Eight backpackers were asked their age (in years) and the number of days they backpacked on their last backpacking trip. Is there a linear relationship.

Slides:

Advertisements

Similar presentations

Sections 10-1 and 10-2 Review and Preview and Correlation.

Advertisements

Section 10-3 Regression.

HAWKES LEARNING SYSTEMS Students Matter. Success Counts. Copyright © 2013 by Hawkes Learning Systems/Quant Systems, Inc. All rights reserved. Section 12.2.

Inference for Regression

Learning Objectives Copyright © 2004 John Wiley & Sons, Inc. Bivariate Correlation and Regression CHAPTER Thirteen.

Objectives (BPS chapter 24)

Correlation Correlation is the relationship between two quantitative variables. Correlation coefficient (r) measures the strength of the linear relationship.

© The McGraw-Hill Companies, Inc., 2000 CorrelationandRegression Further Mathematics - CORE.

Elementary Statistics Larson Farber 9 Correlation and Regression.

Linear Regression and Correlation

SIMPLE LINEAR REGRESSION

Correlation A correlation exists between two variables when one of them is related to the other in some way. A scatterplot is a graph in which the paired.

SIMPLE LINEAR REGRESSION

BCOR 1020 Business Statistics Lecture 24 – April 17, 2008.

C82MCP Diploma Statistics School of Psychology University of Nottingham 1 Linear Regression and Linear Prediction Predicting the score on one variable.

Correlation 1. Correlation - degree to which variables are associated or covary. (Changes in the value of one tends to be associated with changes in the.

Haroon Alam, Mitchell Sanders, Chuck McAllister- Ashley, and Arjun Patel.

Chapter 9 Correlational Research Designs

Lecture 5 Correlation and Regression

SIMPLE LINEAR REGRESSION

The Chi-Square Distribution 1. The student will be able to  Perform a Goodness of Fit hypothesis test  Perform a Test of Independence hypothesis test.

Means Tests Hypothesis Testing Assumptions Testing (Normality)

VCE Further Maths Least Square Regression using the calculator.

Sections 9-1 and 9-2 Overview Correlation. PAIRED DATA Is there a relationship? If so, what is the equation? Use that equation for prediction. In this.

Chapter 14 – Correlation and Simple Regression Math 22 Introductory Statistics.

The Scientific Method Interpreting Data — Correlation and Regression Analysis.

Section Copyright © 2014, 2012, 2010 Pearson Education, Inc. Lecture Slides Elementary Statistics Twelfth Edition and the Triola Statistics Series.

Two Variable Statistics

© The McGraw-Hill Companies, Inc., Chapter 11 Correlation and Regression.

Section 5.2: Linear Regression: Fitting a Line to Bivariate Data.

Elementary Statistics Correlation and Regression.

Lesson Inference for Regression. Knowledge Objectives Identify the conditions necessary to do inference for regression. Explain what is meant by.

Inference for Regression Simple Linear Regression IPS Chapter 10.1 © 2009 W.H. Freeman and Company.

Inference for Regression Chapter 14. Linear Regression We can use least squares regression to estimate the linear relationship between two quantitative.

The Statistical Imagination Chapter 15. Correlation and Regression Part 2: Hypothesis Testing and Aspects of a Relationship.

HAWKES LEARNING SYSTEMS Students Matter. Success Counts. Copyright © 2013 by Hawkes Learning Systems/Quant Systems, Inc. All rights reserved. Section 12.3.

CHAPTER 5 Regression BPS - 5TH ED.CHAPTER 5 1. PREDICTION VIA REGRESSION LINE NUMBER OF NEW BIRDS AND PERCENT RETURNING BPS - 5TH ED.CHAPTER 5 2.

Multiple Regression. Simple Regression in detail Y i = β o + β 1 x i + ε i Where Y => Dependent variable X => Independent variable β o => Model parameter.

Environmental Modeling Basic Testing Methods - Statistics III.

Scatter Diagrams scatter plot scatter diagram A scatter plot is a graph that may be used to represent the relationship between two variables. Also referred.

Essential Statistics Chapter 51 Least Squares Regression Line u Regression line equation: y = a + bx ^ –x is the value of the explanatory variable –“y-hat”

Chapter 14: Inference for Regression. A brief review of chapter 4... (Regression Analysis: Exploring Association BetweenVariables )  Bi-variate data.

