Answer: 90.82%
Step-by-step explanation:
Given : The distribution of the amount of a certain brand of soda in 16 OZ bottles is approximately normal .
Mean : [tex]\mu=16.12\text{ OZ}[/tex]
Standard deviation: [tex]\sigma=0.09\text{ OZ}[/tex]
Let X be the random variable that represents the amount of soda in bottles.
Formula for z-score : [tex]z=\dfrac{x-\mu}{\sigma}[/tex]
Z-score for 16 oz: [tex]z=\dfrac{16-16.12}{0.09}=-1.33[/tex]
Using the standard normal z-distribution table , the probability that the soda bottles that contain more than the 16 OZ is given by :_
[tex]P(x>60)=P(z>-1.33)=1-P(x\leq-1.33)=1-0.0917591=0.9082409\approx0.9082\approx90.82\%[/tex]
Hence, the percentage of the soda bottles that contain more than the 16 OZ advertised is 90.82% .
