I am working with Чебышёв-polynomials at the moment, recursive defined polynomials. For the very likely case you never saw them before:
f[0,x_] := 1;
f[1,x_] := x;
f[n_,x_] := 2 * x * f[n-1, x] - f[n-2, x];
Plot[{f[9, x],f[3, x]},{x, -1, 1}]
And I found myself asking, since I usually work with python, if there is a way to build an array of functions in wolfram-cloud, to ease the process.
Thus I have to calculate every f[n]
only once, allowing me to improve the run-time quite a bit and also allowing me to extend the range of n.
ChebyshevT
? My naive expectation is that using this will improve run-time quite a bit, with very little effort on your part.f[27,x]
and tried to calculate it once and access it afterwards without outputing it. Both times I checked the time before minus the time after the calculation. And each time it took 3.1 seconds. Either implying that looking it up takes ages and that it was pre-calculated (in a fresh book) or that it actually calculated it both times.