Answer to Question #268271 in Accounting for User341

Solution:

Re-calculate the EOQ by applying a discount:

EOQ = "\\sqrt{\\frac{2DS}{H} }"

9000 barrels = 0.97

10,000 barrels and above = 0.96

Use discount of 0.97 for EOQ:

EOQ = "\\sqrt{\\frac{2\\times 74,000}{2\\times 20\\times 0.96} } = 1,070" units

Derive total costs:

Total costs = Ordering costs + Holding costs + Inventory costs

Ordering costs (1070) = "\\frac{74,000}{1,070} \\times300 = 20,748"

Ordering costs (9000) = "\\frac{74,000}{9,000} \\times300 = 2,466"

Ordering costs (10,000) = "\\frac{74,000}{10,000} \\times300 = 2,220"

Holding costs (1,070) = "2\\times20\\times\\frac{1,070}{2} = 21,400"

Holding costs (9,000) = "2\\times20\\times0.97\\times\\frac{9,000}{2} = 174,600"

Holding costs (10,000) = "2\\times20\\times0.96\\times\\frac{10,000}{2} = 192,000"

Inventory costs (1,070) = "20\\times74,000 = 1,480,000"

Inventory costs (9,000) = "20\\times0.97\\times74,000 = 1,435,600"

Inventory costs (10,000) = "20\\times0.96\\times74,000 = 1,420,800"

Total costs (1) = 20,748 + 21,400 + 1,480,000 = 1,522,148

Total costs (2) = 2,466 + 174,600 + 1,435,600 = 1,612,666

Total costs (3) = 2,220 + 192,000 + 1,420,800 = 1,615,020

The least cost order quantity, the EOQ = 1,070 barrels