Chapter 7 Hypothesis testing. §7.1 The basic concepts of hypothesis testing  1 An example Example 7.1 We selected 20 newborns randomly from a region.

Slides:

Advertisements

Similar presentations

Chapter 7 Hypothesis Testing

Advertisements

“Students” t-test.

Hypothesis testing Another judgment method of sampling data.

Hypothesis Testing A hypothesis is a claim or statement about a property of a population (in our case, about the mean or a proportion of the population)

1 1 Slide © 2008 Thomson South-Western. All Rights Reserved Chapter 9 Hypothesis Testing Developing Null and Alternative Hypotheses Developing Null and.

Chapter 10 Section 2 Hypothesis Tests for a Population Mean

1 1 Slide Hypothesis Testing Chapter 9 BA Slide Hypothesis Testing The null hypothesis, denoted by H 0, is a tentative assumption about a population.

Introduction to Hypothesis Testing

Hypothesis Testing Steps of a Statistical Significance Test. 1. Assumptions Type of data, form of population, method of sampling, sample size.

Sample size computations Petter Mostad

Chapter 6 Hypotheses texts. Central Limit Theorem Hypotheses and statistics are dependent upon this theorem.

1/55 EF 507 QUANTITATIVE METHODS FOR ECONOMICS AND FINANCE FALL 2008 Chapter 10 Hypothesis Testing.

Lecture 2: Thu, Jan 16 Hypothesis Testing – Introduction (Ch 11)

Introduction to Hypothesis Testing

Chapter 3 Hypothesis Testing. Curriculum Object Specified the problem based the form of hypothesis Student can arrange for hypothesis step Analyze a problem.

BCOR 1020 Business Statistics Lecture 21 – April 8, 2008.

Chapter 9 Hypothesis Testing.

BCOR 1020 Business Statistics Lecture 20 – April 3, 2008.

Irwin/McGraw-Hill © The McGraw-Hill Companies, Inc., 2000 LIND MASON MARCHAL 1-1 Chapter Eight Tests of Hypothesis Large Samples GOALS When you have completed.

Business Statistics - QBM117 Testing hypotheses about a population mean.

Hypothesis Testing with Two Samples

Statistics 11 Hypothesis Testing Discover the relationships that exist between events/things Accomplished by: Asking questions Getting answers In accord.

1 © Lecture note 3 Hypothesis Testing MAKE HYPOTHESIS ©

Introduction to Hypothesis Testing

Hypothesis testing is used to make decisions concerning the value of a parameter.

8 - 1 © 2003 Pearson Prentice Hall Chi-Square (  2 ) Test of Variance.

Copyright © 2013 Pearson Education, Inc. Publishing as Prentice Hall Statistics for Business and Economics 8 th Edition Chapter 9 Hypothesis Testing: Single.

Fundamentals of Hypothesis Testing: One-Sample Tests

Chapter 5 Sampling and Statistics Math 6203 Fall 2009 Instructor: Ayona Chatterjee.

1 Chapter 10: Section 10.1: Vocabulary of Hypothesis Testing.

The paired sample experiment The paired t test. Frequently one is interested in comparing the effects of two treatments (drugs, etc…) on a response variable.

Week 8 Fundamentals of Hypothesis Testing: One-Sample Tests

1 Power and Sample Size in Testing One Mean. 2 Type I & Type II Error Type I Error: reject the null hypothesis when it is true. The probability of a Type.

Chapter 10 Hypothesis Testing

1 Hypothesis testing can be used to determine whether Hypothesis testing can be used to determine whether a statement about the value of a population parameter.

Hypothesis testing Chapter 9. Introduction to Statistical Tests.

STA Statistical Inference

Chapter 6 Lecture 3 Sections: 6.4 – 6.5.

Maximum Likelihood Estimator of Proportion Let {s 1,s 2,…,s n } be a set of independent outcomes from a Bernoulli experiment with unknown probability.

Chapter 12 Tests of a Single Mean When σ is Unknown.

10.2 Tests of Significance Use confidence intervals when the goal is to estimate the population parameter If the goal is to.

Statistical Hypotheses & Hypothesis Testing. Statistical Hypotheses There are two types of statistical hypotheses. Null Hypothesis The null hypothesis,

1 Chapter 8 Hypothesis Testing 8.2 Basics of Hypothesis Testing 8.3 Testing about a Proportion p 8.4 Testing about a Mean µ (σ known) 8.5 Testing about.

1 Chapter 9 Hypothesis Testing. 2 Chapter Outline  Developing Null and Alternative Hypothesis  Type I and Type II Errors  Population Mean: Known 

Economics 173 Business Statistics Lecture 4 Fall, 2001 Professor J. Petry

Statistical Inference for the Mean Objectives: (Chapter 9, DeCoursey) -To understand the terms: Null Hypothesis, Rejection Region, and Type I and II errors.

Copyright ©2013 Pearson Education, Inc. publishing as Prentice Hall 9-1 σ σ.

Education 793 Class Notes Decisions, Error and Power Presentation 8.

1 When we free ourselves of desire, we will know serenity and freedom.

Chap 8-1 Fundamentals of Hypothesis Testing: One-Sample Tests.

Ex St 801 Statistical Methods Inference about a Single Population Mean.

Inen 460 Lecture 2. Estimation (ch. 6,7) and Hypothesis Testing (ch.8) Two Important Aspects of Statistical Inference Point Estimation – Estimate an unknown.

Understanding Basic Statistics Fourth Edition By Brase and Brase Prepared by: Lynn Smith Gloucester County College Chapter Nine Hypothesis Testing.

§2.The hypothesis testing of one normal population.

Hypothesis Testing Steps for the Rejection Region Method State H 1 and State H 0 State the Test Statistic and its sampling distribution (normal or t) Determine.

Chapter 9: Hypothesis Tests for One Population Mean 9.2 Terms, Errors, and Hypotheses.

Hypothesis Testing.  Hypothesis is a claim or statement about a property of a population.  Hypothesis Testing is to test the claim or statement  Example.

Chapter 7: Hypothesis Testing. Learning Objectives Describe the process of hypothesis testing Correctly state hypotheses Distinguish between one-tailed.

Copyright © 2013 Pearson Education, Inc. Publishing as Prentice Hall Statistics for Business and Economics 8 th Edition Chapter 9 Hypothesis Testing: Single.

Statistical Inference for the Mean Objectives: (Chapter 8&9, DeCoursey) -To understand the terms variance and standard error of a sample mean, Null Hypothesis,

 What is Hypothesis Testing?  Testing for the population mean  One-tailed testing  Two-tailed testing  Tests Concerning Proportions  Types of Errors.

Chapter 9 Hypothesis Testing Understanding Basic Statistics Fifth Edition By Brase and Brase Prepared by Jon Booze.

4-1 Statistical Inference Statistical inference is to make decisions or draw conclusions about a population using the information contained in a sample.

Chapter Nine Hypothesis Testing.

Chapter 8 Hypothesis Testing with Two Samples.

Hypothesis Testing: Hypotheses

CONCEPTS OF HYPOTHESIS TESTING

Chapter 9 Hypothesis Testing.

Chapter Nine Part 1 (Sections 9.1 & 9.2) Hypothesis Testing

More About Tests Notes from

Presentation transcript:

Chapter 7 Hypothesis testing

§7.1 The basic concepts of hypothesis testing  1 An example Example 7.1 We selected 20 newborns randomly from a region in 2002, the average weight of them is 3160g, the sample standard deviation of the weight is 300g, and based on past statistics, the average weight of newborn is 3140g. If the weight of obeys normal distribution. Is there any significant difference about the weight between the newborn in 2002 and the old ones?

