150 151C(150)chord C(151)
()canswertangent
()banswer1390 Applications of differential calculus (Chapter 14)Example 16 Self Tutor
The cost in dollars of producingxitems in a factory each day is given by
C(x)=0|:000 13x^3 {z+0: 002 x^2 }
labour+5|{z}x
raw materials+ 2200|{z}
fixed costs
a Find C^0 (x), which is called the marginal cost function.
b Find the marginal cost when 150 items are produced. Interpret this result.
c Find C(151)¡C(150). Compare this with the answer inb.a The marginal cost function is
C^0 (x)=0:000 39x^2 +0: 004 x+5dollars per item.
b C^0 (150) =$ 14 : 38
This is the rate at which the costs are increasing with
respect to the production levelxwhen 150 items are
made per day.
It gives an estimate of the cost of making the 151 st item
each day.
c C(151)¡C(150)¼$ 3448 : 19 ¡$ 3433 : 75
¼$ 14 : 44
This is the actual cost of making the 151 st item each day, so the answer inbgives a good
estimate.4 Seablue make denim jeans. The cost model for making
xpairs per day is
C(x)=0: 0003 x^3 +0: 02 x^2 +4x+ 2250 dollars.
a Find the marginal cost function C^0 (x).
b Find C^0 (220). What does it estimate?
c Find C(221)¡C(220). What does this represent?
d Find C^00 (x) and the value ofxwhen C^00 (x)=0.
What is the significance of this point?5 The total cost of running a train from Paris to Marseille is
given by C(v)=^15 v^2 +
200 000
v
euros wherevis theaverage speed of the train in km h¡^1.
a Find the total cost of the journey if the average speed is:
i 50 km h¡^1 ii 100 km h¡^1.
b Find the rate of change in the cost of running the train
at speeds of:
i 30 km h¡^1 ii 90 km h¡^1.
c At what speed will the cost be a minimum?cyan magenta yellow black(^05255075950525507595)
100 100
(^05255075950525507595)
100 100 4037 Cambridge
Additional Mathematics
Y:\HAESE\CAM4037\CamAdd_14\390CamAdd_14.cdr Thursday, 10 April 2014 3:53:42 PM BRIAN