Linear Garden
Memory limit: 64 MB
Ramesses II has just returned victorious from battle. To commemorate his victory, he has decided to build a majestic garden. The garden will contain a long line of plants that will run all the way from his palace at Luxor to the temple of Karnak. It will consist only of lotus plants and papyrus plants, since they symbolize Upper and Lower Egypt respectively.
The garden must contain exactly plants. Also, it must be balanced: in any contiguous section of the garden, the numbers of lotus and papyrus plants must not differ by more than 2.
A garden can be represented as a string of letters 'L' (lotus) and 'P' (papirus).
For example, for there are 14 possible balanced gardens. In alphabetical order, these are: LLPLP, LLPPL, LPLLP,
LPLPL, LPLPP, LPPLL, LPPLP, PLLPL,
PLLPP, PLPLL, PLPLP, PLPPL, PPLLP, and PPLPL.
The possible balanced gardens of a certain length can be ordered alphabetically, and then numbered starting from 1. For example, for , garden number 12 is the garden PLPPL.
Task
Write a program that, given the number of plants and a string that represents a balanced garden, calculates the number assigned to this garden modulo some given integer .
Note that for solving the task, the value of has no importance other than simplifying computations.
Constraints
;
.
Input
Your program must read from the standard input the following data:
- Line 1 contains the integer , the number of plants in the garden.
- Line 2 contains the integer .
- Line 3 contains a string of characters 'L' (lotus)
or 'P' (papyrus) that represents a balanced garden.
Output
Your program must write to the standard output a single line containing one integer between and (inclusive), the number assigned to the garden described in the input, modulo .
Grading
In inputs worth a total of 40 points, will not exceed 40.
Example
For the input data:
5
7
PLPPL
the correct result is:
5
The actual number assigned to PLPPL is 12.
So, the output is 12 modulo 7, which is 5.
For the input data:
12
10000
LPLLPLPPLPLL
the correct result is:
39