Sampling Distribution, Chp. 9. 1. Know the difference between a parameter and a statistic.

Slides:



Advertisements
Similar presentations
THE CENTRAL LIMIT THEOREM
Advertisements

AP Statistics Thursday, 23 January 2014 OBJECTIVE TSW investigate sampling distributions. TESTS are not graded.
Sampling Distributions
 These 100 seniors make up one possible sample. All seniors in Howard County make up the population.  The sample mean ( ) is and the sample standard.
AP Statistics Thursday, 22 January 2015 OBJECTIVE TSW investigate sampling distributions. –Everyone needs a calculator. TESTS are not graded. REMINDERS.
Reminders: Parameter – number that describes the population Statistic – number that is computed from the sample data Mean of population = µ Mean of sample.
Terminology A statistic is a number calculated from a sample of data. For each different sample, the value of the statistic is a uniquely determined number.
Chapter 10: Sampling and Sampling Distributions
The Central Limit Theorem Section Starter Assume I have 1000 pennies in a jar Let X = the age of a penny in years –If the date is 2007, X = 0 –If.
9.1 Sampling Distributions A parameter is a number that describes the population. A parameter is a fixed number, but in practice we do not know its value.
The Basics  A population is the entire group on which we would like to have information.  A sample is a smaller group, selected somehow from.
CHAPTER 11: Sampling Distributions
Review of normal distribution. Exercise Solution.
UNIT FOUR/CHAPTER NINE “SAMPLING DISTRIBUTIONS”. (1) “Sampling Distribution of Sample Means” > When we take repeated samples and calculate from each one,
A P STATISTICS LESSON 9 – 1 ( DAY 1 ) SAMPLING DISTRIBUTIONS.
9.1 – Sampling Distributions. Many investigations and research projects try to draw conclusions about how the values of some variable x are distributed.
Sampling Distributions. Parameter A number that describes the population Symbols we will use for parameters include  - mean  – standard deviation.
Sampling Distributions. Parameter A number that describes the population Symbols we will use for parameters include  - mean  – standard deviation.
AP Statistics Chapter 9 Notes.
AP Statistics 9.3 Sample Means.
Sampling Distribution of a sample Means
AP STATISTICS LESSON SAMPLE MEANS. ESSENTIAL QUESTION: How are questions involving sample means solved? Objectives:  To find the mean of a sample.
Section 5.2 The Sampling Distribution of the Sample Mean.
Chapter 7: Sampling and Sampling Distributions
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.
Distributions of the Sample Mean
CHAPTER 15: Sampling Distributions
Lesson Introduction to the Practice of Statistics.
Stat 1510: Sampling Distributions
Chapter 9 Indentify and describe sampling distributions.
An opinion poll asks, “Are you afraid to go outside at night within a mile of your home because of crime?” Suppose that the proportion of all adults who.
Review Normal Distributions –Draw a picture. –Convert to standard normal (if necessary) –Use the binomial tables to look up the value. –In the case of.
Section 9.1 Sampling Distributions AP Statistics February 4, 2009 Berkley High School, D1B2.
Chapter 5 Sampling Distributions. The Concept of Sampling Distributions Parameter – numerical descriptive measure of a population. It is usually unknown.
Parameter or statistic? The mean income of the sample of households contacted by the Current Population Survey was $60,528.
Sampling Distributions. Parameter  A number that describes the population  Symbols we will use for parameters include  - mean  – standard deviation.
Chapter 7 Data for Decisions. Population vs Sample A Population in a statistical study is the entire group of individuals about which we want information.
Sampling Distributions: Suppose I randomly select 100 seniors in Anne Arundel County and record each one’s GPA
m/sampling_dist/index.html.
MATH Section 4.4.
Sampling Distributions. Terms P arameter - a number (usually unknown) that describes a p opulation. S tatistic – a number that can be computed from s.
Section 9.1 Sampling Distributions AP Statistics January 31 st 2011.
Section 7.1 Sampling Distributions. Vocabulary Lesson Parameter A number that describes the population. This number is fixed. In reality, we do not know.
Sampling Distributions Chapter 18. Sampling Distributions A parameter is a number that describes the population. In statistical practice, the value of.
Section Parameter v. Statistic 2 Example 3.
WARM UP: Penny Sampling 1.) Take a look at the graphs that you made yesterday. What are some intuitive takeaways just from looking at the graphs?
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.
Chapter 9 Sampling Distributions 9.1 Sampling Distributions.
9.1 Sampling Distribution. ◦ Know the difference between a statistic and a parameter ◦ Understand that the value of a statistic varies between samples.
Chapter 8 Sampling Distributions. Parameter A number that describes the population Symbols we will use for parameters include  - mean  – standard.
Sampling Distributions
Sampling Distributions
WARM -UP Through data compiled by the auto industry 12% of Americans are planning on buying a hybrid. A recent national poll randomly asked 500 adults.
Section 9.1 Sampling Distributions
Sampling Distributions
Chapter 5 Sampling Distributions
MATH 2311 Section 4.4.
Sampling Distributions
Section 7.1 Sampling Distributions
Calculating Probabilities for Any Normal Variable
CHAPTER 15 SUMMARY Chapter Specifics
Sampling Distributions
Sampling Distributions
Section 9.1 Sampling Distributions
Sampling Distribution Models
Chapter 5 Sampling Distributions
Sampling Distributions
Sampling Distributions
MATH 2311 Section 4.4.
Presentation transcript:

