Answer:
(A) EOQ = 1019
(B) Time between Order = 2.5 months
Explanation:
Economic Order Quantity
This formula give us the quantity order with the fewer cost.
[tex]eoq = \sqrt{ \frac{2ds}{h} } [/tex]
Where
d = annual demand = 405 X 12 = 4860
s= supply cost or ordering cost = 11.75
h= holding cost= 0.11
[tex] \sqrt{ \frac{2 \times 4860 \times 11.75}{0.11} } = 1018.9566[/tex]
EOQ = 1019
Next, we need to know when to order:
[tex]eoq \div \frac{demand}{12 \: months} = time \: per \: order[/tex]
[tex]1019 \div \frac{4860}{12} = 2.516[/tex]
the ratio give us an idea of the consumption rate per month. we then divide the EOQ by this to know how many time between order we can have.
