Pisano period 
, of an integer n, is the period in which the sequence of Fibonacci numbers modulo n repeats. For example it is not hard to show that 
, 
and 
are 3, 8 and 6, respectively:
, of an integer n, is the period in which the sequence of Fibonacci numbers modulo n repeats. For example it is not hard to show that , and are 3, 8 and 6, respectively:
This problem is a bit different from the previous Problem 56220. Easy Sequences 75: Easy as Pisano Pi.
In this problem, aside from n, we are given the exponent e and modular base m, and we are asked to calculate:
>> mod(pisanoPi(n^e),m).
Solution Stats
Problem Comments
1 Comment
Solution Comments
Show comments
Loading...
Problem Recent Solvers3
Suggested Problems
-
2419 Solvers
-
Lychrel Number Test (Inspired by Project Euler Problem 55)
111 Solvers
-
Count letters occurence in text, specific to words with a given length.
201 Solvers
-
352 Solvers
-
Find numbers in the Popular Computing Z-sequence
15 Solvers
More from this Author116
Problem Tags
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
Missing from problem description:
1) Forbidden: global, persistent, java, BigInteger .
2) Note that e and m are sometimes missing and sometimes scalar when n is a row vector. When both are missing, behavior should be like Easy Sequences 75. When e is given and m is missing, should be like es75(e^m) were e^m presentable as a double.
When n is a vector and e or m are scalar, use as if e and m were vectors with same size() as n.