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 Feb12 comment Mathematica: Defining a function as the derivative or integral of a piecewise defined function I mentioned that might happen; it's nothing to worry about. Before the `Plot` gets down to the business of making the plot, it tries to do a bit of simplification of the expression to see if it can make it go faster. Those simplifications make certain assumptions about the symbolic nature of the expression that we're violating. Eventually after throwing those warnings, `Plot` will give up and do it the slow way. Feb12 comment Mathematica: Defining a function as the derivative or integral of a piecewise defined function Ah, I kind of glossed over that. When you use `S` inside of a `Plot`, the `h` is the dependent variable of the plot; that is, it's a real number. You can't take a derivative with respect to a real number. So instead, you use a dummy variable `hh` and substitute `h` in after the derivative. Feb12 comment Mathematica: Defining a function as the derivative or integral of a piecewise defined function Trivial counterexample: `Pd[h_]:=Sin[h^2];P[r_,h_]:=r^2+8 Pd[h];W[h_]:=Integrate[\[Pi] P[r,h],{r,0,1}];S[h_]:=(D[W[hh],hh]/.hh->h);Plot[S[h],{h,0,2 \[Pi]}]`. Did you try the given solution? It works for me; if it does not work for you, can you say why it failed?