Answer:
Step-by-step explanation:
Hello!
The objective is to test if there is a difference between the fuel economy of mid-size domestic cars and mid-size import cars.
For this there are two samples taken:
X₁: Fuel economy of a domestic car.
Sample 1
n₁= 17 domestic cars
X[bar]₁= 34.904 MPG
S₁= 4.6729 MPG
X₂: Fuel economy of an import car.
Sample 2
n₂= 15 import cars
X[bar]₂= 28.563 MPG
S₂= 8.4988 MPG
To estimate the difference between the average economic fuel of domestic cars and import cars, assuming both variables have a normal distribution and both population variances are unknown but equal, the statistic to use is a t-test for two independent samples with pooled sample variance:
(X[bar]₁-X[bar]₂)±[tex]t_{n_1+n_2-2;1-\alpha /2} * (Sa*\sqrt{\frac{1}{n_1} +\frac{1}{n_2} } )[/tex]
[tex]Sa^2= \frac{(n_1-1)S_1^2+(n_2-1)S^2_2}{n_1+n_2-2}[/tex]
[tex]Sa^2= \frac{16*(4.6729)^2+14*(8.4988)^2_2}{17+15-2}= 45.35[/tex]
Sa= 6.73
[tex]t_{n_1+n_2-2;1-\alpha /2} = t_{30; 0.95}= 1.697[/tex]
(34.904-28.563)±[tex]1.697* (6.73*\sqrt{\frac{1}{17} +\frac{1}{15} } )[/tex]
6.341±1.697*2.38
[2.30;10.38]
With a confidence level of 90%, you'd expect that the difference between the average economic fuel of domestic cars and import cars will be contained in the interval [2.30;10.38].
I hope it helps!
