Bajtek, known for his unusual gifts, recently got an integer array $$$x_0, x_1, \ldots, x_{k-1}$$$.

Unfortunately, after a huge array-party with his extraordinary friends, he realized that he'd lost it. After hours spent on searching for a new toy, Bajtek found on the arrays producer's website another array $$$a$$$ of length $$$n + 1$$$. As a formal description of $$$a$$$ says, $$$a_0 = 0$$$ and for all other $$$i$$$ ($$$1 \le i \le n$$$) $$$a_i = x_{(i-1)\bmod k} + a_{i-1}$$$, where $$$p \bmod q$$$ denotes the remainder of division $$$p$$$ by $$$q$$$.

For example, if the $$$x = [1, 2, 3]$$$ and $$$n = 5$$$, then:

• $$$a_0 = 0$$$,
• $$$a_1 = x_{0\bmod 3}+a_0=x_0+0=1$$$,
• $$$a_2 = x_{1\bmod 3}+a_1=x_1+1=3$$$,
• $$$a_3 = x_{2\bmod 3}+a_2=x_2+3=6$$$,
• $$$a_4 = x_{3\bmod 3}+a_3=x_0+6=7$$$,
• $$$a_5 = x_{4\bmod 3}+a_4=x_1+7=9$$$.

So, if the $$$x = [1, 2, 3]$$$ and $$$n = 5$$$, then $$$a = [0, 1, 3, 6, 7, 9]$$$.

Now the boy hopes that he will be able to restore $$$x$$$ from $$$a$$$! Knowing that $$$1 \le k \le n$$$, help him and find all possible values of $$$k$$$ — possible lengths of the lost array.