402203: GYM100694 M The Fifth Season
Description
Cersei and Jaime has stolen n gold coins from the Casterly Rock reserves. They decided to play a game while the disappearence is not detected.
The game consists of q rounds. At the beginning of each round all n coins lie in a heap. The players move in rotation, taking from the heap no less than ki and no more than li coins (ki ≤ li, i is the number of round). The player who can't do the move loses.
Cersei and Jaime have determined the pairs of numbers (ki, li) for each round of the game. They don't see any point in finding out who wins in what round as they choose who moves the first by flipping a coin. They are interested in the maximal length of each round, provided that they play optimally (intend to win). The length of the round is the total number of moves made by both Cersei and Jaime.
Your task is to find the maximal possible length of each round of the game.
InputThe first line contains two integers n and q — the number of coins and the number of rounds (1 ≤ n ≤ 106, 1 ≤ q ≤ 105).
Each of the next q lines contains two integers ki and li — the minimal and maximal number of coins that could be taken at one turn in the i-th round.
OutputWrite q space-separated integers. The i-th number should be equal to the maximal possible length of the i-th round.
ExamplesInput10 2Output
1 1
5 6
10 1