You are given an array points
representing integer
coordinates of some points on a 2D-plane, where points[i] = [xi, yi]
.
The cost of connecting two points [xi, yi]
and
[xj, yj]
is the manhattan
distance between them: |xi - xj| +
|yi - yj|
, where |val|
denotes the
absolute value of val
.
Return the minimum cost to make all points connected. All points are connected if there is exactly one simple path between any two points.
Example 1:
Input: points = [[0,0],[2,2],[3,10],[5,2],[7,0]] Output: 20 Explanation: We can connect the points as shown above to get the minimum cost of 20. Notice that there is a unique path between every pair of points.
Example 2:
Input: points = [[3,12],[-2,5],[-4,1]] Output: 18
Example 3:
Input: points = [[0,0],[1,1],[1,0],[-1,1]] Output: 4
Example 4:
Input: points = [[-1000000,-1000000],[1000000,1000000]] Output: 4000000
Example 5:
Input: points = [[0,0]] Output: 0
Constraints:
1 <= points.length <= 1000
-106 <= xi, yi <=
106
(xi, yi)
are distinct.