Practice Quiz Chapter 14

. How are interaction variables created?

. How do researchers use interaction variables to capture the joint influence of two categorical variables?

. How do researchers investigate the joint influence of two ratio-level variables?

. One of the following statements can't be said when an interaction variable is used as an independent variable–which one is it?

. What is a conditional relationship?

. What does a researcher think whenever they see linear regression using a quadratic or squared independent variable?

. Calculate the value of the quadratic variable if the original linear variable has a value of 10?

. Calculate the value of the quadratic variable if the original linear variable has a value of 100?

. Why is it only sensible to predict curvilinear relationships between a ratio-level independent variable and a ratio-level dependent variable?

. What is necessary to predict the curvilinear relationship between a ratio-level independent variable and a ratio-level dependent variable?

. What does a linear regression that uses both the linear and quadratic version of the independent variable produce?

. Using a linear regression prediction equation for both the linear and quadratic versions of an independent variable, calculate the predicted value on the dependent variable when the value of the original or linear variable is 10.

. Using a linear regression prediction equation for both the linear and quadratic versions of an independent variable, calculate the predicted value on the dependent variable when the value of the original or linear variable is 40.

. Using a linear regression prediction equation for both the linear and quadratic versions of an independent variable, calculate the predicted value on the dependent variable when the value of the original or linear variable is 100.

. Interpreting the slope coefficients of quadratic variables is difficult without using graphs. With this in mind–which of the following statements is not true?

. Why do quadratic variables allow researchers to use regression to model relationships that more accurately reflect real-world processes?

. What is a linear transformation?

. Logarithmic transformations are the most common non-linear transformations utilized by researchers for variables that are right-skewed. Which one of the following statements about this type of transformation is not valid?

. With logarithmic transformation using base 2, each one-unit increase in the transformed variable is equivalent to what?

. What happens to the values of a variable's cases when it is log transformed?

. An interaction effect occurs when the relationship between two variables changes after a third variable is considered.

. Once an interaction variable has been created, it can be used as an independent variable in a regression.

. Whenever an interaction variable is used in a regression, the variables used to create the interaction variable can't be an independent variable.

. The interpretation of the slope coefficients is the same when a linear regression uses an interaction variable as an independent variable.

. When a linear regression uses an interaction variable as an independent variable, the slope coefficients still show the change in the dependent variable that is associated with a one-unit increase in the independent variable.

. Researchers never investigate the joint influence of two-ratio-level variables.

. The slope coefficient of an interaction variable created using two ratio-level variables is easier to interpret and display visually.

. Interaction variables allow quantitative social scientists to incorporate an understanding of intersectionality or intersectional identities for understanding people's experiences.

. Researchers typically present regression results related to interaction variables using graphs because the slope coefficients alone can be difficult to meaningfully describe.

. The slope coefficients change when regressions use interaction variables as dependent variables.

. The test of statistical significance associated with the slope coefficient of an interaction variable shows the probability of randomly selecting a sample with the observed relationship, or one of greater magnitude, if there is a joint relationship between the variables used to create the interaction variable and the dependent variable in the population.

. A curvilinear relationship is one in which the line of best fit between two variables is curved, not straight.

. Linear regressions are not useful for predicting a curvilinear relationship.

. The slope coefficient of the linear or original version of the independent variable indicates the angle of the predicted straight-line relationship between the independent variable and the dependent variable.

. The slope coefficient of the quadratic version of the variable indicates the direction and shape of the predicted curvilinear relationship between the independent variables.

. The values on the quadratic variable grow exponentially from the squaring of the variable's values.

. Based on the exponential growth in the values on the quadratic variable, the predicted values on the dependent variable no longer correspond to a straight-line relationship.

. The best way to assess the shape and the magnitude of a curvilinear relationship is to use the regression coefficients to calculate the predicted value on the dependent variable for several plausible values on the independent variable and to graph the relationship.

. Curvilinear relationships capture situations where the relationship between two variables is positive at some values of the independent variable and negative at other values on the independent variable.

. Ratio-level, nominal-level and ordinal-level variables can be transformed.

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