 Let denote the weight of newborn, then based on the hypothesis, we have.The problem is that whether the mean of population is equal to 3140g or not, which can be expressed as, This hypothesis is called zero hypotheses or the original hypothesis.  If is not correct, so is correct. This hypothesis could be called the alternative hypothesis. The above hypothesis testing problem is often expressed as.

2, significant test  According to statistics, in the past, the average weight of newborns is 3140g, while in 2002, the average weight of newborn samples is 3160g, a difference in 20g, this difference may arise in two situations. One is that there is no essential difference in them, the difference in 20g is only caused by the randomness of the sample; another is caused by the essential difference in them. So the point is whether the difference can be explained by the randomness of sample or not.

 The sample mean is a good estimation of the population mean, if, should be relatively small, we should establish a reasonable limit, When,we accept the zero hypothesis ;Otherwise,we will accept alternative hypothesis.

 We know that , Setting =0.01,, if the observation of satisfies,that is to say the small probability event occur. Generally speaking, small probability events will not occur in one experiment, so we believe is unreasonable, we call critical region. Otherwise, we have not enough evidence to reject,so we accept.Which is called significant test.

3,Two types of errors  1. The original hypothesis is actually correct, but the test result wrongly reject it, which commit "abandoning true" errors, often referred to as type I error.  2. The original hypothesis is not right, but the test result wrongly accept it, which commit "maintaining false " errors, often referred to as type II error. As the sample is random, so we are committing two types of errors on certain probability. In statistics, we call the probability of committing type I error the significance level, abbreviated as the level. Naturally, people desire the probability of committing two types of errors as small as possible, but for a given sample size, We can not reduce the probability of committing two types of errors simultaneously, Commonly, we often fix the upper bound of the probability of committing type I error, and then select a test with smaller probability of committing type II error.

§7.2 single normal population hypothesis testing  Let denote a random sample from a normal distribution, is significance level.  1 Test of mean 1.1 Variance known The problem as follows When is true, then, thus So the critical region is.

 Example 7.2 Let us assume,we have nine random samples,and the mean is 4.484,suppose the variance have no change, testing the following problem with the significance level. =1.96, ， we get, Then can be accepted.

1.2 Variance unknown  The problem as follows, When is true, then , Thus, So the critical region is.

 Example 7.3  Let us assume have normal distribution,we have 25 random samples,and the mean is 66.5,and the standard deviation of sample is 15, testing the following problem with the significance level. ， 2.06,,we get, Then can be accepted.

 There are still two other kinds of problem of testing mean as follows

2 Test of variance  The problem as follows  When is true, then  thus So the critical region is

 Example 7.4 Let us assume have normal distribution,we have 5 random samples, 1.32, 1.55, 1.36, 1.40, 1.44, and the standard deviation is, testing the following problem with the significance level.,,From the given sample,we have,hence, So we reject.

 There are still two other kinds of problem of testing variance as follows ; .

§7.3 double normal population hypothesis testing  Let denote a random sample of size from a distribution that is  denote a random sample of size from a distribution that is where, are unknown parameters, the two random samples are independent

1., testing of  The problem as follows  When is true, then ,  Thus, So the critical region is .

 Example 7.4 Let us assume and both have normal distribution with equal variances,we have the following random samples, X 24.3, 20.8, 23.7, 21.3, 17.4; Y 18.2, 16.9, 20.2, testing the following problem with the significance level

 Using similar methods above to discuss the following problems 

2 testing of  The problem as follows  When is true, then , hence  So the critical region is.

 Using similar methods above to discuss the following problems,

 Example 7.5 There are two team A and B participate a paper contest, A team have 9 people,and B team have 8 people,the score as follows: A team 85, 59, 66, 81, 35, 57, 76, 63, 78, B team 65, 72, 69, 65, 58, 68, 52, 64, Can we believe the variance of B team is significantly greater than A team ’ s concerning the significance level 0.05?