# Difference between revisions of "2013 AMC 12A Problems/Problem 16"

## Problem $A$, $B$, $C$ are three piles of rocks. The mean weight of the rocks in $A$ is $40$ pounds, the mean weight of the rocks in $B$ is $50$ pounds, the mean weight of the rocks in the combined piles $A$ and $B$ is $43$ pounds, and the mean weight of the rocks in the combined piles $A$ and $C$ is $44$ pounds. What is the greatest possible integer value for the mean in pounds of the rocks in the combined piles $B$ and $C$? $\textbf{(A)} \ 55 \qquad \textbf{(B)} \ 56 \qquad \textbf{(C)} \ 57 \qquad \textbf{(D)} \ 58 \qquad \textbf{(E)} \ 59$

## Solution

### Solution 1

Let pile $A$ have $A$ rocks, and so on.

The total weight of $A$ and $C$ can be expressed as $44(A + C)$.

To get the total weight of $B$ and $C$, we add the weight of $B$ and subtract the weight of $A$ $44(A + C) + 50B - 40A = 4A + 44C + 50B$

Therefore, the mean of $B$ and $C$ is $\frac{4A + 44C + 50B}{B + C}$, which is simplified to $44 + \frac{4A + 6B}{B + C}$.

We now need to eliminate $A$ in the numerator. Since we know that $40A + 50B = 43(A + B)$, we have $A = \frac{7}{3}B$

Substituting, $44 + \frac{4(\frac{7}{3}B) + 6B}{B + C}=44 + \frac{46}{3}*\frac{B}{B + C}$ $\frac{B}{B + C} < 1$, so the maximum value occurs when $C = 1$. Since $\frac{46}{3}$ must cancel to give an integer, and the only fraction that satisfies both conditions is $\frac{45}{46}$

Plugging in, we get $44 + \frac{46}{3} * \frac{45}{46} = 44 + 15 = 59$, which is choice E

### Solution 2

Suppose there are $A,B,C$ rocks in the three piles, and that the mean of pile C is $x$, and that the mean of the combination of $B$ and $C$ is $y$. We are going to maximize $y$, subject to the following conditions: $$40A+50B=43(A+B)$$ $$40A+xC=44(A+C)$$ $$50B+xC=y(B+C)$$

which can be rearranged as: $$7B=3A$$ $$(x-44)C=4A$$ $$(x-y)C=(y-50)B$$

Let us test $y=59$ is possible. If so, it is already the answer. If not, there will be some contradiction. So the third equation becomes $$(x-59)C=9B.$$

So $15C = (x-44)C - (x-59)C = 4A - 9B$, $45C=4(3A)-27B=28B-27B$, $105C=28A-9(7B)=A$, therefore, $A=105C, B=45C, x=4(105)+44=464$, which gives us a consistent solution. Therefore $y=59$ is the answer.

(Note: To further illustrate the idea, let us look at $y=60$ and see what happens. We then get $7\cdot 16C = 4A-30A<0$, which is a contradiction!)

### Solution 3

Obtain the 3 equations as in solution 2. $$7B=3A$$ $$(x-44)C=4A$$ $$(x-y)C=(y-50)B$$

Our goal is to try to isolate $y$ into an inequality. The first equation gives $A=\frac{7}{3}B$, which we plug into the second equation to get $$(x-44)C=\frac{28}{3}B$$

To eliminate $x$, subtract equation 3 from equation 2: $$(x-44)C-(x-y)C=\frac{28}{3}B-(y-50)B$$ $$(y-44)C=(\frac{178}{3}-y)B$$

In order for the coefficients to be positive, $\[44

Thus, the greatest integer value is $y=59$, choice $(E)$.

The problems on this page are copyrighted by the Mathematical Association of America's American Mathematics Competitions. 