A)
To determine the Annual Set-up Cost
Annual set-up cost = (# of orders placed per year) x (Setup or order cost per order) = Annual Demand # of units in each order ¡Á (Setup or order cost per order) = (D/Q) ¡Á(S)
= (6000/Q) x (30)
To determine Annual holding cost = Average inventory level x Holding cost per unit per year = (Order Quantity/2) (Holding cost per unit per year)
= (Q/2) ($10.00)
To determine Optimal order quantity is found when annual setup cost equals annual holding cost: (D/Q) x (S) = (Q/2) x (H)
(6,000/Q) x (30) = (Q/2) (10)
=(2)(6,000)(30)
= Q2 (10)
Q2 = [(2 ¡Á6,000 ¡Á30)/($10)]
= 36,000
=([(2 ¡Á6,000 ¡Á30)/(10)])
=189.736 ¡Ö 189.74 units
Hence, EOQ = 189.74 units
B)
Average inventory level = (Order Quantity/2)
= (189.74) /2
= 94.87
Average Inventory level =94.87 units
C)
N= ( Demand/ order quantity)
= (6000/ 189.736)
=31.62
Hence, the optimal number of orders per year = 31.62
D)
T = (Number of Working Days per year) / (optimal number of orders)
= 250 days per year / 31.62
= 7.906
So, the optimal number of days in between any two orders = 7.91
E)
Using, (Q) x (H) : (189.736 units) x ($10) =$1,897.36
So, The annual cost of ordering and holding the inventory = $1,897
F)
TC = setup cost + holding cost
= (Dyear/Q) (S) + (Q/2) (H)
= (6,000/189.74) ($30.00) + (189.74/2) ($10.00)
= $948.67 + $948.7
= 1,897.37
Purchase cost = (6,000 units) x ($100/unit)
= $600,000
Total annual inventory cost = $600,000 + $1,897
= $601,897