Tanker trucks are designed to carry huge quantities of gasol

Tanker trucks are designed to carry huge quantities of gasoline from refineries to filling stations. A factory that manufactures the tank of the trucks claims to manufacture tanks with a capacity of 8550 gallons of gasoline. The actual capacity of the tanks is normally distributed with mean $\"mu\"$ = 8544 gallons and standard deviation $\"sigma\"$ = 12 gallons. Use this information to answer

A. a simple random sample of $\"n=20\"$ tanks will be selected. Find the z-score corresponding to a sample mean capacity for 20 tanks of 8550. Round your answer to three decimal places. Z=
B.

A simple random sample of $\"n=50\"$ tanks will be selected. What is the probability that the mean capacity for these 50 tanks will be greater than 8540 gallons? Round your answer to three decimal places.

z = (X - u) * sqrt(n) / sigma

Then

z = (8550 - 8544) * sqrt(20) / 12

z = 2.236067977 [ANSWER]

*********************

We first get the z score for the critical value. As z = (x - u) sqrt(n) / s, then as

x = critical value =    8540
u = mean =    8544
n = sample size =    50
s = standard deviation =    12

Thus,

z = (x - u) * sqrt(n) / s =    -2.357022604

Thus, using a table/technology, the right tailed area of this is

P(z >   -2.357022604   ) =    0.990788937 [ANSWER]

Tanker trucks are designed to carry huge quantities of gasoline from refineries to filling stations. A factory that manufactures the tank of the trucks claims

Tanker trucks are designed to carry huge quantities of gasol

Solution

Get Help Now

Submit a Take Down Notice