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1710. Maximum Units on a Truck

Description

You are assigned to put some amount of boxes onto one truck. You are given a 2D array boxTypes, where boxTypes[i] = [numberOfBoxesi, numberOfUnitsPerBoxi]:

  • numberOfBoxesi is the number of boxes of type i.
  • numberOfUnitsPerBoxi is the number of units in each box of the type i.

You are also given an integer truckSize, which is the maximum number of boxes that can be put on the truck. You can choose any boxes to put on the truck as long as the number of boxes does not exceed truckSize.

Return the maximum total number of units that can be put on the truck.

 

Example 1:

Input: boxTypes = [[1,3],[2,2],[3,1]], truckSize = 4
Output: 8
Explanation: There are:
- 1 box of the first type that contains 3 units.
- 2 boxes of the second type that contain 2 units each.
- 3 boxes of the third type that contain 1 unit each.
You can take all the boxes of the first and second types, and one box of the third type.
The total number of units will be = (1 * 3) + (2 * 2) + (1 * 1) = 8.

Example 2:

Input: boxTypes = [[5,10],[2,5],[4,7],[3,9]], truckSize = 10
Output: 91

 

Constraints:

  • 1 <= boxTypes.length <= 1000
  • 1 <= numberOfBoxesi, numberOfUnitsPerBoxi <= 1000
  • 1 <= truckSize <= 106

Solutions

Solution 1: Greedy + Sorting

According to the problem, we should choose as many units as possible. Therefore, we first sort boxTypes in descending order of the number of units.

Then we traverse boxTypes from front to back, choose up to truckSize boxes, and accumulate the number of units.

The time complexity is $O(n \times \log n)$, where $n$ is the length of the two-dimensional array boxTypes.

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class Solution:
    def maximumUnits(self, boxTypes: List[List[int]], truckSize: int) -> int:
        ans = 0
        for a, b in sorted(boxTypes, key=lambda x: -x[1]):
            ans += b * min(truckSize, a)
            truckSize -= a
            if truckSize <= 0:
                break
        return ans
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class Solution {
    public int maximumUnits(int[][] boxTypes, int truckSize) {
        Arrays.sort(boxTypes, (a, b) -> b[1] - a[1]);
        int ans = 0;
        for (var e : boxTypes) {
            int a = e[0], b = e[1];
            ans += b * Math.min(truckSize, a);
            truckSize -= a;
            if (truckSize <= 0) {
                break;
            }
        }
        return ans;
    }
}
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class Solution {
public:
    int maximumUnits(vector<vector<int>>& boxTypes, int truckSize) {
        sort(boxTypes.begin(), boxTypes.end(), [](auto& a, auto& b) { return a[1] > b[1]; });
        int ans = 0;
        for (auto& e : boxTypes) {
            int a = e[0], b = e[1];
            ans += b * min(truckSize, a);
            truckSize -= a;
            if (truckSize <= 0) break;
        }
        return ans;
    }
};
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func maximumUnits(boxTypes [][]int, truckSize int) (ans int) {
    sort.Slice(boxTypes, func(i, j int) bool { return boxTypes[i][1] > boxTypes[j][1] })
    for _, e := range boxTypes {
        a, b := e[0], e[1]
        ans += b * min(truckSize, a)
        truckSize -= a
        if truckSize <= 0 {
            break
        }
    }
    return
}
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export function maximumUnits(boxTypes: number[][], truckSize: number): number {
    boxTypes.sort(([_, a], [__, b]) => b - a);
    let ans = 0;
    for (const [count, size] of boxTypes) {
        ans += Math.min(truckSize, count) * size;
        truckSize -= count;
        if (truckSize