The diameters of Douglas firs grown at a Christmas Tree Farm are normally distributed with a mean of 4 inches and a standard deviation of 1.5 inches. What proportion of the trees are expected to have diameters greater than 5 inches? Group of answer choices

Answer:The proportion of trees greater than 5 inches is expected to be 0.25 of the total amount of trees.Step-by-step explanation:In this problem we have a normal ditribution with mean of 4.0 in and standard deviation of 1.5 in.The proportion of the trees that are expected to have diameters greater than 5 inches is equal to the probability of having a tree greater than 5 inches.We can calculate the z value for x=5 in and then look up in a standard normal distribution table the probability of z.[tex]z=\frac{x-\mu}{\sigma}=\frac{5-4}{1.5}=0.67[/tex][tex]P(x>5)=P(z>0.67)=0.25[/tex]  The proportion of trees greater than 5 inches is expected to be 0.25 of the total amount of trees.