2014 AIME I Problems/Problem 4

Problem 4

Jon and Steve ride their bicycles along a path that parallels two side-by-side train tracks running the east/west direction. Jon rides east at $20$ miles per hour, and Steve rides west at $20$ miles per hour. Two trains of equal length, traveling in opposite directions at constant but different speeds each pass the two riders. Each train takes exactly $1$ minute to go past Jon. The westbound train takes $10$ times as long as the eastbound train to go past Steve. The length of each train is $\tfrac{m}{n}$ , where $m$ and $n$ are relatively prime positive integers. Find $m+n$ .

Solution 1

For the purposes of this problem, we will use miles and minutes as our units; thus, the bikers travel at speeds of $\dfrac{1}{3}$ mi/min.

Let $d$ be the length of the trains, $r_1$ be the speed of train 1 (the faster train), and $r_2$ be the speed of train 2.

Consider the problem from the bikers' moving frame of reference. In order to pass Jon, the first train has to cover a distance equal to its own length, at a rate of $r_1 - \dfrac{1}{3}$ . Similarly, the second train has to cover a distance equal to its own length, at a rate of $r_2 + \dfrac{1}{3}$ . Since the times are equal and $d = rt$ , we have that $\dfrac{d}{r_1 - \dfrac{1}{3}} = \dfrac{d}{r_2 + \dfrac{1}{3}}$ . Solving for $r_1$ in terms of $r_2$ , we get that $r_1 = r_2 + \dfrac{2}{3}$ .

Now, let's examine the times it takes the trains to pass Steve. This time, we augment train 1's speed by $\dfrac{1}{3}$ , and decrease train 2's speed by $\dfrac{1}{3}$ . Thus, we have that $\dfrac{d}{r_2 - \dfrac{1}{3}} = 10\dfrac{d}{r_1 + \dfrac{1}{3}}$ .

Multiplying this out and simplifying, we get that $r_1 = 10r_2 - \dfrac{11}{3}$ . Since we now have 2 expressions for $r_1$ in terms of $r_2$ , we can set them equal to each other:

$r_2 + \dfrac{2}{3} = 10r_2 - \dfrac{11}{3}$ . Solving for $r_2$ , we get that $r_2 = \dfrac{13}{27}$ . Since we know that it took train 2 1 minute to pass Jon, we know that $1 = \dfrac{d}{r_2 + \dfrac{1}{3}}$ . Plugging in $\dfrac{13}{27}$ for $r_2$ and solving for $d$ , we get that $d = \dfrac{22}{27}$ , and our answer is $27 + 22 = \boxed{049}$ .

Solution 2

Using a similar approach to Solution 1, let the speed of the east bound train be $a$ and the speed of the west bound train be $b$ .

So $a-20=b+20$ and $a+20=10(b-20)$ .

From the first equation, $a=b+40$ . Substituting into the second equation, $b+60=10b-200$ $260=9b$ $b=\frac{260}{9}\text{ mph}$ This means that $a=\frac{260}{9}+40=\frac{620}{9}\text{ mph}$ Checking, we get that the common difference in Jon's speed and trains' speeds is $\frac{440}{9}$ and the differences for Steve is $\frac{800}{9}$ and $\frac{80}{9}$ .

This question assumes the trains' lengths in MILES: $\frac{440}{9}\cdot \frac{1}{60}=\frac{440}{540}=\frac{22}{27}\text{ miles}$ Adding up, we get $22+27=\boxed{049}$ .

2014 AIME I (Problems • Answer Key • Resources)
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2014 AIME I Problems/Problem 4

Contents

Problem 4

Solution 1

Solution 2

See also