In a very ancient country the following game was popular. Two people play the game. Initially first player writes a string s₁, consisting of exactly nine digits and representing a number that does not exceed a. After that second player looks at s₁ and writes a string s₂, consisting of exactly nine digits and representing a number that does not exceed b. Here a and b are some given constants, s₁ and s₂ are chosen by the players. The strings are allowed to contain leading zeroes.

If a number obtained by the concatenation (joining together) of strings s₁ and s₂ is divisible by mod, then the second player wins. Otherwise the first player wins. You are given numbers a, b, mod. Your task is to determine who wins if both players play in the optimal manner. If the first player wins, you are also required to find the lexicographically minimum winning move.