Advanced Math Topics 8.3-8.5 Sample Means. The Food and Drug Administration is inspecting a tobacco company for tar content. They randomly select 6 different.

Slides:

Advertisements

Similar presentations

Describing Distributions with Numbers BPS chapter 2 © 2006 W.H. Freeman and Company.

Advertisements

Median Find the median of the following 9 numbers:

MA-250 Probability and Statistics Nazar Khan PUCIT Lecture 3.

Distribution of Sample Means, the Central Limit Theorem If we take a new sample, the sample mean varies. Thus the sample mean has a distribution, called.

Chapter Six Sampling Distributions McGraw-Hill/Irwin Copyright © 2004 by The McGraw-Hill Companies, Inc. All rights reserved.

Standard Normal Distribution

Learning Objectives In this chapter you will learn about the importance of variation how to measure variation range variance standard deviation.

The Central Limit Theorem For simple random samples from any population with finite mean and variance, as n becomes increasingly large, the sampling distribution.

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 8 Lecture 3 Sections: 8.4 – 8.5. Assumptions 1. The sample is a simple random sample. 2. The value of the population standard deviation σ is known.

EXAM TOMORROW Aim: Review for Exam. Properties of Standard deviation SD measures the spread about the mean and should be used only when the mean is chosen.

Unit 3 Section 3-3 – Day : Measures of Variation  Range – the highest value minus the lowest value.  The symbol R is used for range.  Variance.

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.

Warm-Up If the variance of a set of data is 12.4, what is the standard deviation? If the standard deviation of a set of data is 5.7, what is the variance?

Advanced Math Topics Chapters 8 and 9 Review. The average purchase by a customer in a large novelty store is $4.00 with a standard deviation of $0.85.

Non-standard Normal Distribution OBJ Determine the z-score of a non-standard normal distribution and find its area under the normal curve.

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

Applied Quantitative Analysis and Practices LECTURE#09 By Dr. Osman Sadiq Paracha.

Statistics 300: Elementary Statistics Section 6-5.

Chapter 6.3 The central limit theorem. Sampling distribution of sample means A sampling distribution of sample means is a distribution using the means.

AP Review #3: Continuous Probability (The Normal Distribution)

Produced by MEI on behalf of OCR © OCR 2013 Introduction to Quantitative Methods Statistical Problem Solving Normal distribution summary Notes for students.

Calculate Standard Deviation ANALYZE THE SPREAD OF DATA.

The Standard Normal Distribution Section 5.2. The Standard Score The standard score, or z-score, represents the number of standard deviations a random.

The Mean : A measure of centre The mean (often referred to as the average). Mean = sum of values total number of values.

THE NORMAL APPROXIMATION TO THE BINOMIAL. Under certain conditions the Normal distribution can be used as an approximation to the Binomial, thus reducing.

Copyright © 2012 Pearson Education, Inc. All rights reserved Chapter 9 Statistics.

Advanced Math Topics Chapters 6 and 7 Review. To find the mean of the probability distribution: μ = Σ x p(x) # of Heads (x)Probability /8 3/8.

Statistics topics from both Math 1 and Math 2, both featured on the GHSGT.

Topic 6: The distribution of the sample mean and linear combinations of random variables CEE 11 Spring 2002 Dr. Amelia Regan These notes draw liberally.

Reminder: What is a sampling distribution? The sampling distribution of a statistic is the distribution of all possible values of the statistic when all.

Chapter 18 - Part 2 Sampling Distribution Models for.

Term 1 Week 7 Warm Ups. Warm Up 9/22/14 1.Students were asked to measure the width of their desks in centimeters. Identify the outlier, and describe how.

Hw 1 Prob 1 A sample of 20 cigarettes is tested to determine nicotine content and the average value observed was 1.2 mg. Compute a 99 percent two-sided.

Advanced Math Topics 9.2/9.3 Estimating the Population Mean From a Large Sample.

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

STATISTICS Chapter 2 and and 2.2: Review of Basic Statistics Topics covered today:  Mean, Median, Mode  5 number summary and box plot  Interquartile.

Chapter 9 Day 2. Warm-up  If students picked numbers completely at random from the numbers 1 to 20, the proportion of times that the number 7 would be.

