I have always had this question in my head, and have never been able to connect these two concepts so I am looking for some help in understanding Logarithms in Computer Science with respect to Big-O notation and algorithmic time complexity. I understand logarithms as a math concept as being able to answer the question, *"what number do I need to raise this base to exponentially to get X?"*. For example, log2(16) tells us that we need to raise 2 to the 4th power to get 16. I also have a memorization-level understanding that O(log n) algorithms are faster than O(n) and other slower algorithms such as those that are exponential and that an example of an O(log n) algorithm is searching a balanced binary search tree.

My question is a little hard to state exactly, but I think it boils down to why is searching a balanced BST logarithmic and what makes it logarithmic and how do I relate mathematical logarithms with the CS use of the term? And a follow-up question would be what is the difference between O(n log n) and O(log n)?

I know that is not the clearest question in the world, but if someone could help me connect these two concepts it would clear up a lot of confusion for me and take me past the point of just memorization (which I generally hate).