Problem 1. A store receives products from two warehouses. Orders often have unit

Question

Problem 1. A store receives products from two warehouses. Orders often have units missing; in the last year at most five from warehouse A and at most 4 from Warehouse B. The data is in the tables below provides the number of orders that a particular level of units missing.

Warehouse A

Warehouse B

Units missing

# Orders

Units missing

# Orders

0

23

0

60

1

45

1

33

2

55

2

12

3

34

3

17

4

12

4

26

5

7

A)Develop the probability density function for the number of units missing for each warehouse. Provide a table and a graph for each.

B)What is the expected value and standard deviation for number of units missing per order for each warehouse? Compare their performance based on these values.

Warehouse A

Warehouse B

Units missing

# Orders

Units missing

# Orders

0

23

0

60

1

45

1

33

2

55

2

12

3

34

3

17

4

12

4

26

5

7

Explanation / Answer

P(X) calcuated by dividing total sum of order to each order P(X = 0 ) = 23/176 = 0.1307 , P(X = 1) = 45/176 = 0.2557, and so on

And for warehouse B

Average Unit missing per order in warehouse A is higher than warehouse B. But variation in warehouse B is higher than warehouse A.

Warehouse A Unit missing Order P(x) xP(x) x^2P(x) 0 23 0.1307 0.0000 0.0000 1 45 0.2557 0.2557 0.2557 2 55 0.3125 0.6250 1.2500 3 34 0.1932 0.5795 1.7386 4 12 0.0682 0.2727 1.0909 5 7 0.0398 0.1989 0.9943 Total 176 1 1.9318 5.3295 mean = 1.9318 Variance = 1.5977 stdev = 1.2640

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