There is a bookshelf which can fit $$$n$$$ books. The $$$i$$$-th position of bookshelf is $$$a_i = 1$$$ if there is a book on this position and $$$a_i = 0$$$ otherwise. It is guaranteed that there is at least one book on the bookshelf.

In one move, you can choose some contiguous segment $$$[l; r]$$$ consisting of books (i.e. for each $$$i$$$ from $$$l$$$ to $$$r$$$ the condition $$$a_i = 1$$$ holds) and:

• Shift it to the right by $$$1$$$: move the book at index $$$i$$$ to $$$i + 1$$$ for all $$$l \le i \le r$$$. This move can be done only if $$$r+1 \le n$$$ and there is no book at the position $$$r+1$$$.
• Shift it to the left by $$$1$$$: move the book at index $$$i$$$ to $$$i-1$$$ for all $$$l \le i \le r$$$. This move can be done only if $$$l-1 \ge 1$$$ and there is no book at the position $$$l-1$$$.

Your task is to find the minimum number of moves required to collect all the books on the shelf as a contiguous (consecutive) segment (i.e. the segment without any gaps).

For example, for $$$a = [0, 0, 1, 0, 1]$$$ there is a gap between books ($$$a_4 = 0$$$ when $$$a_3 = 1$$$ and $$$a_5 = 1$$$), for $$$a = [1, 1, 0]$$$ there are no gaps between books and for $$$a = [0, 0,0]$$$ there are also no gaps between books.

You have to answer $$$t$$$ independent test cases.