I have a question about calculating timecomplexity in algorithms. Is it possible to have a notation such as O(n^4) if you have four nested forloops?
Quite simply, the answer is yes. Four nested loops could (depending on the loops) be O(n^{4}). There are not a lot of polynomialtime algorithms with complexity above cubic, but they do exist. For example, the wellknown AKS primality test is O(k^{12}) in its original formulation (where k is the length of the input number), though it has been recently reduced to k^{7.5}. 

