Let's define the value of the permutation $p$ of $n$ integers $1$, $2$, ..., $n$ (a permutation is an array where each element from $1$ to $n$ occurs exactly once) as follows:

• initially, an integer variable $x$ is equal to $0$;
• if $x < p_1$, then add $p_1$ to $x$ (set $x = x + p_1$), otherwise assign $0$ to $x$;
• if $x < p_2$, then add $p_2$ to $x$ (set $x = x + p_2$), otherwise assign $0$ to $x$;
• ...
• if $x < p_n$, then add $p_n$ to $x$ (set $x = x + p_n$), otherwise assign $0$ to $x$;
• the value of the permutation is $x$ at the end of this process.

For example, for $p = [4, 5, 1, 2, 3, 6]$, the value of $x$ changes as follows: $0, 4, 9, 0, 2, 5, 11$, so the value of the permutation is $11$.

You are given an integer $n$. Find a permutation $p$ of size $n$ with the maximum possible value among all permutations of size $n$. If there are several such permutations, you can print any of them.