A Juicy Problem

The problem does require a fair bit of reading and although it is very easy to understand, but quite difficult to solve by conventional means. This is where the beauty of the problem comes in.

Let’s state the problem:
We have two 1-gallon bottles. One contains a quart of grape juice and the other, a quart of apple juice. We take a tablespoonful of grape juice and pour it into the apple juice. Then we take a tablespoon of this new mixture (apple juice and grape juice) and pour it into the bottle of grape juice. Is there more grape juice in the apple juice bottle, or more apple juice in the grape juice bottle?
To solve the problem, we can figure this out in any of the usual ways— often referred to as “mixture problems”—or we can use some clever logical reasoning and look at the problem’s solution as follows.

A-juicy-problemWith the first “transport” of juice, there is only grape juice on the tablespoon. On the second “transport” of juice, there is as much apple juice on the spoon as there is grape juice in the “apple juice bottle.” This may require students to think a bit, but most should “get it” soon.

The simplest solution to understand and the one that demonstrates a very powerful strategy is that of using extremes. We use this kind of reasoning in everyday life when we resort to the option: “Such and such would occur in a worst case scenario _ _ _ .”

Let us now employ this strategy for the above problem. To do this, we will consider the tablespoonful quantity to be a bit larger. Clearly, the outcome of this problem is independent of the quantity transported. So we will use an extremely large quantity. We’ll let this quantity actually be the entire 1 quart. That is, following the instructions given in the problem statement, we will take the entire amount (1 quart of grape juice) and pour it into the apple juice bottle. This mixture is now 50% apple juice and 50% grape juice. We then pour 1 quart of this mixture back into the grape juice bottle. The mixture is now the same in both bottles. Therefore, there is as much apple juice in the grape juice bottle as there is grape juice in the apple juice bottle!

We can consider another form of an extreme case, where the spoon doing the juice transporting has a zero quantity. In this case, the conclusion follows immediately: There is as much grape juice in the apple juice bottle as there is apple juice in the grape juice bottle, that is, zero!

Carefully presented, this solution can be very significant in the way we approach future mathematics problems and even how we may analyze everyday decision making.


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