You are given two ropes that when lit burn in one hour. Which one of the following time periods CANNOT be measured with your ropes? a) 50 min b) 30 min c) 25 min d) 35 min.
I know 30 minutes is definitely possible as we could burn the rope at both ends.
I would argue that:
All of the times can be measured
Here's why:
Assuming you are allowed to cut the rope and set as many portions as you would like on fire, you can measure a time of $\dfrac{60}n$ by cutting the rope into pieces and making sure that there are $n$ points lit at any given time. With two ropes, any times that can be written as one factor of 60 or a sum of two factors will work.
For a): $\dfrac{60}2 + \dfrac{60}3 = 30 + 20 = 50$ minutes
For b): $\dfrac{60}2 = 30$ minutes or $\dfrac{60}4 + \dfrac{60}4 = 15 + 15 = 30$ minutes
For c): $\dfrac{60}{12} + \dfrac{60}3 = 5 + 20 = 25$ minutes
For d): $\dfrac{60}{12} + \dfrac{60}2 = 5 + 30 = 35$ minutes
