3429. Paint House IV
Description
You are given an even integer n representing the number of houses arranged in a straight line, and a 2D array cost of size n x 3, where cost[i][j] represents the cost of painting house i with color j + 1.
The houses will look beautiful if they satisfy the following conditions:
- No two adjacent houses are painted the same color.
- Houses equidistant from the ends of the row are not painted the same color. For example, if
n = 6, houses at positions(0, 5),(1, 4), and(2, 3)are considered equidistant.
Return the minimum cost to paint the houses such that they look beautiful.
Example 1:
Input: n = 4, cost = [[3,5,7],[6,2,9],[4,8,1],[7,3,5]]
Output: 9
Explanation:
The optimal painting sequence is [1, 2, 3, 2] with corresponding costs [3, 2, 1, 3]. This satisfies the following conditions:
- No adjacent houses have the same color.
- Houses at positions 0 and 3 (equidistant from the ends) are not painted the same color
(1 != 2). - Houses at positions 1 and 2 (equidistant from the ends) are not painted the same color
(2 != 3).
The minimum cost to paint the houses so that they look beautiful is 3 + 2 + 1 + 3 = 9.
Example 2:
Input: n = 6, cost = [[2,4,6],[5,3,8],[7,1,9],[4,6,2],[3,5,7],[8,2,4]]
Output: 18
Explanation:
The optimal painting sequence is [1, 3, 2, 3, 1, 2] with corresponding costs [2, 8, 1, 2, 3, 2]. This satisfies the following conditions:
- No adjacent houses have the same color.
- Houses at positions 0 and 5 (equidistant from the ends) are not painted the same color
(1 != 2). - Houses at positions 1 and 4 (equidistant from the ends) are not painted the same color
(3 != 1). - Houses at positions 2 and 3 (equidistant from the ends) are not painted the same color
(2 != 3).
The minimum cost to paint the houses so that they look beautiful is 2 + 8 + 1 + 2 + 3 + 2 = 18.
Constraints:
2 <= n <= 105nis even.cost.length == ncost[i].length == 30 <= cost[i][j] <= 105
Solutions
Solution 1
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