Problem - 1616D - Codeforces

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greedy

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You are given an array of integers $$$a_1, a_2, \ldots, a_n$$$ and an integer $$$x$$$.

You need to select the maximum number of elements in the array, such that for every subsegment $$$a_l, a_{l + 1}, \ldots, a_r$$$ containing strictly more than one element $$$(l < r)$$$, either:

At least one element on this subsegment is not selected, or
$$$a_l + a_{l+1} + \ldots + a_r \geq x \cdot (r - l + 1)$$$.

Input

The first line of input contains one integer $$$t$$$ ($$$1 \leq t \leq 10$$$): the number of test cases.

The descriptions of $$$t$$$ test cases follow, three lines per test case.

In the first line you are given one integer $$$n$$$ ($$$1 \leq n \leq 50\,000$$$): the number of integers in the array.

The second line contains $$$n$$$ integers $$$a_1, a_2, \ldots, a_n$$$ ($$$-100\,000 \leq a_i \leq 100\,000$$$).

The third line contains one integer $$$x$$$ ($$$-100\,000 \leq x \leq 100\,000$$$).

Output

For each test case, print one integer: the maximum number of elements that you can select.

Example

Input

4
5
1 2 3 4 5
2
10
2 4 2 4 2 4 2 4 2 4
3
3
-10 -5 -10
-8
3
9 9 -3
5

Output

Note

In the first example, one valid way to select the elements is $$$[\underline{1}, 2, \underline{3}, \underline{4}, \underline{5}]$$$. All subsegments satisfy at least one of the criteria. For example, for the subsegment $$$l = 1$$$, $$$r = 2$$$ we have that the element $$$2$$$ is not selected, satisfying the first criterion. For the subsegment $$$l = 3$$$, $$$r = 5$$$ we have $$$3 + 4 + 5 = 12 \ge 2 \cdot 3$$$, satisfying the second criterion.

We can't select all elements, because in this case for $$$l = 1$$$, $$$r = 2$$$ all elements are selected and we have $$$a_1 + a_2 = 3 < 2 \cdot 2$$$. Thus, the maximum number of selected elements is $$$4$$$.

In the second example, one valid solution is $$$[\underline{2}, \underline{4}, 2, \underline{4}, \underline{2}, \underline{4}, 2, \underline{4}, \underline{2}, \underline{4}]$$$.

In the third example, one valid solution is $$$[\underline{-10}, -5, \underline{-10}]$$$.

In the fourth example, one valid solution is $$$[\underline{9}, \underline{9}, -3]$$$.