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Description

Input

Each test contains multiple test cases. The first line contains the number of test cases $t$ ($1 \leq t \leq 10^4$). Description of the test cases follows.

The first line of each test case contains one integer $n$ ($1 \leq n \leq 200\,000$) — the length of array $a$.

The second line of each test case contains $n$ integers $a_1, a_2, \ldots, a_n$ ($0 \leq a_i < 2^{30}$) — array $a$ itself.

It's guaranteed that the sum of $n$ over all test cases doesn't exceed $200\,000$.

Output

For each test case, print all values $k$, such that it's possible to make all elements of $a$ equal to $0$ in a finite number of elimination operations with the given parameter $k$.

Print them in increasing order.

Samples

5
4
4 4 4 4
4
13 7 25 19
6
3 5 3 1 7 1
1
1
5
0 0 0 0 0

1 2 4
1 2
1
1
1 2 3 4 5

Note

In the first test case:

• If $k = 1$, we can make four elimination operations with sets of indices $\{1\}$, $\{2\}$, $\{3\}$, $\{4\}$. Since $\&$ of one element is equal to the element itself, then for each operation $x = a_i$, so $a_i - x = a_i - a_i = 0$.
• If $k = 2$, we can make two elimination operations with, for example, sets of indices $\{1, 3\}$ and $\{2, 4\}$: $x = a_1 ~ \& ~ a_3$ $=$ $a_2 ~ \& ~ a_4$ $=$ $4 ~ \& ~ 4 = 4$. For both operations $x = 4$, so after the first operation $a_1 - x = 0$ and $a_3 - x = 0$, and after the second operation — $a_2 - x = 0$ and $a_4 - x = 0$.
• If $k = 3$, it's impossible to make all $a_i$ equal to $0$. After performing the first operation, we'll get three elements equal to $0$ and one equal to $4$. After that, all elimination operations won't change anything, since at least one chosen element will always be equal to $0$.
• If $k = 4$, we can make one operation with set $\{1, 2, 3, 4\}$, because $x = a_1 ~ \& ~ a_2 ~ \& ~ a_3 ~ \& ~ a_4$ $= 4$.

In the second test case, if $k = 2$ then we can make the following elimination operations:

• Operation with indices $\{1, 3\}$: $x = a_1 ~ \& ~ a_3$ $=$ $13 ~ \& ~ 25 = 9$. $a_1 - x = 13 - 9 = 4$ and $a_3 - x = 25 - 9 = 16$. Array $a$ will become equal to $[4, 7, 16, 19]$.
• Operation with indices $\{3, 4\}$: $x = a_3 ~ \& ~ a_4$ $=$ $16 ~ \& ~ 19 = 16$. $a_3 - x = 16 - 16 = 0$ and $a_4 - x = 19 - 16 = 3$. Array $a$ will become equal to $[4, 7, 0, 3]$.
• Operation with indices $\{2, 4\}$: $x = a_2 ~ \& ~ a_4$ $=$ $7 ~ \& ~ 3 = 3$. $a_2 - x = 7 - 3 = 4$ and $a_4 - x = 3 - 3 = 0$. Array $a$ will become equal to $[4, 4, 0, 0]$.
• Operation with indices $\{1, 2\}$: $x = a_1 ~ \& ~ a_2$ $=$ $4 ~ \& ~ 4 = 4$. $a_1 - x = 4 - 4 = 0$ and $a_2 - x = 4 - 4 = 0$. Array $a$ will become equal to $[0, 0, 0, 0]$.

Formal definition of bitwise AND:

Let's define bitwise AND ($\&$) as follows. Suppose we have two non-negative integers $x$ and $y$, let's look at their binary representations (possibly, with leading zeroes): $x_k \dots x_2 x_1 x_0$ and $y_k \dots y_2 y_1 y_0$. Here, $x_i$ is the $i$-th bit of number $x$, and $y_i$ is the $i$-th bit of number $y$. Let $r = x ~ \& ~ y$ is a result of operation $\&$ on number $x$ and $y$. Then binary representation of $r$ will be $r_k \dots r_2 r_1 r_0$, where:

$$ r_i = \begin{cases} 1, ~ \text{if} ~ x_i = 1 ~ \text{and} ~ y_i = 1 \\ 0, ~ \text{if} ~ x_i = 0 ~ \text{or} ~ y_i = 0 \end{cases} $$