Determine a cycle of five 4-digit positive integers , each with no leading zero, such that the last 2 digits of each number are equal to the first 2 digits of the next number in the cycle with the proviso that each of the 5 numbers must be exactly one of the following types : Square, Cube, Triangular, Prime, Fibonacci (albeit not necessarily in this order). Each of the five types must be represented exactly once.
Question
Guest
Determine a cycle of five 4-digit positive integers , each with no leading zero, such that the last 2 digits of each number are equal to the first 2 digits of the next number in the cycle with the proviso that each of the 5 numbers must be exactly one of the following types : Square, Cube, Triangular, Prime, Fibonacci (albeit not necessarily in this order). Each of the five types must be represented exactly once.
Edited by K SenguptaLink to comment
Share on other sites
7 answers to this question
Recommended Posts
Join the conversation
You can post now and register later. If you have an account, sign in now to post with your account.