Time Complexity of Algorithms Questions

Consider a social network graph with V users and E friendships. You want to find the shortest path between two users (A and B) in terms of friendship connections. What is the time complexity of the most efficient algorithm for this scenario in the worst-case?

When optimizing code for better time complexity, which approach will NOT always lead to improved real-world performance?

You are tasked with optimizing a critical function in a real-time trading system. Your theoretical analysis suggests Algorithm A (O(log n)) is superior to Algorithm B (O(n)). However, benchmarking reveals Algorithm B performs better for your typical data size. What is the MOST likely reason for this discrepancy?

Consider a dynamic array implementation where resizing to double the capacity takes O(n) time. If we perform 'n' insertions sequentially, what is the amortized time complexity per insertion?

You need to choose an algorithm for a real-time system with strict timing constraints. Algorithm X has a time complexity of O(n log n) in the worst case and Θ(1) in the best case. Algorithm Y has a time complexity of Θ(n) in all cases. Which algorithm is a safer choice and why?

You are comparing two sorting algorithms: Algorithm X with O(n log n) average-case complexity and Algorithm Y with O(n^2) worst-case complexity. In your benchmarks, Algorithm Y consistently outperforms Algorithm X. What is a PLAUSIBLE explanation for this observation?

You need to find the smallest k elements in an unsorted array of size n. What is the most efficient time complexity achievable in the average case?

Consider an algorithm that iterates through a sorted array of size n. In the best-case scenario, the algorithm finds the desired element in the first comparison. What is the time complexity of this algorithm in the best case?

Which statement about benchmarking is TRUE?

You are designing a data structure that supports two operations: 'insert' and 'find median'. 'Insert' adds an element in O(log n) time. Which of the following allows the 'find median' operation to also be achieved in O(log n) time?