Vasya had three strings $$$a$$$, $$$b$$$ and $$$s$$$, which consist of lowercase English letters. The lengths of strings $$$a$$$ and $$$b$$$ are equal to $$$n$$$, the length of the string $$$s$$$ is equal to $$$m$$$.

Vasya decided to choose a substring of the string $$$a$$$, then choose a substring of the string $$$b$$$ and concatenate them. Formally, he chooses a segment $$$[l_1, r_1]$$$ ($$$1 \leq l_1 \leq r_1 \leq n$$$) and a segment $$$[l_2, r_2]$$$ ($$$1 \leq l_2 \leq r_2 \leq n$$$), and after concatenation he obtains a string $$$a[l_1, r_1] + b[l_2, r_2] = a_{l_1} a_{l_1 + 1} \ldots a_{r_1} b_{l_2} b_{l_2 + 1} \ldots b_{r_2}$$$.

Now, Vasya is interested in counting number of ways to choose those segments adhering to the following conditions:

• segments $$$[l_1, r_1]$$$ and $$$[l_2, r_2]$$$ have non-empty intersection, i.e. there exists at least one integer $$$x$$$, such that $$$l_1 \leq x \leq r_1$$$ and $$$l_2 \leq x \leq r_2$$$;
• the string $$$a[l_1, r_1] + b[l_2, r_2]$$$ is equal to the string $$$s$$$.