Description: A tennis tournament with n participants is running. The participants are playing by an olympic system, so the winners move on and the losers drop out. The tournament takes place in the following way (below, m is the number of the participants of the current round): - let k be the maximal power of the number 2 such that k ≤ m, - k participants compete in the current round and a half of them passes to the next round, the other m - k participants pass to the next round directly, - when only one participant remains, the tournament finishes. Each match requires b bottles of water for each participant and one bottle for the judge. Besides p towels are given to each participant for the whole tournament. Find the number of bottles and towels needed for the tournament. Note that it's a tennis tournament so in each match two participants compete (one of them will win and the other will lose). Input Format: The only line contains three integers n, b, p (1 ≤ n, b, p ≤ 500) — the number of participants and the parameters described in the problem statement. Output Format: Print two integers x and y — the number of bottles and towels need for the tournament. Note: In the first example will be three rounds: 1. in the first round will be two matches and for each match 5 bottles of water are needed (two for each of the participants and one for the judge), 2. in the second round will be only one match, so we need another 5 bottles of water, 3. in the third round will also be only one match, so we need another 5 bottles of water. So in total we need 20 bottles of water. In the second example no participant will move on to some round directly.