June 30, 2008Stat Lecture 16 - Regression1 Inference for relationships between variables Statistics Lecture 16.

^ y = a + bx Stats Chapter 5 - Least Squares Regression

1.What is Pearson’s coefficient of correlation? 2.What proportion of the variation in SAT scores is explained by variation in class sizes? 3.What is the.

UNIT 2 BIVARIATE DATA. BIVARIATE DATA – THIS TOPIC INVOLVES…. y-axis DEPENDENT VARIABLE x-axis INDEPENDENT VARIABLE.

Correlation. u Definition u Formula Positive Correlation r =

1.5 Linear Models Warm-up Page 41 #53 How are linear models created to represent real-world situations?

UNIT 2 BIVARIATE DATA. BIVARIATE DATA – THIS TOPIC INVOLVES…. y-axis DEPENDENT VARIABLE x-axis INDEPENDENT VARIABLE.

Chapter 14 Introduction to Regression Analysis. Objectives Regression Analysis Uses of Regression Analysis Method of Least Squares Difference between.

Lesson Testing the Significance of the Least Squares Regression Model.

Pearson’s Correlation The Pearson correlation coefficient is the most widely used for summarizing the relation ship between two variables that have a straight.

Section 9-1 – Correlation A correlation is a relationship between two variables. The data can be represented by ordered pairs (x,y) where x is the independent.

INTRODUCTORY STATISTICS Chapter 12 LINEAR REGRESSION AND CORRELATION PowerPoint Image Slideshow.

Review and Preview and Correlation

Inference for Regression

Section 9-3 We already know how to calculate the correlation coefficient, r. The square of this coefficient is called the coefficient of determination.

Correlation and Simple Linear Regression

Correlation and Simple Linear Regression

Inference in Linear Models

Correlation and Regression

Chapter 12 Review Inference for Regression

SIMPLE LINEAR REGRESSION

SIMPLE LINEAR REGRESSION

Inference for Regression

LEARNING GOALS FOR LESSON 2.7

Inference for Regression

Section 9-3 We already know how to calculate the correlation coefficient, r. The square of this coefficient is called the coefficient of determination.

15.7 Curve Fitting.

Presentation transcript:

Eight backpackers were asked their age (in years) and the number of days they backpacked on their last backpacking trip. Is there a linear relationship between the age of a backpacker and the number of days they backpack on one trip? Age # Days

Age # Days First, do a scatterplot of the data, where age is the independent variable and # Days is the dependent variable. Do the Linear Regression Hypothesis Test. H o : ρ = 0 H a : ρ ≠ 0

Calculator instructions: 1.Enter Age into L1 and # Days into L2. 2.Access LinRegTTest (STAT, TESTS, scroll to LinRegTTests) 3.Xlist is L1, Ylist is L2, Freq is 1, choose ≠, leave RegEQ blank, Calculate 4.The following will show on the calculator. y=a + bx t = p = df = 6 a = b = s = 1.94 r 2 = (this is the coefficient of determination) r =

Line of Best Fit or Least Squares Line yhat = a + bx: yhat = – x Correlation: r =

Is the correlation, r, significant? (this is Method 1) Because the pvalue = which is less than the assumed alpha of 0.05, we reject the Null Hypothesis. This means the correlation coefficient is significant and the line is a good fit. We can plot the line and can use the line for prediction.

Is the correlation, r, significant? (this is Method 2) Compare r = to the value in the 95% Critical Values of the Sample Correlation Coefficient Table at the end of chapter 12. Since n – 2 = 8 – 2 = 6, the table critical value is – 0.707; negative r, use negative critical value. Because < , r is significant. We can plot the line and can use the line for prediction.

TABLE 95% CRITICAL VALUES OF THE SAMPLE CORRELATION COEFFICIENT Degrees of Freedom: n - 2Critical Values: (+ and -)

If age of backpacker = 45 years, how many days, on average, would he or she backpack? yhat = – (45) = 8.38 days If age of backpacker = 32 years, how many days, on average, would he or she backpack? yhat = – (32) = days If age of backpacker = 90 years, how many days, on average, would he or she backpack? yhat = – (90) = days This answer makes no sense since 90 is outside the domain of the equation. (Reminder: 20  x  70)