A set of data has a normal distribution with a mean of 5.1 and a standard deviation of 0.9. Find the percent of data between 4.2 and 5.1.
Answer: The correct option is B) about 34%
Proof:
We have to find [tex] P(4.2<x<5.1) [/tex]
To find [tex] P(4.2<x<5.1) [/tex], we need to use z score formula:
When x = 4.2, we have:
[tex] z = \frac{x-\mu}{\sigma} [/tex]
[tex] =\frac{4.2-5.1}{0.9}=\frac{-0.9}{0.9}=-1 [/tex]
When x = 5.1, we have:
[tex] z = \frac{x-\mu}{\sigma} [/tex]
[tex] =\frac{5.1-5.1}{0.9}=0 [/tex]
Therefore, we have to find [tex] P(-1<z<0) [/tex]
Using the standard normal table, we have:
[tex] P(-1<z<0) [/tex]= [tex] P(z<0) - P(z<-1) [/tex]
[tex] =0.50-0.1587 [/tex]
[tex] =0.3413 [/tex] or 34.13%
= 34% approximately
Therefore, the percent of data between 4.2 and 5.1 is about 34%
