Description: Let s be a string whose length equals n. Its characters are numbered from 0 to n - 1, i and j are integers, 0 ≤ i < j < n. Let's define function f as follows: f(s, i, j) = s[i + 1... j - 1] + r(s[j... n - 1]) + r(s[0... i]). Here s[p... q] is a substring of string s, that starts in position p and ends in position q (inclusive); "+" is the string concatenation operator; r(x) is a string resulting from writing the characters of the x string in the reverse order. If j = i + 1, then the substring s[i + 1... j - 1] is considered empty. You are given two strings a and b. Find such values of i and j, that f(a, i, j) = b. Number i should be maximally possible. If for this i there exists several valid values of j, choose the minimal j. Input Format: The first two input lines are non-empty strings a and b correspondingly. Each string's length does not exceed 106 characters. The strings can contain any characters with ASCII codes from 32 to 126 inclusive. Output Format: Print two integers i, j — the answer to the problem. If no solution exists, print "-1 -1" (without the quotes). Note: None