Answer:
[tex]a. \ P(S>20.2)=0.103 \ \ or \ 10.3\%[/tex]
[tex]b.\ \ S_{10}=19.797 \ mm\\\\c. \ No[/tex]
Step-by-step explanation:
a. Let X be paper. the thickness .
Given the paper's parameters [tex]\mu=0.08,\ \ \ \sigma=0.01[/tex]
-Also, let S be the book's thickness.
The book's parameters are calculated as:
[tex]\#mean\\\mu_s=n\sigma_p^2\\\\=250(0.08)=20.00\\\\\# Standard \ deviation, \sigma_s\\\sigma_s^2=250(0.01)^2=0.0250\\\\\sigma_s=\sqrt{0.025}=0.15811[/tex]
# the probability that a randomly chosen book is more than 20.2 mm thick is then calculated as:
[tex]P(S>20.2)=P(z>\frac{\bar x-\mu_s}{\sigma_s})}\\\\=P(z>\frac{20.2-20.0}{0.15811})\\\\=P(z>1.26494)\\\\=1-P(<1.26494)\\\\=0.102952 \ \ or \ 10.3%[/tex]
Hence, the probability is 0.103 or 10.3%
b. let's denote the 10th percentile as [tex]S_{10}[/tex], for the book's thickness.
From a above, we have the mean for the book's thickness as [tex]\mu_s=20.00[/tex] and the variance as [tex]\sigma_s^2=0.025[/tex].
#We therefore calculate the 10th percentile as;
[tex]P(S<S_{10})=10\%=0.10\\\\P(z<-1.282)=0.1\\\\S_{10}+\mu_s+z\sigma_s\\\\=20.00+(-1.282)(0.15811)\\\\=19.797[/tex]
Hence, the 10th percentile of the book's thickness is 19.797 mm
c.No.
-This is because the distribution of the book's thickness is not known.
-Hence, this probability cannot be calculated.
