# Pripreme

Ante and Goran are preparing $N$ teams of young ambitious students
for a student programming competition of students from
University of Zagreb. Both of them have one algorithm they
*have to explain to each team*. Of course, both can’t
work with the same team at the same time and none of them can
work with multiple teams simultaneously.

You are given the time it takes for each team to understand and implement an algorithm. Each algorithm lecture has to be done without interruption. Determine the minimal time required for Ante and Goran to do their lectures!

For additional explanation, consult the sample test clarifications.

## Input

The first line of input contains the integer $N$, the number of teams.

The following line contains $N$ space separated integers, where the $i$’th integer denotes the time required for the $i$’th team to understand and implement an algorithm.

All numbers in the input belong to the interval $[1, 3 \cdot 10^5]$.

## Output

The first and only line of output must contain the required number from the task.

**Clarification of the first example**:
Each team needs $2$ units
of time to understand and implement an algorithm. One of the
possible schedules is that Ante gives his lectures to team
$1$, team $2$ and team $3$, respectively, and Goran to team
$3$, team $1$ and team $2$, respectively.

**Clarification of the second example**:
One of the optimal schedules is that Ante gives lectures to
team $2$, team
$3$ and team $1$, respectively, but with a pause
lasting $1$ unit of time
between team $3$ and team
$1$. Goran will give
lectures to team $1$, team
$3$ and team $2$, respectively.

Sample Input 1 | Sample Output 1 |
---|---|

3 2 2 2 |
6 |

Sample Input 2 | Sample Output 2 |
---|---|

3 4 1 2 |
8 |

Sample Input 3 | Sample Output 3 |
---|---|

4 1 3 2 1 |
7 |