Protecting the Flowers Farmer Ran went to cut some wood and left N (2 <= N <= 100,000) cows back in the pasture eating the grass, as usual. When he returned, he found to his horror that the cluster of cows moved to his garden and were eating his beautiful flowers. Wanting to minimize the subsequent damage, FR decided to take immediate action and transport each cow back to its own barn. Each cow i is at a location that is T_i minutes (1 <= T_i <= 2,000,000) away from its own barn. Furthermore, while waiting for transport, she destroys D_i (1 <= D_i <= 100) flowers per minute. No matter how hard he tries, FR can only transport one cow at a time back to her barn. Moving cow i to its barn requires 2*T_i minutes (T_i to get there and T_i to return). FR starts at the flower patch, transports some cow to her barn, and then walks back to the flowers, taking no extra time to get to the next cow that needs transport. Write a program to determine the order in which FR should pick up the cows so that the total number of flowers destroyed is minimized. PROBLEM NAME: flower2 INPUT FORMAT: * Line 1: A single integer, N * Lines 2..N+1: Each line contains two space-separated integers, T_i and D_i, that describe a single cow's characteristics SAMPLE INPUT: 6 3 1 2 5 2 3 3 2 4 1 1 6 OUTPUT FORMAT: * Line 1: A single integer that is the minimum number of destroyed flowers SAMPLE OUTPUT: 86 OUTPUT DETAILS: FR returns the cows in the following order: 6, 2, 3, 4, 1, 5. While he is transporting cow 6 to the barn, the others destroy 24 flowers; next he will take cow 2, losing 28 more of his beautiful flora. For the cows 3, 4, 1 he loses 16, 12, and 6 flowers respectively. When he picks cow 5 there are no more cows damaging the flowers, so the loss for that cow is zero. The total flowers lost this way is 24 + 28 + 16 + 12 + 6 = 86.