Answer:
The mean is 561.40 ppm. The standard deviation is 29.15 ppm.
Step-by-step explanation:
We can calculate the mean and the standard deviation using the proportions of the population that are subjected to the different levels.
The mean can be calculated as
[tex]\mu=\sum p_i*L_i\\\\\mu=0.06*370+0.13*470+0.46*560+0.35*630\\\\\mu=561.40 \,ppm[/tex]
The standard deviation of the mean can be calculated in a similar way
[tex]\sigma=\sqrt{\sum p_i(L_i-\mu)^2}\\\\\sigma=\sqrt{0.06(370-561.4)^2+0.13(470-561.4)^2+0.46(560-561.4)^2+0.35(630-561.4)^2}\\\\\sigma=\sqrt{0.06(36634)+0.13(8354)+0.46(2)+0.35(4706)}\\\\\sigma=\sqrt{2198.04+1086.01+0.90+1647.09}=\sqrt{4932.04}=29.15[/tex]
The mean is 561.40 ppm. The standard deviation is 29.15 ppm.
