Given n non-negative integers a1, a2, …, an , where each represents a point at coordinate (i, ai). n vertical lines are drawn such that the two endpoints of line i is at (i, ai) and (i, 0). Find two lines, which together with x-axis forms a container, such that the container contains the most water.
Note: You may not slant the container and n is at least 2.
The above vertical lines are represented by array [1,8,6,2,5,4,8,3,7]. In this case, the max area of water (blue section) the container can contain is 49.
Example:
Input: [1,8,6,2,5,4,8,3,7] Output: 49 My solution: First I can see that I should start out initial checking from both ends, because heuristically the larger the width the more water can be contained. I will assign an index to each end, and then multiply the lower end by the index difference and store the value as a max. Next I'll compare the indexes values height and the one that is less in height I will regress it torwards the other one unless the difference is less than 1. class Solution { public: int maxArea(vector<int>& height) { int max_water =0; int n = height.size(); int i = 0; int j = n-1; while(i<j){ max_water = max(max_water, (j-i)*(min(height[i], height[j]))); if(height[i]<height[j]){ i++; }else j--; } return max_water; } }; Complexity Analysis: Time Complexity - O(n) because at most a full n pass. Space Complexity - constant O(n) because only there are just the 4 vars to keep.
Comments are closed, but trackbacks and pingbacks are open.