Homework SourseSuppose that the distance of fly balls hit to the outfield i
Suppose that the distance of fly balls hit to the outfield (in baseball) is normally distributed with a mean of 229 feet and a standard deviation of 52 feet. We randomly sample 64 fly balls.
Let X= average distance in feet for 64 fly balls. Enter numbers as integers or fractions in \"p/q\" form, or as decimals accurate to nearest 0.01 .
Use the mean and standard deviation of X to determine the z value for X=240 . z= .
What is the probability that the 64 balls traveled an average of greater than 240 feet? P(X>240)=
Find the 80th percentile of the distribution of the average of 64 fly balls. That is, find x so that P(X
Solution
Suppose that the distance of fly balls hit to the outfield (in baseball) is normally distributed with a mean of 229 feet and a standard deviation of 52 feet. We randomly sample 64 fly balls.
Let X= average distance in feet for 64 fly balls. Enter numbers as integers or fractions in \"p/q\" form, or as decimals accurate to nearest 0.01 .
Use the mean and standard deviation of X to determine the z value for X=240 . z= .
Mean =229
standard deviation of X = 52/sqrt(64) =6.5
z=(240-229)/6.5 =1.69
What is the probability that the 64 balls traveled an average of greater than 240 feet? P(X>240)=
P( mean X>240)=
=P( z >1.69) = 0.0455
Find the 80th percentile of the distribution of the average of 64 fly balls.
Z value for 80th percentile =0.842
X value =229+0.842*6.5 = 234.473
Required value =234.47 ( 2 decimals).
