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20 Mar 2024, 17:33
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C
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Difficulty:
85%
(hard)
Question Stats:
61% (02:32) correct
39%
(02:44)
wrong
based on 465
sessions
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The daily profit, P, for selling x units of a certain item at a sporting goods store can be modeled by the function \(P(x) = -a(x -\frac{b}{2a})^2 + \frac{b^2}{4a}+c\), where a and b are positive constants and c is a nonnegative constant. What is the maximum daily profit for selling this item?
(1) \(b^2 + 4ac = \frac{52ac}{3}\)
(2) c = 360
(1) \(b^2 + 4ac = \frac{52ac}{3}\)
(2) c = 360
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26 Mar 2024, 22:52
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ilikeshoppingalot
Note the 3 terms of the profit expression carefully:
\(P(x) = -a(x -\frac{b}{2a})^2 + \frac{b^2}{4a}+c\)
'a' and 'b' are both positive so 'a' multiplied by a square will be positive (if square is not 0) which means the first term \(-a(x -\frac{b}{2a})^2\) is negative or 0. For maximum profit, this term should be 0. The other two terms are certainly positive or 0.
\(Maximum P = \frac{b^2}{4a}+c = \frac{b^2+4ac}{4a}\)
(1) \(b^2 + 4ac = \frac{52ac}{3}\)
\(Maximum P = \frac{52ac}{3*4a} = \frac{52c}{3*4}\)
We don't know the value of c so not sufficient.
(2) c = 360
We don't know the value of a and b so not sufficient.
Using both, \(Maximum P = \frac{52c}{3*4} = \frac{52*360}{3*4}\)
We can find this value and hence it is sufficient.
Answer (C)
Given: The daily profit, P, for selling x units of a certain item at a sporting goods store can be modeled by the function \(P(x) = -a(x -\frac{b}{2a})^2 + \frac{b^2}{4a}+c\), where a and b are positive constants and c is a nonnegative constant.
Asked: What is the maximum daily profit for selling this item?<br />
Since a is positive, the maximum value of \(-a(x -\frac{b}{2a})^2 = 0\) since -a is negative and the value of expression is 0 at \(x =\frac{b}{2a}\)<br />
Maximum profit P(x=b/2a) =\( \frac{b^2}{4a}+c\)
(1) \(b^2 + 4ac = \frac{52ac}{3}\)
Maximum daily profit = \( \frac{b^2}{4a}+c = \frac{bˆ2 + 4ac }{ 4a} = \frac{52ac}{3*4a} = \frac{13c}{3}\)
Since the value of c is unknown
NOT SUFFICIENT
(2) c = 360
Maximum daily profit = \( \frac{b^2}{4a}+c = \frac{b^2}{4a} + 360\)
Since value of \(\frac{b^2}{4a}\) is unknown
NOT SUFFICIENT
(1) + (2)
(1) \(b^2 + 4ac = \frac{52ac}{3}\)
Maximum daily profit = \( \frac{b^2}{4a}+c = \frac{bˆ2 + 4ac }{ 4a} = \frac{52ac}{3*4a} = \frac{13c}{3}\)
(2) c = 360
Maximum daily profit \(= \frac{13c}{3} = \frac{13*360}{3} = 13*120 = 1560\)
SUFFICIENT
IMO C
Asked: What is the maximum daily profit for selling this item?<br />
Since a is positive, the maximum value of \(-a(x -\frac{b}{2a})^2 = 0\) since -a is negative and the value of expression is 0 at \(x =\frac{b}{2a}\)<br />
Maximum profit P(x=b/2a) =\( \frac{b^2}{4a}+c\)
(1) \(b^2 + 4ac = \frac{52ac}{3}\)
Maximum daily profit = \( \frac{b^2}{4a}+c = \frac{bˆ2 + 4ac }{ 4a} = \frac{52ac}{3*4a} = \frac{13c}{3}\)
Since the value of c is unknown
NOT SUFFICIENT
(2) c = 360
Maximum daily profit = \( \frac{b^2}{4a}+c = \frac{b^2}{4a} + 360\)
Since value of \(\frac{b^2}{4a}\) is unknown
NOT SUFFICIENT
(1) + (2)
(1) \(b^2 + 4ac = \frac{52ac}{3}\)
Maximum daily profit = \( \frac{b^2}{4a}+c = \frac{bˆ2 + 4ac }{ 4a} = \frac{52ac}{3*4a} = \frac{13c}{3}\)
(2) c = 360
Maximum daily profit \(= \frac{13c}{3} = \frac{13*360}{3} = 13*120 = 1560\)
SUFFICIENT
IMO C
