# Program

Mirko is trying to debug a piece of his code. First he creates an array of $N$ integers and fills it with zeros. Then he repeatedly calls the following C++ procedure:

void something( int jump ) { int i = 0; while( i < N ) { seq[i] = seq[i] + 1; i = i + jump; } }

As you can see, this procedure increases by one all elements
in the array whose indices are divisible by `jump`.

Mirko calls the procedure exactly $K$ times, using the sequence $X_1,X_2,X_3, \ldots , X_ k$ as arguments.

After this, Mirko has a list of $Q$ special parts of the array he needs to check to verify that his code is working as it should be. Each of these parts is defined by two numbers, $L$ and $R$ ($L \leq R$) the left and right bound of the special part. To check the code, Mirko must compute the sum of all elements of seq between and including $L$ and $R$. In other words $\mathtt{seq}[L] + \mathtt{seq}[L+1] + \mathtt{seq}[L+2] + \ldots + \mathtt{seq}[R]$. Since he needs to know the answer in advance in order to check it, he asked you to help him.

## Input

The first line of input contains two integers, $N$ ($1
\leq N \leq 10^6$), the size of the array, and
$K$ ($1 \leq K \leq 10^6$), the number of
calls to `something` that Mirko
makes.

The second line contains $K$ integers: $X_1,X_2,X_3, \ldots ,X_ k$, the arguments passed to the procedure ($1 \leq X_ i < N$).

The third line contains one integer $Q$ ($1 \leq Q \leq 10^6$), the number of special parts of the array Mirko needs to check.

The next $Q$ lines contain two integers each $L_ i$ and $R_ i$ ($0 \leq L_ i \leq R_ i < N$), the bounds of each special part.

## Output

The output should contain exactly $Q$ lines. The $i$-th line should contain the sum of elements $\mathtt{seq}[L_ i] + \mathtt{seq}[L_ i+1] + \mathtt{seq}[L_ i+2] + \ldots + \mathtt{seq}[R_ i]$.

Sample Input 1 | Sample Output 1 |
---|---|

10 4 1 1 2 1 3 0 9 2 6 7 7 |
35 18 3 |

Sample Input 2 | Sample Output 2 |
---|---|

11 3 3 7 10 3 0 10 2 6 7 7 |
8 2 1 |

Sample Input 3 | Sample Output 3 |
---|---|

1000000 6 12 3 21 436 2 19 2 12 16124 692 29021 |
16422 28874 |