2145. Count the Hidden Sequences

Description

You are given a 0-indexed array of n integers differences, which describes the differences between each pair of consecutive integers of a hidden sequence of length (n + 1). More formally, call the hidden sequence hidden, then we have that differences[i] = hidden[i + 1] - hidden[i].

You are further given two integers lower and upper that describe the inclusive range of values [lower, upper] that the hidden sequence can contain.

For example, given differences = [1, -3, 4], lower = 1, upper = 6, the hidden sequence is a sequence of length 4 whose elements are in between 1 and 6 (inclusive).

<ul>
	<li><code>[3, 4, 1, 5]</code> and <code>[4, 5, 2, 6]</code> are possible hidden sequences.</li>
	<li><code>[5, 6, 3, 7]</code> is not possible since it contains an element greater than <code>6</code>.</li>
	<li><code>[1, 2, 3, 4]</code> is not possible since the differences are not correct.</li>
</ul>
</li>

Return the number of possible hidden sequences there are. If there are no possible sequences, return 0.

Example 1:

Input: differences = [1,-3,4], lower = 1, upper = 6
Output: 2
Explanation: The possible hidden sequences are:
- [3, 4, 1, 5]
- [4, 5, 2, 6]
Thus, we return 2.

Example 2:

Input: differences = [3,-4,5,1,-2], lower = -4, upper = 5
Output: 4
Explanation: The possible hidden sequences are:
- [-3, 0, -4, 1, 2, 0]
- [-2, 1, -3, 2, 3, 1]
- [-1, 2, -2, 3, 4, 2]
- [0, 3, -1, 4, 5, 3]
Thus, we return 4.

Example 3:

Input: differences = [4,-7,2], lower = 3, upper = 6
Output: 0
Explanation: There are no possible hidden sequences. Thus, we return 0.

Constraints:

n == differences.length
1 <= n <= 10⁵
-10⁵ <= differences[i] <= 10⁵
-10⁵ <= lower <= upper <= 10⁵

Solutions

Solution 1

Python Code

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class Solution:
    def numberOfArrays(self, differences: List[int], lower: int, upper: int) -> int:
        num = mi = mx = 0
        for d in differences:
            num += d
            mi = min(mi, num)
            mx = max(mx, num)
        return max(0, upper - lower - (mx - mi) + 1)

Java Code

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class Solution {
    public int numberOfArrays(int[] differences, int lower, int upper) {
        long num = 0, mi = 0, mx = 0;
        for (int d : differences) {
            num += d;
            mi = Math.min(mi, num);
            mx = Math.max(mx, num);
        }
        return Math.max(0, (int) (upper - lower - (mx - mi) + 1));
    }
}

C++ Code

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class Solution {
public:
    int numberOfArrays(vector<int>& differences, int lower, int upper) {
        long long num = 0, mi = 0, mx = 0;
        for (int& d : differences) {
            num += d;
            mi = min(mi, num);
            mx = max(mx, num);
        }
        return max(0, (int) (upper - lower - (mx - mi) + 1));
    }
};

Go Code

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func numberOfArrays(differences []int, lower int, upper int) int {
	num, mi, mx := 0, 0, 0
	for _, d := range differences {
		num += d
		mi = min(mi, num)
		mx = max(mx, num)
	}
	return max(0, upper-lower-(mx-mi)+1)
}

2145. Count the Hidden Sequences#

Description#

Solutions#

Solution 1#

2145. Count the Hidden Sequences

Description

Solutions

Solution 1