Ch. 8 Estimating with Confidence

Slides:



Advertisements
Similar presentations
Chapter 8: Estimating with Confidence
Advertisements

Confidence Intervals: The Basics
CHAPTER 8 Estimating with Confidence
Chapter 10: Estimating with Confidence
Confidence Intervals. Estimating the difference due to error that we can expect between sample statistics and the population parameter.
Ch 8 Estimating with Confidence. Today’s Objectives ✓ I can interpret a confidence level. ✓ I can interpret a confidence interval in context. ✓ I can.
CHAPTER 8 Estimating with Confidence
AP Statistics Chapter 9 Notes.
+ The Practice of Statistics, 4 th edition – For AP* STARNES, YATES, MOORE Chapter 8: Estimating with Confidence Section 8.1 Confidence Intervals: The.
PARAMETRIC STATISTICAL INFERENCE
Ch 8 Estimating with Confidence. Today’s Objectives ✓ I can interpret a confidence level. ✓ I can interpret a confidence interval in context. ✓ I can.
Confidence Intervals: The Basics BPS chapter 14 © 2006 W.H. Freeman and Company.
Section 10.1 Confidence Intervals
+ “Statisticians use a confidence interval to describe the amount of uncertainty associated with a sample estimate of a population parameter.”confidence.
1 Section 10.1 Estimating with Confidence AP Statistics January 2013.
Chapter 10: Confidence Intervals
Ch 8 Estimating with Confidence 8.1: Confidence Intervals.
10.1 – Estimating with Confidence. Recall: The Law of Large Numbers says the sample mean from a large SRS will be close to the unknown population mean.
8.1 Confidence Intervals: The Basics Objectives SWBAT: DETERMINE the point estimate and margin of error from a confidence interval. INTERPRET a confidence.
10.1 Estimating with Confidence Chapter 10 Introduction to Inference.
CHAPTER 8 (4 TH EDITION) ESTIMATING WITH CONFIDENCE CORRESPONDS TO 10.1, 11.1 AND 12.1 IN YOUR BOOK.
Chapter 8: Estimating with Confidence
+ The Practice of Statistics, 4 th edition – For AP* STARNES, YATES, MOORE Chapter 8: Estimating with Confidence Section 8.1 Confidence Intervals: The.
Warm Up- Class work Activity 10 Pg.534 -each person tosses the pin 50 times
CHAPTER 8 ESTIMATING WITH CONFIDENCE 8.1 Confidence Intervals: The Basics Outcome: I will determine the point estimate and margin of error from a confidence.
+ The Practice of Statistics, 4 th edition – For AP* STARNES, YATES, MOORE Chapter 8: Estimating with Confidence Section 8.1 Confidence Intervals: The.
Inference: Conclusion with Confidence
Chapter 8: Estimating with Confidence
CHAPTER 8 Estimating with Confidence
CHAPTER 8 Estimating with Confidence
Chapter 8: Estimating with Confidence
Confidence Intervals with Means
CHAPTER 8 Estimating with Confidence
Inference: Conclusion with Confidence
CHAPTER 10 Estimating with Confidence
CHAPTER 8 Estimating with Confidence
CHAPTER 8 Estimating with Confidence
Unit 8: Estimating with Confidence
CHAPTER 8 Estimating with Confidence
Introduction to Inference
Confidence Intervals for a Population Mean, Standard Deviation Known

CHAPTER 8 Estimating with Confidence
Chapter 8: Estimating with Confidence
Confidence Intervals: The Basics
Chapter 10: Estimating with Confidence
Chapter 8: Estimating with Confidence
Confidence Intervals with Proportions
CHAPTER 8 Estimating with Confidence
CHAPTER 8 Estimating with Confidence
Chapter 8: Estimating with Confidence
Chapter 8: Estimating with Confidence
Chapter 8: Estimating With Confidence
Chapter 8: Estimating with Confidence
CHAPTER 8 Estimating with Confidence
CHAPTER 8 Estimating with Confidence
CHAPTER 8 Estimating with Confidence
Chapter 8: Estimating with Confidence
Chapter 8: Estimating with Confidence
Chapter 8: Estimating with Confidence
Chapter 8: Confidence Intervals
Chapter 8: Estimating with Confidence
Chapter 8: Estimating with Confidence
Chapter 8: Estimating with Confidence
Chapter 8: Estimating with Confidence
CHAPTER 8 Estimating with Confidence
CHAPTER 8 Estimating with Confidence
2.) A. Incorrect, the prob. Is either 0 or 1, but we don’t know which.
Chapter 8: Estimating with Confidence
Introduction to Inference
Presentation transcript:

