| comments | difficulty | edit_url | rating | source | tags | |||
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true |
Hard |
1948 |
Weekly Contest 324 Q4 |
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You are given an integer n. There is a complete binary tree with 2n - 1 nodes. The root of that tree is the node with the value 1, and every node with a value val in the range [1, 2n - 1 - 1] has two children where:
- The left node has the value
2 * val, and - The right node has the value
2 * val + 1.
You are also given a 2D integer array queries of length m, where queries[i] = [ai, bi]. For each query, solve the following problem:
- Add an edge between the nodes with values
aiandbi. - Find the length of the cycle in the graph.
- Remove the added edge between nodes with values
aiandbi.
Note that:
- A cycle is a path that starts and ends at the same node, and each edge in the path is visited only once.
- The length of a cycle is the number of edges visited in the cycle.
- There could be multiple edges between two nodes in the tree after adding the edge of the query.
Return an array answer of length m where answer[i] is the answer to the ith query.
Example 1:
Input: n = 3, queries = [[5,3],[4,7],[2,3]] Output: [4,5,3] Explanation: The diagrams above show the tree of 23 - 1 nodes. Nodes colored in red describe the nodes in the cycle after adding the edge. - After adding the edge between nodes 3 and 5, the graph contains a cycle of nodes [5,2,1,3]. Thus answer to the first query is 4. We delete the added edge and process the next query. - After adding the edge between nodes 4 and 7, the graph contains a cycle of nodes [4,2,1,3,7]. Thus answer to the second query is 5. We delete the added edge and process the next query. - After adding the edge between nodes 2 and 3, the graph contains a cycle of nodes [2,1,3]. Thus answer to the third query is 3. We delete the added edge.
Example 2:
Input: n = 2, queries = [[1,2]] Output: [2] Explanation: The diagram above shows the tree of 22 - 1 nodes. Nodes colored in red describe the nodes in the cycle after adding the edge. - After adding the edge between nodes 1 and 2, the graph contains a cycle of nodes [2,1]. Thus answer for the first query is 2. We delete the added edge.
Constraints:
2 <= n <= 30m == queries.length1 <= m <= 105queries[i].length == 21 <= ai, bi <= 2n - 1ai != bi
class Solution:
def cycleLengthQueries(self, n: int, queries: List[List[int]]) -> List[int]:
ans = []
for a, b in queries:
t = 1
while a != b:
if a > b:
a >>= 1
else:
b >>= 1
t += 1
ans.append(t)
return ansclass Solution {
public int[] cycleLengthQueries(int n, int[][] queries) {
int m = queries.length;
int[] ans = new int[m];
for (int i = 0; i < m; ++i) {
int a = queries[i][0], b = queries[i][1];
int t = 1;
while (a != b) {
if (a > b) {
a >>= 1;
} else {
b >>= 1;
}
++t;
}
ans[i] = t;
}
return ans;
}
}class Solution {
public:
vector<int> cycleLengthQueries(int n, vector<vector<int>>& queries) {
vector<int> ans;
for (auto& q : queries) {
int a = q[0], b = q[1];
int t = 1;
while (a != b) {
if (a > b) {
a >>= 1;
} else {
b >>= 1;
}
++t;
}
ans.emplace_back(t);
}
return ans;
}
};func cycleLengthQueries(n int, queries [][]int) []int {
ans := []int{}
for _, q := range queries {
a, b := q[0], q[1]
t := 1
for a != b {
if a > b {
a >>= 1
} else {
b >>= 1
}
t++
}
ans = append(ans, t)
}
return ans
}