Solve the problem.A manufacturer uses raw materials to produce p products each day. Suppose that each delivery of a particular material is $d, whereas the storage of that material is x dollars per unit stored per day. (One unit is the amount required to produce one product). How much should be delivered every x days to minimize the average daily cost in the production cycle between deliveries?
What will be an ideal response?
If he asks for a delivery every x days, then he must order (px) to have enough material for that delivery cycle. The average amount in storage is approximately one-half of the delivery amount, or 
. Thus, the cost of delivery and storage for each cycle is approximately
Cost per cycle = delivery costs + storage costs
Cost per cycle = d + 
? x
We compute the average daily cost c(x) by dividing the cost per cycle by the number of days x in the cycle.
c(x) = 
+ 
We find the critical points by determining where the derivative is equal to zero.
c'(x) = - 
+ 
= 0
x = ± 
Therefore, an absolute minimum occurs at 
days.
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A. [1, 3]
B. ?
C. (1, 3)
D. (-?, 1) ? [3, ?)
Rewrite the following using radicals; then simplify if possible.7291/3
A. 
= 27
B. 3
= 6561
C. 
= 9
D. 3
= 19,683
Find the interest earned. Assume 3
% interest compounded daily, as in the following table, and use the exact number of days. Round to the nearest cent. 
Amount: $16,924Deposited: Mar 4Withdrawn: May 9
A. $168.78 B. $109.89 C. $17,031.44 D. $107.44
Identify the coordinates of each point in the graph.
A. (-7, -5); (3, -5) B. (-7, 3); (-5, -2) C. (3, 2); (-5, -2) D. (-7, 3); (-2, -5)