Question 1176232
i understand this problem as follows:


since the distribution of the pounds of coffee is normal, then you can use the z-score formula to help solve this problem.


the z-score formula is:


z = (x - m) / s


z is the z-score
x is the raw score
m is the raw mean
s is the standard deviation.


the critical x-score for 10% of thde normal distribution to be less than it, is found by looking up an area of .10 in the z-score table, or using a normal distribution calculator to find the same z-score.


i used the z-score calculator from the ti-84 plus scientific calculator.


i looked for the inverse z-score for 10% of the area under the normal distribution curve to be equal to 10%.
the calculator told me that the z-score that has 10% of the area under the normal distribution curve to the left of it was equal to -1.281551567.


that was my critical z-score.


the raw score associated with that z-score was 3 pounds.


the standard deviation was given as 2.2 ounces which is equal to 2.2 / 16 = .175 pounds.


i used the z-score formula to find the mean.


the formula of z = (x - m) / s became:


-1.281551567 = (3 - m) / .1375.


i solved for m to get:


m = 3 - .1375 * -1.281551567 = 3 + .1762133404 = 3.1762133404.


that is the average pounds of coffee required per can so that 90% of the cans will have at least 3 pounds in them.


the mean is the set point.


the annual cost of the coffee is calculated as follows.


the filling machine operates continuously for 24 hours a day for 250 days each year.


this means that it is operating continuously for 24 * 250 = 6,000 hours each year.


since there are 60 * 60 = 3600 seconds each hour, this means that it is operating continuously for 6000 * 3600 = 21,600,000 seconds each year.


since it takes 2 seconds to fill a can, then it is filling 21,600,000 / 2 = 10,800,000 cans each year.


since each can requires an average of  3.17621334 pounds of coffee, then it is requiring 10,800,000 * 3.17621334  = 34,303,104.08 pounds of coffee each year.


since the coffee costs .75 per pound, then the total cost of the coffee each year is equal to .75 * 34,303,104.08 = 25,727,328.06 each year.


an annual cost of 25,727,318.06 each year is your solution.


graphically, the probability looks loke this.


<img src = "http://theo.x10hosting.com/2021/030501.jpg" >