Ch. 8 Estimating with Confidence Ch. 8-1 Confidence Intervals: The Basics

confidence intervals significance tests confidence intervals significance tests Introducing confidence intervals visually. I need a volunteer.

current AP Stats students 𝜇 4 students 𝑥 Let’s take a sample of 4 and find 𝑥 Based on our sample, we estimate the mean exam score is ___

point estimator statistic parameter point estimate What does this remind you of? Ch. 7 sampling distribution Sampling Distribution of 𝑥 normal because pop. dist. is normal N(𝜇, 𝜎 𝑥 ) 𝜇 (unknown mean) = 10 4 =5 𝜎 𝑥 = 𝜎 𝑛 𝜇 10% condition 2 5 =10 𝑛≤ 1 10 𝑁 4≤ 1 10 40 10

______ 10 Write this every time!! ____ ±10= , REMEMBER THE WORDING!! ____ ±10= , REMEMBER THE WORDING!! We are 95% confident that the interval from _______ to _______ captures the actual value of the mean final exam score. context confident We don’t say 95% chance or probability of capturing the actual value of the parameter because the interval either does (prob = 1) or doesn’t capture it (prob = 0).

The confidence level 𝐶 tells us how likely it is that the method we are using will produce an interval that captures the population parameter if we use it many times. Doesn’t tell us the chance that a particular interval captures the parameter. A confidence interval gives a set of plausible values for the parameter. If we were to repeat the sampling procedure many times, about 95% of the confidence intervals computed would capture the mean final exam score. 𝑥 = ____ _____ ± 10= , 𝑥 = ____ _____ ± 10= , Use the Java applet to take many many samples of size 4 to make many many confidence intervals. Draw the picture to the right.

How much does the fat content of Brand X hot dogs vary How much does the fat content of Brand X hot dogs vary? To find out, researchers measured the fat content (in grams) of a random sample of 10 Brand X hot dogs. A 95% confidence interval for the population standard deviation σ is 2.84 to 7.55. Interpret the confidence interval. Interpret the confidence level. True or false: The interval from 2.84 to 7.55 has a 95% chance of containing the actual population standard deviation σ. Justify your answer. We are 95% confident that the interval from 2.84 to 7.55 g captures the true standard deviation of the fat content of Brand X hot dogs. If we were to repeat the sampling procedure many times, about 95% of the confidence intervals computed would capture the population standard deviation. False. The probability is either 1 (if the interval does contain the true st dev) or 0 (if it doesn’t).

Shorter interval, lower % hit Bigger interval, higher % hit Bigger interval, highest % hit (that you’ll be dealing with) increases increasing

Estimate ± (crit value)(std dev) Margin of Error depends on critical value and std dev. Estimate ± 2 𝜎 𝑥 95% confidence Estimate ± 3 𝜎 𝑥 99.7% confidence General Formula: Estimate ± (crit value)(std dev) The critical value depends on the confidence level. We will be calculating different critical values in Ch. 8-2 and 8-3. What kind of critical values would reduce the margin of error? lower values Lower standard deviation by _____________________ increasing sample size Larger samples give more precise estimates  _______________ less variability Why don’t we always get large sample sizes in the real world? Very costly and time-consuming

𝑝 𝜇 random randomized normal the population distribution is normal OR by the CLT if 𝑛≥30. 𝑛𝑝≥10 and 𝑛 1−𝑝 ≥10 10% condition

SRS stratified cluster random sampling random assignment