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Date May Specimen Marks available 2 Reference code SPM.1.sl.TZ0.15
Level SL only Paper 1 Time zone TZ0
Command term Find Question number 15 Adapted from N/A

Question

A small manufacturing company makes and sells \(x\) machines each month. The monthly cost \(C\) , in dollars, of making \(x\) machines is given by
\[C(x) = 2600 + 0.4{x^2}{\text{.}}\]The monthly income \(I\) , in dollars, obtained by selling \(x\) machines is given by
\[I(x) = 150x - 0.6{x^2}{\text{.}}\]\(P(x)\) is the monthly profit obtained by selling \(x\) machines.

Find \(P(x)\) .

[2]
a.

Find the number of machines that should be made and sold each month to maximize \(P(x)\) .

[2]
b.

Use your answer to part (b) to find the selling price of each machine in order to maximize \(P(x)\) .

[2]
c.

Markscheme

\(P(x) = I(x) - C(x)\)     (M1)
\( = - {x^2} + 150x - 2600\)     (A1)    (C2)

a.

\( - 2x + 150 = 0\)     (M1)

 

Note: Award (M1) for setting \(P'(x) = 0\) .

 

OR

 

Award (M1) for sketch of \(P(x)\) and maximum point identified.     (M1)
\(x = 75\)     (A1)(ft)     (C2)

 

Note: Follow through from their answer to part (a).

b.

\(\frac{{7875}}{{75}}\)     (M1)

 

Note: Award (M1) for \(7875\) seen.

 

\( = 105\) (A1)(ft)     (C2)

 

Note: Follow through from their answer to part (b).

c.

Examiners report

[N/A]
a.
[N/A]
b.
[N/A]
c.

Syllabus sections

Topic 6 - Mathematical models » 6.3 » Quadratic models.
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