Let's call an array $a$ consisting of $n$ positive (greater than $0$) integers beautiful if the following condition is held for every $i$ from $1$ to $n$: either $a_i = 1$, or at least one of the numbers $a_i - 1$ and $a_i - 2$ exists in the array as well.

For example:

• the array $[5, 3, 1]$ is beautiful: for $a_1$, the number $a_1 - 2 = 3$ exists in the array; for $a_2$, the number $a_2 - 2 = 1$ exists in the array; for $a_3$, the condition $a_3 = 1$ holds;
• the array $[1, 2, 2, 2, 2]$ is beautiful: for $a_1$, the condition $a_1 = 1$ holds; for every other number $a_i$, the number $a_i - 1 = 1$ exists in the array;
• the array $[1, 4]$ is not beautiful: for $a_2$, neither $a_2 - 2 = 2$ nor $a_2 - 1 = 3$ exists in the array, and $a_2 \ne 1$;
• the array $[2]$ is not beautiful: for $a_1$, neither $a_1 - 1 = 1$ nor $a_1 - 2 = 0$ exists in the array, and $a_1 \ne 1$;
• the array $[2, 1, 3]$ is beautiful: for $a_1$, the number $a_1 - 1 = 1$ exists in the array; for $a_2$, the condition $a_2 = 1$ holds; for $a_3$, the number $a_3 - 2 = 1$ exists in the array.

You are given a positive integer $s$. Find the minimum possible size of a beautiful array with the sum of elements equal to $s$.