Question
It is advertised that the average braking distance for a small car traveling at 70 miles...
It is advertised that the average braking distance for a small
car traveling at 70 miles per hour equals 120 feet. A
transportation researcher wants to determine if the statement made
in the advertisement is false. She randomly test drives 35 small
cars at 70 miles per hour and records the braking distance. The
sample average braking distance is computed as 111 feet. Assume
that the population standard deviation is 21 feet. (You may
find it useful to reference the appropriate table: z table
or t table)
a. State the null and the alternative hypotheses
for the test.
-
H0: μ = 120; HA: μ ≠ 120
-
H0: μ ≥ 120; HA: μ < 120
-
H0: μ ≤ 120; HA: μ > 120
b. Calculate the value of the test statistic and
the p-value. (Negative value should be indicated
by a minus sign. Round intermediate calculations to at least 4
decimal places and final answer to 2 decimal
places.)
Find the p-value.
- 0.025 p-value < 0.05
- 0.05 p-value < 0.10
- p-value 0.10
-
p-value < 0.01
- 0.01 p-value < 0.025
c. Use α = 0.10 to determine if the
average breaking distance differs from 120 feet.
Homework Answers
Answer #1
Solution:
a)
H0: μ = 120; HA: μ ≠ 120
b)
Test statistic z = 
= [111 - 120]/[21/
35]
= -2.54
Test statistic z = -2.54
Now ,
Here , TWO tailed test
p value = P(Z < -2.54) + P(Z > +2.54) = 0.0055 + 0.0055 = 0.011
0.01 p-value < 0.025
c)
p value is less than α = 0.10
So , we reject H0
Yes , there id sufficient evidence to support the claim that the average breaking distance differs from 120 feet.
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