Tower of Hanoi consists of three posts and a certain number, n, of different diameter disks initially stacked on one of the posts with disks decreasing in diameter as one rises up the stack. The object of the puzzle is to transfer all the disks to a different post while obeying the following rules:
Here is your challenge:
A) in a Tibetan monetary high in the Himalaya there are three silver posts and 32 golden disks of different sizes. When the monastery was opened at the starts 827 the disks were all stacked on the same post with the disks decreasing in size as they went up the pole since the monastery opened, monks have been moving the disks between the posts following the three rules above and shifting one disk a minute. When they have succeeded in transferring all the disks to another pole, the world will end. How much time do we have left?
- The disks are moved one at a time from on post to another post
- Only the top disk in a stack may be moved
- No disk may be placed on one of a smaller diameter.
Here is your challenge:
A) in a Tibetan monetary high in the Himalaya there are three silver posts and 32 golden disks of different sizes. When the monastery was opened at the starts 827 the disks were all stacked on the same post with the disks decreasing in size as they went up the pole since the monastery opened, monks have been moving the disks between the posts following the three rules above and shifting one disk a minute. When they have succeeded in transferring all the disks to another pole, the world will end. How much time do we have left?