A consumer organization wants to estimate the actual tread wear index of a brand name of tires that claims “graded 200” on the sidewall of the tire. A random sample of 23 tires indicates a sample mean tread wear index of 190.7 and a sample standard deviation of 29.3.

Assuming that the population of tread wear indexes is normally distributed, construct a 90% confidence interval estimate of the population mean tread wear index for tires produced by this manufacturer under this brand name, round to two decimal places as needed.


Answer:

Given Data:

The Sample Mean $(\mu) = 190.7 $

The Sample Standard Deviation $(s)=29.3 $

The Sample Size $(n)=23 $

The Confidence Interval Level $(CI) = 90% $


Solution:

The Level Of Significance $(\alpha):$

$\alpha = 1 – 0.90$

$\therefore \alpha = 0.10$

The Degree Of Freedom $(df):$

$df = n – 1$

$df = 23 – 1$

$\therefore df = 22$

The Critical Value $(t_c):$

$t_c = t_{\frac{\alpha}{2}, df}$

$t_c = t_{\frac{0.10}{2}, 22}$

$t_c = t_{0.05, 22}$

$\therefore t_c \approx 1.717$

The Confidence Interval $(CI) :$

The 90% confidence interval is: $\bar{x} \pm t_c \times \frac{s}{\sqrt{n}}$

$= 190.7 \pm 1.717 \times \frac{29.3}{\sqrt{23}}$

$= 190.7 \pm 10.49$


Final Answer:

$\Rightarrow$ The 90% confidence interval $\approx (180.21, 201.19)$

adbhutah
adbhutah

adbhutah.com

Articles: 1279