Given n orders, each order consist in pickup and delivery services.
Count all valid pickup/delivery possible sequences such that delivery(i) is always after of pickup(i).
Since the answer may be too large, return it modulo 10^9 + 7.
Example 1:
Input: n = 1 Output: 1 Explanation: Unique order (P1, D1), Delivery 1 always is after of Pickup 1.
Example 2:
Input: n = 2 Output: 6 Explanation: All possible orders: (P1,P2,D1,D2), (P1,P2,D2,D1), (P1,D1,P2,D2), (P2,P1,D1,D2), (P2,P1,D2,D1) and (P2,D2,P1,D1). This is an invalid order (P1,D2,P2,D1) because Pickup 2 is after of Delivery 2.
Example 3:
Input: n = 3 Output: 90
Constraints:
1 <= n <= 500
Companies: DoorDash, Apple, Google
Related Topics:
Math, Dynamic Programming, Combinatorics
Let f(n) be the answer.
It's trivial that f(1) = 1
For n = 2, the single arrangement of f(1) gives us 3 spots to put P2.
- If
P2is put at the first spot,D2has3spots to be put. - If
P2is put at the 2nd spot,D2has2spots to be put. - If
P2is put at the 3rd spot,D2has1spot to be put.
So f(2) = 3 + 2 + 1 = 6 or f(2) = (1 + N) * N / 2 * f(1) where N = 3 = 2 * 2 - 1.
By induction, we have f(n) = f(n - 1) * (1 + N) * N / 2 where N = 2n - 1
// OJ: https://leetcode.com/problems/count-all-valid-pickup-and-delivery-options/
// Author: github.com/lzl124631x
// Time: O(N)
// Space: O(1)
class Solution {
public:
int countOrders(int n) {
long ans = 1, mod = 1e9 + 7;
for (int i = 2, cnt = 3; i <= n; ++i, cnt += 2) {
ans = ans * cnt * (cnt + 1) / 2 % mod;
}
return ans;
}
};