Use the following linear regression equation to answer the questions.

x₃ = −16.2 + 4.5x₁ + 10.0x₄ − 1.4x₇

 

_{(e) Suppose that n = 19 data points were used to construct the given regression equation and that the standard error for the coefficient of x4 is 0.960. Construct a 90% confidence interval for the coefficient of x4. (Round your answers to two decimal places.)}

lower limit
upper limit

_{(f) Using the information of part (e) and level of significance 1%, test the claim that the coefficient of x4 is different from zero. (Round your answers to two decimal places.)}

t	=
t critical	= ±

 

Suppose x₁ and x₇ were held at fixed but arbitrary values.
If x₄ increased by 1 unit, what would we expect the corresponding change in x₃ to be?


If x₄ increased by 3 units, what would be the corresponding expected change in x₃?


If x₄ decreased by 2 units, what would we expect for the corresponding change in x₃?