High School

Demand for 2 ounce potato chip bags is normally distributed. The average demand during the lead time is 80,000 bags with a variance during the lead time of 10,000. Cost per bag is $0.24; ordering costs are $25 per order; inventory handling cost is $0.04 per bag per year. Acquisition lead time is eight weeks. The company works 50, 5-day weeks per year. What is the most likely reorder point if the desired service level is 99.8 %

Answer :

The most likely reorder point for the 2-ounce potato chip bags with a desired service level of 99.8% is 80,288 bags.

To calculate the most likely reorder point with a desired service level of 99.8%, we must first determine the safety stock and then add it to the average demand during the lead time.

1. Calculate the safety stock: To do this, we'll need to find the Z-score that corresponds to a 99.8% service level. The Z-score is approximately 2.88 for 99.8%. Next, we take the square root of the variance during the lead time, which is √10,000 = 100.

Multiply the Z-score by the standard deviation: 2.88 x 100 = 288 bags.

2. Determine the average demand during the lead time: This is given as 80,000 bags.

3. Calculate the reorder point: Add the safety stock (288 bags) to the average demand during the lead time (80,000 bags): 80,000 + 288 = 80,288 bags.

The most likely reorder point for the 2-ounce potato chip bags with a desired service level of 99.8% is 80,288 bags.

To know more about reorder point refer here:

https://brainly.com/question/31054382

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