Question: A hare and a tortoise run between points O and P located exactly 6 km from each other on a straight line. They start together at O, go straight to P and then return to O along the same line. They run at constant speeds of 12 km/hr and 1 km/hr respectively. Since the tortoise is slower than the hare, the hare shuttles between O and P until the tortoise goes once to P and returns to O. During the run, how many times are the hare and the tortoise separated by an exact distance of 1 km from each other?
Explanation:
Tortoise will take 12 hours to complete 1 round. During this, hare will make 12 rounds of OP.
In the first round, both started from point O. After some time, distance between them will be 1 km.
After some more time, when hare is returning from P to O, before and after crossing tortoise, hare will be two more times 1 km apart from tortoise. So, in first round, there are three such occurrences.
In the second round, when hare starts from point O, while going and returning, there will be four occurrences when before and after crossing the tortoise, hare will be exactly 1 km apart. But the first occurrence of round 2 is already counted in round 1. So, in second round as well, there will be total 3 occurrences.
In each of the third, fourth and fifth rounds, there will be 4 such occurrences.
In the sixth round, because tortoise will be at point P, there will be only 2 cases.
Now, till round 6 there are 20 such occurrences.
And from round 7 to 12, it will exactly same but in reverse order.
∴ Total such occurrences = 20 × 2 = 40.
Hence, option (a).