An aircraft company wanted to predict the number of worker hours necessary to finish the design of a new plane. Relevant explanatory variables were thought to be the plane's top speed, it's weight, and the number of parts it had in common with the other models built by the company. A sample of 27 of the company's planes was taken, and the following model was estimated:
y = B0 + B1X1 + B2X2 + B3X3 = e
where,
y= design effort, in million of worker-hours
x1 =planes top speed, in miles per hour
x2 = plane's weight, in tons
x3 = percentage of parts in common with other models
The estimated regression coefficients were as follows:
b1 = 0.661 b2 = 0.065 b3 = -0.018
the estimated standard errors were as follows:
Sb1 = 0.099 Sb2 = 0.032 Sb3 = 0.0023
a. Find 90% and 95% confidence intervals for B1.
b. Find 95% and 99% confidence intervals for B2
c. Test against a two sided alternative the null hypothesis that, all else being equal, the plane's weight has no linear influence on its design effort.
d. The error of squares for this regression was 0.332. Using the same data, a simple linear regression of design effort on the percentage of common parts was fitted, yielding an error of sums of squares of 3.311. Test, at the 1% level, the null hypothesis that, taken together, the variables top speed and weight contribute nothing in a linear sense to explain the changes in the variable, design effort, given that the variable percentage of common parts is also used as an explanatory variable.