# Row, Row, Row Your Boat

RAY: Here's the ansewer. Now remember, you catch up with the hat right at the dock where you in fact rented the boat. So, the hat has actually traveled a mile.

TOM: Yeah, because you dropped it when you were a mile away from the dock, and you caught it at the dock. That's a key point.

RAY: So, we want to find out how fast the river's going. If we only knew how long the hat was traveling that mile, we could use the famous formula, distance = rate x time --

TOM: And we do know.

RAY: Because imagine that there is no current, and your hat falls off into the water. If you rode away from the hat for ten minutes, how long would it take you to get back to the hat? It would take you ten minutes.

TOM: Exactly.

RAY: Well, it turns out the current doesn't make any difference, because the same current that's pushing the hat downstream, once you've turned around, is pushing you downstream at the same rate. So, in fact, if you row away from the hat for ten minutes and then turn around when you've decided to go back and retrieve it, it takes you ten minutes to get back to the hat.

So you've been rowing for 20 minutes, and the hat had been drifting for 20 minutes downstream, during which time it's gone a mile. So, in a third of an hour, it went a mile. The current must be going at three miles per hour.

TOM: Yeah, and that's all you really had to know, because you know that the hat has gone one mile in 20 minutes. You know that. That's it.

RAY: There you go.

TOM: The answer is the river is flowing at one mile in 20 minutes.

RAY: Okay, do we have a winner?

TOM: Yes, we have a winner. It's John Salinger from Berwick, Maine. Congratulations, John!

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