Deck 16: Simple Linear Regression and Correlation

The residual r_i is defined as the difference between the actual value y_i and the estimated value .

If cov(x, y) = 7.5075 and , then the sample slope coefficient is 2.145.

To create a deterministic model, we start with a probabilistic model that approximates the relationship we want to model.

A regression analysis between sales (in $1000) and advertising (in $100) resulted in the following least squares line: . This implies that if advertising is $600, then the predicted amount of sales (in dollars) is $125,000.

Statisticians have shown that sample y-intercept b₀ and sample slope coefficient b₁ are unbiased estimators of the population regression parameters $\beta$ ₀ and $\beta$ ₁, respectively.

The first-order linear model is sometimes called the simple linear regression model.

The method of least squares requires that the sum of the squared deviations between actual y values in the scatter diagram and y values predicted by the regression line be minimized.

The value of the sum of squares for regression SSR can never be smaller than 1.

A direct relationship between an independent variable x and a dependent variably y means that the variables x and y increase or decrease together.

A regression analysis between sales (in $) and advertising (in $) resulted in the following least squares line: . This implies that an increase of $1 in advertising is associated with an increase of $60 in sales.

Another name for the residual term in a regression equation is random error.

The residuals are observations of the error variable $\varepsilon$ . Consequently, the minimized sum of squared deviations is called the sum of squares for error, denoted SSE.

If the coefficient of correlation is 1.0, then the coefficient of determination must be 1.0.

The vertical spread of the data points about the regression line is measured by the y-intercept.

A simple linear regression equation is given by . The point estimate of y when x = 4 is 20.45.

The value of the sum of squares for regression SSR can never be smaller than 0.0.

The regression line has been fitted to the data points (4, 11), (2, 7), and (1, 5). The sum of squares for error will be 10.0.

When the actual values y of a dependent variable and the corresponding predicted values are the same, the standard error of the estimate will be 1.0.

A regression analysis between weight (y in pounds) and height (x in inches) resulted in the following least squares line: . This implies that if the height is increased by 1 inch, the weight is expected to increase by an average of 6 pounds.

The coefficient of determination is equal to the coefficient of correlation squared.

If the coefficient of determination is 1.0, then the coefficient of correlation must be 1.0.

The value of the sum of squares for regression SSR can never be larger than the value of total sum of squares SST.

If there is no linear relationship between two variables x and y, the coefficient of determination must be -1.0.

A store manager gives a pre-employment examination to new employees. The test is scored from 1 to 100. He has data on their sales at the end of one year measured in dollars. He wants to know if there is any linear relationship between pre-employment examination score and sales. An appropriate test to use is the t-test of the population correlation coefficient.

A zero population correlation coefficient for x and y means that there is no type of relationship whatsoever between x and y.

A prediction interval is used when we want to predict a one-time occurrence for a particular value of y when the independent variable is a given x value.

If the value of the sum of squares for error SSE equals zero, then the coefficient of determination must equal zero.

The probability distribution of the error variable $\varepsilon$ is normal, with mean E( $\varepsilon$ ) = 0, and standard deviation $\sigma$ _{$\varepsilon$} =1.

If the coefficient of correlation is -0.81, then the percentage of the variation in y that is explained by the regression line is 81%.

If the coefficient of determination is 0.95, this means that 95% of the variation in the independent variable x can be explained by the y variable.

In a simple linear regression model, testing whether the slope $\beta$ ₁ of the population regression line could be zero is the same as testing whether or not the population coefficient of correlation $\rho$ equals zero.

When the actual values y of a dependent variable and the corresponding predicted values are the same, the standard error of estimate s _{$\varepsilon$} will be 0.0.

Correlation analysis is used to determine whether there is a linear relationship between an independent variable x and a dependent variable y.

A zero correlation coefficient between a pair of random variables means that there is no linear relationship between the random variables.

If all the points in a scatter diagram lie on the least squares regression line, then the coefficient of correlation must be 1.0.

If the coefficient of determination is 0.95, this means that 95% of the y values were predicted correctly by the regression line.

In a simple linear regression problem, the least squares line is , and the coefficient of determination is 0.81. The coefficient of correlation must be -0.90.

In simple linear regression, the denominator of the standard error of estimate s _{$\varepsilon$} is .

If the error variable $\varepsilon$ is normally distributed, the test statistic for testing H₀: $\beta$ ₁ = 0 has a Student t-distribution with n - 2 degrees of freedom.

The point where confidence intervals and prediction intervals do best is .

There is more error in estimating a mean value of y as opposed to predicting an individual value of y.

The graph of a confidence interval for the expected value of y is represented by two parallel lines, one on either side of the regression line.

A confidence interval (as opposed to a prediction interval) is used to estimate the long-run average value of y.

The prediction interval for a particular value of y is always wider than the confidence interval for mean value of y, given the same data set, x value, and confidence level.

The confidence interval estimate of the expected value of y will be narrower than the prediction interval for the same given value of x and confidence level. This is because there is less error in estimating a mean value as opposed to predicting an individual value.

In the first-order linear regression model, the population parameters of the y-intercept and the slope are, respectively,

A confidence interval estimate for the expected value of y will always be wider than the prediction interval for the same given value of x and the same confidence level.

In the first order linear regression model, the population parameters of the y-intercept and the slope are estimated, respectively, by:

In simple linear regression, most often we perform a two-tail test of the population slope $\beta$ ₁ to determine whether there is sufficient evidence to infer that a linear relationship exists. The null hypothesis is stated as:

The symbol for the population coefficient of correlation is:

The symbol for the sample coefficient of correlation is: