Answer:
Their order quantity will rise but the time between orders will fall.
Explanation:
Let's analyse the EOQ formula:
[tex]Q_{opt} = \sqrt{\frac{2DS}{H}}[/tex]
If Demand increases
The dividend increase, so the quotient increase.
EOQ will rise.
Only options b and c are correct on that statment.
Now let's check the time between order:
[tex]\frac{EOQ}{Demand} \times 365[/tex]
If we analyze the increase in demand:
√(2xΔDxS/H)/ ΔD
everything else is keep constant so we have:
√(CxΔD)/ ΔDx
If we use L'Hopital we can conclude this function limit is zero.
Anyway a more easy way to do it will be calculate with a demand of 1000
and then with a demand of 50,000 to notice how much the time between order decrease.
√(1000) / 1000 = 0.031622776
√(51000)/ 51000 = 0.004428074
so we have EOQ increase and days between order decrease.
Now only option B is correct !
