This should do it.

```
m = 10; c = 2; k = 5; F = 12;
fun[f_?NumericQ] :=
Module[
{x, t},
First[x /.
NDSolve[
{m*x''[t] + c*x'[t] + (k*Sin[2*Pi*f*t])*x[t] == F*Sin[2*Pi*f*t],
x[0] == 0, x'[0] == 0},
x, {t, 0, 30}
]
]
]
ContourPlot[fun[f][t], {f, 0, 5}, {t, 0, 30}]
```

Important points:

The pattern _?NumericQ prevents `fun`

from being evaluated for symbolc arguments (think `fun[a]`

), and causing `NDSolve::nlnum`

errors.

Since `NDSolve`

doesn't appear to localize its function variable (`t`

), we needed to do this manually using `Module`

to prevent conflict between the `t`

used in `NDSolve`

and the one used in `ContourPlot`

. (You could use a differently named variable in `ContourPlot`

, but I think it was important to point out this caveat.)

For a significant speedup in plotting, you can use memoization, as pointed out by Mr. Wizard.

```
Clear[funMemo] (* very important!! *)
funMemo[f_?NumericQ] :=
funMemo[f] = Module[{x, t},
First[x /.
NDSolve[{m*x''[t] + c*x'[t] + (k*Sin[2*Pi*f*t])*x[t] ==
F*Sin[2*Pi*f*t], x[0] == 0, x'[0] == 0}, x, {t, 0, 30}]]]
ContourPlot[funMemo[f][t], {f, 0, 5}, {t, 0, 30}] (* much faster than with fun *)
```

If you're feeling adventurous, and willing to explore Mathematica a bit more deeply, you can further improve this by limiting the amount of memory the cached definitions are allowed to use, as I described here.

Let's define a helper function for enabling memoization:

```
SetAttributes[memo, HoldAll]
SetAttributes[memoStore, HoldFirst]
SetAttributes[memoVals, HoldFirst]
memoVals[_] = {};
memoStore[f_, x_] :=
With[{vals = memoVals[f]},
If[Length[vals] > 100, f /: memoStore[f, First[vals]] =.;
memoVals[f] ^= Append[Rest[memoVals[f]], x],
memoVals[f] ^= Append[memoVals[f], x]];
f /: memoStore[f, x] = f[x]]
memo[f_Symbol][x_?NumericQ] := memoStore[f, x]
```

Then using the original, non-memoized `fun`

function, plot as

```
ContourPlot[memo[fun][f][t], {f, 0, 5}, {t, 0, 30}]
```

`NDSolve::nlnum: "The function value {0.,1/10\ (0.\[VeryThinSpace]+12\ Sin[0.0193488\ f])}\\n is not a list of numbers with dimensions {2} at \!\({t, x[t], \*SuperscriptBox[\"x\", \"\[Prime]\",MultilineFunction->None][t]}\) = {0.00307945,0.,0.}."`

— should that have been an uppercase F in the sine? – celtschk Nov 18 '11 at 8:31x''[t] + cx'[t] + (kSin[2*Pift])*x[t] == FSin[2*Pift], x[0] == 0, x'[0] == 0}, x[t], {t, 0, 30}] x is a function of t and f – h02h001 Nov 18 '11 at 8:36