Time Complexity of Algorithms Questions

Dynamic programming aims to reduce the time complexity of an algorithm by:

You have an algorithm with a time complexity of O(2^n). If you double the input size, how would you expect the execution time to be affected?

You need to choose between two algorithms for your application. Algorithm A has a time complexity of O(n log n) but is known to be difficult to implement efficiently. Algorithm B has a time complexity of O(n^2) but is straightforward to implement and likely to have lower constant factors. Which of the following factors is LEAST important in deciding which algorithm to choose?

What is the time complexity of Dijkstra's algorithm for finding the shortest path in a graph with V vertices and E edges using an adjacency list and a priority queue?

An algorithm processes an input of size 'n' by dividing it in half repeatedly until the size becomes 1. What is the most likely time complexity of this algorithm?

What does it mean for an algorithm to have a time complexity of Θ(1)?

You have two algorithms for a task: Algorithm A with Θ(n) complexity and Algorithm B with O(n^2) complexity. Which statement is ALWAYS true?

What is the time complexity of calculating the nth Fibonacci number using the dynamic programming approach?

What is the Big-O notation of an algorithm that iterates through an array of size 'n' twice in nested loops?

Which asymptotic notation provides an upper bound on an algorithm's runtime, but the bound may not be tight?