I am trying to sort these funtions : `flist = {8^(Sqrt[Log[3, n]]), Log[2, n]^(Log[2, n]/Log[2, Log[2, n]]),
Factorial[n], n^(1/Log[9, n]), Log[2, Log[2, n]], 1.0005^n,
5^(Log[7, n]), Log[2, Factorial[n]], n^4, Sqrt[n], 2^(Log[5, n]),
2^(Log[2, n])^5}` by order of growth (Asymptotic Notation). I tired `DiscreteAsymptotic[flist[[i]], n -> \[Infinity]], {i, Length[flist]` but it wasn't helpful. I tried plugging in large values of n and also plotting them and got some results but I am not satisfied with my approach. Is there a better way to go about it?
Factorial[n], n^(1/Log[9, n]), Log[2, Log[2, n]], 1.0005^n,
5^(Log[7, n]), Log[2, Factorial[n]], n^4, Sqrt[n], 2^(Log[5, n]),
2^(Log[2, n])^5}` by order of growth (Asymptotic Notation). I tired `DiscreteAsymptotic[flist[[i]], n -> \[Infinity]], {i, Length[flist]` but it wasn't helpful. I tried plugging in large values of n and also plotting them and got some results but I am not satisfied with my approach. Is there a better way to go about it?