The Q&A How to find time complexity of an algorithm is mentioned relatively often in related Q&As. I don't think it does a good-enough job in teaching the ability of finding the time complexity of an algorithm.
The question itself is broad – it should be actually closed for lacking focus IMO – and asks about how one can calculate the time complexity of any (!) algorithm. This is difficult to answer properly and formally correct in the Stack Overflow format.
The first-placed answer does not attempt to answer the question. It does not teach any methodology on how to calculate time complexity. It just takes the simplistic example in the question and explains why
2 is ignored in
2N + 2. Then it "explains" why also the factor
2 is ignored in
2N. However, the latter explanation is straight-up incorrect. It has nothing to do with tradition, nor has it anything to do with if
2N is well-defined. This property – "constant factors are dropped" – is derived from the mathematical definition of Big O.
The second-placed answer also does not attempt to teach any methodology on how to calculate time complexity. The whole answer is basically a simplistic explanation of what Big O is. The given examples are supposed to show some complexity classes, however, the explanations on why each given algorithm has a specific complexity class are very sparse.
The thrid-placed answer is more or less the same thing as the second-placed answer, just in worse. Again no attempt to teach methodology on how to calculate time complexity. The difference is that it skips examples for a quadratic and logarithmic algorithm. I'm actively ignoring the linked algorithms because I think it's lazy to just link some Wikipedia articles. This should not be the standard for Stack Overflow.
The fourth-placed answer is partially a worse version of the second- and the third-placed answer. But, it has at least an example of the analysis of an algorithm at the end. It's not a great example and not explained well and detailed, however, it's at least a step in the right direction to answer the question, which is about methodo..., I stop.
There is no proper answer under this question IMO. I think most users who post questions about time complexity ask about simple algorithms. Most often these algorithms are either constant, linear or polynomial. "Calculating" these complexity classes is usually intuitive. I often see explanations like "Yoy, that's two nested loops, that's O(n^2)!" and that's fine; no formal calculation is needed in most cases. A reference like the Q&A I'm talking about here, which summarizes some basic concepts, is good enough ..
.. but is it when it comes to more complex algorithms? I strongly doubt that any reader of this Q&A will be able to calculate the time complexity of more complex algorithms, ones that belong to logarithmic, factorial, exponential and other complexity classes. I strongly doubt that any reader of this Q&A will be able to handle recursive algorithms; they would need to find Determining complexity for recursive functions (Big O notation) at least.
To make my post here a little more constructive: What is the best way to handle this Q&A? Is there any need for a change at all? Posting a new answer is an option but not an ideal option IMO, as the accepted answer would stay the same.