#P1099A. Snowball
Snowball
No submission language available for this problem.
Description
Today's morning was exceptionally snowy. Meshanya decided to go outside and noticed a huge snowball rolling down the mountain! Luckily, there are two stones on that mountain.
Initially, snowball is at height $h$ and it has weight $w$. Each second the following sequence of events happens: snowball's weights increases by $i$, where $i$ — is the current height of snowball, then snowball hits the stone (if it's present at the current height), then snowball moves one meter down. If the snowball reaches height zero, it stops.
There are exactly two stones on the mountain. First stone has weight $u_1$ and is located at height $d_1$, the second one — $u_2$ and $d_2$ respectively. When the snowball hits either of two stones, it loses weight equal to the weight of that stone. If after this snowball has negative weight, then its weight becomes zero, but the snowball continues moving as before.
Find the weight of the snowball when it stops moving, that is, it reaches height 0.
First line contains two integers $w$ and $h$ — initial weight and height of the snowball ($0 \le w \le 100$; $1 \le h \le 100$).
Second line contains two integers $u_1$ and $d_1$ — weight and height of the first stone ($0 \le u_1 \le 100$; $1 \le d_1 \le h$).
Third line contains two integers $u_2$ and $d_2$ — weight and heigth of the second stone ($0 \le u_2 \le 100$; $1 \le d_2 \le h$; $d_1 \ne d_2$). Notice that stones always have different heights.
Output a single integer — final weight of the snowball after it reaches height 0.
Input
First line contains two integers $w$ and $h$ — initial weight and height of the snowball ($0 \le w \le 100$; $1 \le h \le 100$).
Second line contains two integers $u_1$ and $d_1$ — weight and height of the first stone ($0 \le u_1 \le 100$; $1 \le d_1 \le h$).
Third line contains two integers $u_2$ and $d_2$ — weight and heigth of the second stone ($0 \le u_2 \le 100$; $1 \le d_2 \le h$; $d_1 \ne d_2$). Notice that stones always have different heights.
Output
Output a single integer — final weight of the snowball after it reaches height 0.
Samples
4 3
1 1
1 2
8
4 3
9 2
0 1
1
Note
In the first example, initially a snowball of weight 4 is located at a height of 3, there are two stones of weight 1, at a height of 1 and 2, respectively. The following events occur sequentially:
- The weight of the snowball increases by 3 (current height), becomes equal to 7.
- The snowball moves one meter down, the current height becomes equal to 2.
- The weight of the snowball increases by 2 (current height), becomes equal to 9.
- The snowball hits the stone, its weight decreases by 1 (the weight of the stone), becomes equal to 8.
- The snowball moves one meter down, the current height becomes equal to 1.
- The weight of the snowball increases by 1 (current height), becomes equal to 9.
- The snowball hits the stone, its weight decreases by 1 (the weight of the stone), becomes equal to 8.
- The snowball moves one meter down, the current height becomes equal to 0.
Thus, at the end the weight of the snowball is equal to 8.