Knights On A Keypad
January 20, 2012
Today’s exercise is an interview question that appeared on Stack Overflow a few years ago:
The numbers on a telephone keypad are arranged thus:
1 2 3
4 5 6
7 8 9
Starting from the digit 1, and choosing successive digits as a knight moves in chess, determine how many different paths can be formed of length n. There is no need to make a list of the paths, only to count them.
A knight moves two steps either horizontally or vertically followed by one step in the perpendicular direction; thus, from the digit 1 on the keypad a knight can move to digits 6 or 8, and from the digit 4 on the keypad a knight can move to digits 3, 9 or 0. A path may visit the same digit more than once.
Your task is to write a function that determines the number of paths of length n that a knight can trace on a keyboard starting from digit 1. When you are finished, you are welcome to read or run a suggested solution, or to post your own solution or discuss the exercise in the comments below.
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