Sampling Distribution, Chp. 9

1. Know the difference between a parameter and a statistic.

Parameter - A parameter is a number that describes the population. In most all cases the actual parameter in not known b/c the entire population cannot be examined. Proportion = Mean = Statistic – A statistic is a number that is calculated from the sample data to estimate an unknown parameter. Proportion = Mean =

The ball bearing in a large container have mean diameter centimeters. This is within the specifications for acceptance of the container by the purchaser. By chance, an inspector chooses 100 bearings from the container that have mean diameter cm. Because this is outside the specified limits, the container is mistakenly rejected.

The Bureau of Labor Statistics last month interviewed 60,000 members of the U.S. labor force of whom 7.2% were unemployed.

Sampling Distribution – The sampling distribution of a statistic is the distribution of values taken by the statistic in all possible samples of the same size from the same population.

Unbiased Statistic / Unbiased Estimator. A statistic used to estimate a parameter is unbiased if the mean of its sampling distribution is equal to the true value of the parameter being estimated.

Variability of a Statistic. The variability of a statistic is the spread of its sampling distribution. This spread is determined by the sampling design and the size of the sample. The larger the sample the smaller the spread. As long as the population is much larger than the sample ( 10 times larger) the spread of the sampling distribution should be approximately the same for any population size.

What type of probability question could be asked?

From a population, 60% approve of gambling, determine the probability that: a.You will get a sample of 70% or more that approve of gambling with a sample size of 25. b.You will get a sample of 70% or more that approve of gambling with a sample size of 100.

Penny Activity 1. This activity begins by plotting the distribution of ages (in years) of pennies. Sketch a density curve that you and your partner think will capture the shape of the distribution of ages of the pennies ………… (age of pennies)

YearAgeFrequency (and so on)2

3. Put your 25 pennies in a cup, and randomly select 5 pennies. Find the average age of the 5 pennies in your sample, and record the mean age as (5). 2 times 4. Repeat step 3, except this time randomly select 10 pennies. Calculate the average age of the sample of 10 pennies, and record this as (10). 2 times 5. Repeat step 3 but take 25 pennies. Record the mean age as (25). 1 time

February 4, 2016 Objectives: 1.Sampling Distribution of quantifiable data (mean). 2.Central Limit Theorem.

Population has a normal distribution = the sampling distribution is normal regardless of sample size. Any population shape = using a small sample size the sampling distribution will have similar shape. Any population shape = Large sample size (n>30), the sampling distribution will be approx. normal.

The composite scores of students on the ACT college entrance examination in a recent year had a Normal distribution with mean µ = 20.4 and standard deviation = What is the probability that a randomly chosen student scored 24 or higher on the ACT? 2.What are the mean and standard deviation of the average ACT score for an SRS of 30 students? 3.What is the probability that the average ACT score of an SRS of 30 students is 24 or higher?