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.

THE CENTRAL LIMIT THEOREM. Sampling Distribution of Sample Means Definition: A distribution obtained by using the means computed from random samples of.

Describing Distributions with Numbers

Ch5.4 Central Limit Theorem

Objectives The student will be able to:

Chapter 5 Normal Probability Distributions.

Section 3.3 Measures of Variation.

Objectives The student will be able to:

Measures of Central Tendency

Continuous Random Variables

Elementary Statistics: Picturing The World

ANATOMY OF THE EMPIRICAL RULE

Continuous Random Variables

Sample vs Population comparing mean and standard deviations

The Normal Probability Distribution Summary

12/1/2018 Normal Distributions

Objectives The student will be able to:

Determine whether each situation calls for a survey, an experiment, or an observational study. Explain your reasoning. You want to find opinions on the.

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

Year-3 The standard deviation plus or minus 3 for 99.2% for year three will cover a standard deviation from to To calculate the normal.

7.5 The Normal Curve Approximation to the Binomial Distribution

Normal Probability Distributions

Normal Probability Distributions

What does the following mean?

Standard Deviation (SD) & Standard Error of the Mean (SEM)

Objectives The student will be able to:

Section 13.6 The Normal Curve

Objectives The student will be able to:

Chapter 5 Normal Probability Distributions.

Chapter 5 Normal Probability Distributions.

Presentation transcript:

Advanced Math Topics Sample Means

The Food and Drug Administration is inspecting a tobacco company for tar content. They randomly select 6 different boxes that each have 100 cigarettes and tests them. The average tar content of each box (mg content per cigarette) is shown below Find the mean and standard deviation This is read as “mu sub x bar” because it is the mean of the means. = 15.3

The Food and Drug Administration is inspecting a tobacco company for tar content. They randomly select 6 different boxes that each have 100 cigarettes and tests them. The average tar content of each box (mg content per cigarette) is shown below Find the mean and standard deviation Formula The standard deviation of the sample means is: – 15.3 = – 15.3 = – 15.3 = – 15.3 = – 15.3 = – 15.3 = -1.4 (0.5) 2 =.25 (0.9) 2 =.81 (-0.5) 2 =.25 (0.5) 2 =.25 (0.0) 2 = 0 (-1.4) 2 = 1.96 Sum = 3.52 σ =.7659 n is the # of sample means

The distribution of the sample means is approximately normally distributed. But can you follow this? From our previous example, we had a sample size of 100 cigarettes and the sample mean was The distribution would look something like this. μ x = 15.3 What if we had sample sizes of 50(instead of 100)? Likely, what would the sampling distribution mean be? 15.3, the same. Would the bell curve look the same? The smaller the sample size, it is more likely to have a sample mean that is an outlier. Thus, the bell curve would be more spread out. Thus, the standard deviation would be larger. In summary, as the size of the sample gets smaller, the standard deviation gets larger and the bell curve becomes more spread out.

From the HW P ) During each week of the first 6 weeks of the year, a doctor delivered 9, 10, 5, 8, 7 and 6 babies. 9,10; 9,5; 9,8; 9,7; 9,6; 10,5;…..7,6 There are 15 total samples. a) Make a list of all possible samples of size 2 that can be made from the list.

1) During each week of the first 6 weeks of the year, a doctor delivered 9, 10, 5, 8, 7 and 6 babies. The sample means are 9.5, 7, 8.5, 8, 7.5, 7.5, 9, 8.5, 8, 6.5, 6, 5.5, 7.5, 7, 6.5. b) Determine the mean of each of these samples and form a sampling distribution of these sample means.

From the HW P ) During each week of the first 6 weeks of the year, a doctor delivered 9, 10, 5, 8, 7 and 6 babies. 7.5 c) Determine the mean of the sampling distribution.

From the HW P ) During each week of the first 6 weeks of the year, a doctor delivered 9, 10, 5, 8, 7 and 6 babies d) Determine the standard deviation of the sampling distribution.

HW P. 419 #1, 2, 4(test-type question), 5a,b,c Explain why your two standard deviations are different in #5