Answer:
Z = -1.65
[tex]\bar x \approx 0.44 \ inches[/tex]
Step-by-step explanation:
The main objective is to compute the data for the Z value and determine the [tex]\bar x[/tex] of the sample distribution
Given that;
the tires' thickness is normally distributed with a mean μ = 0.45 in
standard deviation σ = 0.05 in
sample size = 65 tires
Also; we are being told that the thickness separates the lowest 5% of the means from the highest 95%
∴
P(Z < Z) =0.05
From the Z- table
P(Z < -1.645) = 0.05
Z = -1.65
Similarly;
Let consider [tex]\bar x[/tex] to be the sample mean;
Then:
mean [tex](\mu_{\bar x}) = \mu = 0.45[/tex]
standard deviation[tex](\sigma_{\bar x} ) = \dfrac{\sigma}{\sqrt{n}}[/tex]
[tex]=\dfrac{0.05}{\sqrt{65}}[/tex]
= 0.00620174
By applying the Z-score formula:
x = μ + ( Z × σ )
[tex]\bar x = \mu _{\bar x} +(Z * \sigma _{\bar x})[/tex]
[tex]\bar x = 0.45 + (-1.65 *0.00620174)[/tex]
[tex]\bar x= 0.439767129[/tex]
[tex]\bar x \approx 0.44 \ inches[/tex]
