The pasture contains a small, contiguous grove of trees that has no 'holes' in the middle of the it. Bessie wonders: how far is it to walk around that grove and get back to my starting position? She's just sure there is a way to do it by going from her start location to successive locations by walking horizontally, vertically, or diagonally and counting each move as a single step. Just looking at it, she doesn't think you could pass 'through' the grove on a tricky diagonal. Your job is to calculate the minimum number of steps she must take. Happily, Bessie lives on a simple world where the pasture is represented by a grid with R rows and C columns (1 <= R <= 50, 1 <= C <= 50). Here's a typical example where '.' is pasture (which Bessie may traverse), 'X' is the grove of trees, '' represents Bessie's start and end position, and '+' marks one shortest path she can walk to circumnavigate the grove (i.e., the answer): ...+... ..+X+.. .+XXX+. ..+XXX+ ..+X..+ ...+++ The path shown is not the only possible shortest path; Bessie might have taken a diagonal step from her start position and achieved a similar length solution. Bessie is happy that she's starting 'outside' the grove instead of in a sort of 'harbor' that could complicate finding the best path. 牧场里有一片树林,林子里没有坑.
贝茜很想知道,最少需要多少步能围绕树林走一圈,最后回到起点.她能上下左右走,也能走对角线格子.牧场被分成R行C列(1≤R≤50,1≤C≤50).下面是一张样例的地图,其中“.”表示贝茜可以走的空地, “X”表示树林, “*”表示起点.而贝茜走的最近的路已经特别地用“+”表示出来.
题目保证,最短的路径一定可以找到.
6 7 ....... ...X... ..XXX.. ...XXX. ...X... ......*
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