[I first got this problem from Ernie Cohen. Apparently, it has appeared as a Car Talk Puzzler, but I’ve been unable to find it on their web site.]

Warm-up: You are given a box of matches and a piece of rope. The
rope burns at the rate of one rope per hour, but it may not burn uniformly.
For example, if you light the rope at one end, it will take exactly 60 minutes
before the entire rope has burnt up, but it may be that the first ^{1}⁄_{10} of the
rope takes 50 minutes to burn and that the remaining ^{9}⁄_{10} of the rope takes only
10 minutes to burn. How can you measure a period of exactly 30 minutes?
You can choose the starting time. More precisely, given the matches and
the rope, you are to say the words "start" and "done" exactly 30 minutes apart.

The actual problem: Given a box of matches and two such ropes, not necessarily identical, measure a period of 15 minutes.

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