need another answer from a different expert

pls explain well

Topic: 

PYTHON

Big-O NOTATION

Linked Lists in Python

 

Transcribed Image Text:

ΡΥTHON Big-O Notation Linked Lists Consider the implementation of insertion sort that uses a modified binary search algorithm below: def insertion_sort(arr): for i in range (1, len(arr)): t = arr[i] # get index of arr[i] in # assumed sorted sub-array arr[:i] j = binary_search(arr[i], arr[:i]) # insert arr[i] at index j arr.insert(j, arr[i]) # removes element at index i + 1 # (shifted because of insert) arr.pop(i+1) Assuming "arr" is a dynamic list and binary_search runs in O(log i)) time, what is the worst- case time complexity of this specific implementation of insertion sort? Briefly defend your answer. How does it differ from the previously implemented insertion sort algorithm that doesn't use binary search? How did this affect the time complexity?