Math, math everywhere

ID: 4837

远端评测题

5000ms

512MiB

难度: 10

上传者:

标签>

brute force

math

meet-in-the-middle

number theory

*3200

Description

If you have gone that far, you'll probably skip unnecessary legends anyway...

You are given a binary string and an integer . Find the number of integers k, 0 ≤ k < N, such that for all i = 0, 1, ..., m - 1

Print the answer modulo 10⁹ + 7.

In the first line of input there is a string s consisting of 0's and 1's (1 ≤ |s| ≤ 40).

In the next line of input there is an integer n (1 ≤ n ≤ 5·10⁵).

Each of the next n lines contains two space-separated integers p_i, α_i (1 ≤ p_i, α_i ≤ 10⁹, p_i is prime). All p_i are distinct.

A single integer — the answer to the problem.

In the first line of input there is a string s consisting of 0's and 1's (1 ≤ |s| ≤ 40).

In the next line of input there is an integer n (1 ≤ n ≤ 5·10⁵).

Each of the next n lines contains two space-separated integers p_i, α_i (1 ≤ p_i, α_i ≤ 10⁹, p_i is prime). All p_i are distinct.

A single integer — the answer to the problem.

1<br>2<br>2 1<br>3 1<br>

01<br>2<br>3 2<br>5 1<br>

1011<br>1<br>3 1000000000<br>

2<br>

15<br>

411979884<br>