You are given a string $s$ consisting of lowercase Latin letters "a", "b" and "c" and question marks "?".

Let the number of question marks in the string $s$ be $k$. Let's replace each question mark with one of the letters "a", "b" and "c". Here we can obtain all $3^{k}$ possible strings consisting only of letters "a", "b" and "c". For example, if $s = $"ac?b?c" then we can obtain the following strings: $[$"acabac", "acabbc", "acabcc", "acbbac", "acbbbc", "acbbcc", "accbac", "accbbc", "accbcc"$]$.

Your task is to count the total number of subsequences "abc" in all resulting strings. Since the answer can be very large, print it modulo $10^{9} + 7$.

A subsequence of the string $t$ is such a sequence that can be derived from the string $t$ after removing some (possibly, zero) number of letters without changing the order of remaining letters. For example, the string "baacbc" contains two subsequences "abc" — a subsequence consisting of letters at positions $(2, 5, 6)$ and a subsequence consisting of letters at positions $(3, 5, 6)$.