A Wendy's fast-food restaurant sells hamburgers and chicken sandwiches. On a typical weekday, the demand for hamburgers is normally distributed with a mean of 450 and standard deviation of 80 and the demand for chicken sandwiches is normally distributed with a mean of 120 and standard deviation of 30. How many hamburgers must the restaurant stock to be 99% sure of not running out on a given day?

Question

Rapunzel

Mathematics

14 June, 01:56

A Wendy's fast-food restaurant sells hamburgers and chicken sandwiches. On a typical weekday, the demand for hamburgers is normally distributed with a mean of 450 and standard deviation of 80 and the demand for chicken sandwiches is normally distributed with a mean of 120 and standard deviation of 30. How many hamburgers must the restaurant stock to be 99% sure of not running out on a given day?

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Our given: Hamburgers sold daily are normally distributed and have a mean of 450 and standard deviation of 80 which is denoted by X ~ N (450,80)

What we do not know: How many hamburgers must the restaurant stock so that they won't run out. So let that be X:

Let x: the number of required hamburgers the restaurant needs

Solution:

So our X should be greater than 0.99

P (X>0.99) = 0.99 means

P (Z> (X-450) divided by 80) > 0.99

From the normal distribution table,.99 Z score is = 2.3263

solve for X by:

2.3263 = (X-450) divided by 80

X-450 = 80*2.3263 = 186.1

X = 450+186.1=636.1

Answer: 636 hamburgers should be stocked.