called population. A sample is a part of the population that we.

Population and Sample The entire group of individuals that we want information about is called population. A sample is a part of the population that we.
Chap 7-1 Basic Business Statistics (10 th Edition) Chapter 7 Sampling Distributions.

Chap 7-1 Basic Business Statistics (10 th Edition) Chapter 7 Sampling Distributions.
Sampling Distributions Chapter 18. Sampling Distributions A parameter is a measure of the population. This value is typically unknown. (µ, σ, and now.

Sampling Distributions Chapter 18. Sampling Distributions A parameter is a measure of the population. This value is typically unknown. (µ, σ, and now.
Sampling Theory and Some Important Sampling Distributions.

Sampling Theory and Some Important Sampling Distributions.
Chapter 18 Sampling Distribution Models *For Means.

Chapter 18 Sampling Distribution Models *For Means.
Lecture 5 Introduction to Sampling Distributions.

Lecture 5 Introduction to Sampling Distributions.
Sampling Distributions: Suppose I randomly select 100 seniors in Anne Arundel County and record each one’s GPA. 1.951.981.862.042.752.722.063.362.092.06.

Sampling Distributions: Suppose I randomly select 100 seniors in Anne Arundel County and record each one’s GPA

Similar presentations

Ads by Google