1.2 A sample honors paper  (Page 5/6)

Exercises

1. At this point in your thesis you would want to point out that each of the variables in the data set are proxies for the variables discussed in part 2 of your paper. As an exercise explain how each of the explanatory variables in Table 2 are proxies for the explanatory variables mentioned in the theory section.
2. It would seem that the "cleanest" variable in the whole data set is "fatalities." Lookup the official definition of how a fatality from an automobile accident is measured. Does this variable still seem to have a clear and unequivocal meaning?

Empirical estimation

Now we are almost ready to present the estimation results from the model. There are a few things we need to cover before we move to presenting the estimation results. First, what, if any, are the econometric issues raised by the model and the data set? In this case we are using a panel data set to estimate the regression:

where fpvmd _it is the number of fatalities per 100 million vehicle miles driven in state i in year t, the x _jit is the j ^th explanatory variable in state i in year t, and $D_{it}^{BAC}$ is the dummy variable equal to 1 if state i has a 0.08 per se BAC law in year t . From a policy point of view what we are interested in is the sign of ${\beta }_k$ and if ${\beta }_k$ is statistically different from zero. At this point it would be appropriate to discuss whether you intend to use a fixed effects or a random effect model. In the interest is simplicity, we will use a fixed effects model but in your own research you would need to consider using either model.

A second issue that needs to be considered is if you plan to use a linear model as specified above or if you might use the natural logarithm of the fatality rate. Since we have no a priori reason to believe that the relationship between the fatality rate and the explanatory variables are linear, we will estimate both log-linear and a log-log models. In this way we can test if our policy conclusions are sensitive to the mathematical specification of our model.