Banks often charge overdraft fees if you attempt to withdraw more money from your account than is available in your current balance. Given a sequence of deposits and withdrawals (and assuming each deposit and withdrawal is immediately reflected in your balance), determine the minimum (non-negative) starting balance you need to ensure that you will not be charged any overdraft fees over the course of the sequence.


The first line of input contains a single integer $n$ ($1 \le n \le 1{,}000$), which is the number of transactions.

Each of the next $n$ lines contains a single integer $t$ ($-10^6 \le t \le 10^6$, $t \neq 0$). These are the transactions, in the order that they occur. A positive number represents a deposit, a negative number represents a withdrawal. No two transactions occur simultaneously.


Output a single non-negative integer, which is the minimum non-negative balance you must start with in your account in order to avoid any overdraft fees.

Sample Input 1 Sample Output 1