Respuesta :
EOQ = 216 units, annual ordering cost and holding cost = $6840, annual ordering cost and holding cost = $8520
Explanation:
Annual demand D = 4 multiply 52 weeks = 2340 cases
Case cost C=$120
Order cost S = $300
Holding cost = 25% = 0.25 multiply with 120 = $30
a) At economic order quantity Q Millennium can minimize its annual ordering and holding cost
EOQ = 216.33 or 216 units
b) Q = 300 units
Annual ordering cost + annual holding cost = [tex](\mathbf{D} / \underline{\mathbf{Q}}) \mathbf{S}+(\mathbf{Q} / 2) \mathbf{H}[/tex]
= [tex](2340 / 300) 300+(300 / 2) 30[/tex]
= 2340 + 4500
= $6840
c) Q = 100
Annual ordering cost + annual holding cost = [tex](\mathbf{D} / \underline{\mathbf{Q}}) \mathbf{S}+(\mathbf{Q} / 2) \mathbf{H}[/tex]
= [tex](2340 / 100) 300+(100 / 2) 30[/tex]
= 7020 + 1500
= $8520
Costs occured by each case = 8520 divide 2340 = $3.64
d) We already said in a) the minimum annual ordering cost and holding cost will be at EOQ
So by ordering multiples of 50 cases near to EOQ we will minimize the annual ordering cost and holding cost.
So the order quantity to minimize the annual ordering cost and holding cost is 200 units
e) Q = 1000
Annual ordering cost + annual holding cost = [tex](\mathbf{D} / \underline{\mathbf{Q}}) \mathbf{S}+(\mathbf{Q} / 2) \mathbf{H}[/tex]
= [tex](2340 / 1000) 300+(1000 / 2)(120 \text { multiply } 0.95 \text { multiply } 0.25)[/tex]
= 702 + 14250
Annual ordering cost + annual holding cost = $14952
