Simple Linear Regression

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Presentation transcript:

Simple Linear Regression Section 13.1

Deterministic Relationship If the value of y (dependent) is completely determined by the value of x (Independent variable) Most are not determined completely by another

Probabilistic Model Description of the relation between 2 variables that are not deterministic. It allows y to be larger or smaller than f(x) by a random amount, e. Y = f(x) +e

Let x* denote the value of x….

Simple Linear Regression Model Assumptions about the distribution of e Mean St. Dev. Distribution of e at any x value is normal Random deviations associated with different observations are independent of 1 another

Slope Average change in y associated with a 1 unit increase in x. Point estimate is b. Y-intercept’s point estimate is a.

X* denotes a specified value of the predictor variable x …. So has 2 different interpretations It is a point estimate of the true mean y value when x = x*. It is a point predictor of an individual y value that would be observed when x = x*.

Find the point estimate of the mean y-value for the following: Age (x) 15 17 18 16 19 20 Weight (y) 2289 3393 3271 2648 2897 3327 2970 2535 3138 3573 So what’s the point estimate for an 18 year old mom?

Point estimate and point prediction are identical – only the interpretation is different. Prediction – weight of single baby who mom is 18 Estimate – average weight of all babies born to 18 year-olds

Answer the following: Explain the slope in context of the problem Explain the y-intercept in context of the problem.

Find SSResid. on calculator – every time you calculate a linear regression – it calculates the residuals. Put them in list 3 and square them & add the list.

Point estimate of is It represents the typical deviation in the y-variable from the least squares line.

Find the residual for a mother who is 19.

Find the probability that a 19 year old mother has a baby that is more than 3000 g.

Coefficient of determination (r2) It’s the amount of variation in the y-variables that can be explained by the least squares line.

Homework Worksheet