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My question is: why doesn't the following work, and how do I fix it?

Plot[f[t], {t, 0, 2*Pi}] /. {{f -> Sin}, {f -> Cos}}

The result is two blank graphs. By comparison,

DummyFunction[f[t], {t, 0, 2*Pi}] /. {{f -> Sin}, {f -> Cos}}


{DummyFunction[Sin[t], {t, 0, 2 *Pi}],  DummyFunction[Cos[t], {t, 0, 2 * Pi}]}

as desired.

This is a simplified version of what I was actually doing. I was very annoyed that, even after figuring out the annoying "right way" of putting the curly brackets nothing works.

In the end, I did the following, which works:

p[f_] := Plot[f[t], {t, 0, 2*Pi}]
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3 Answers 3

up vote 4 down vote accepted

Mathematica is trying to evaluate Plot before the substitution. You can prevent that with the Hold and ReleaseHold functions:

ReleaseHold[Hold[Plot[f[t],{t,0,2*Pi}]] /. {{f -> Sin},{f -> Cos}}]

Hold[] will force the entire Plot subexpression to remain unsimplified while the substitution is performed, then ReleaseHold[] will let it proceed with the actual plotting.

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Thank you for your answer. Your solution has a typo, you should have /. instead of the first ->. It works. However, it makes little sense to me why substitution wouldn't be at the top of the order of precedence... – Ilya Mar 22 '10 at 2:52
(The typo is now fixed by Ramasalanka) – Ilya Mar 22 '10 at 2:54
I can't explain why the order of operations is the way it is, but it's not just Plot. Mathematica will try to evaluate any function on the left-hand side of /. (sorry about the typo earlier) before it performs the substitution. A lot of the time that doesn't matter: the undefined f[t] will just be carried through the function definition until the substitution is performed. For example, myFun[x_, l_] := x /@ l; myFun[f, {1,2,3}] /. {{f->Sin}, {f->Cos}} will work like you expect it to. But Plot[] is one of the examples where having f[t] be undefined will result in an immediate error. – Peter Milley Mar 22 '10 at 2:59
The reason that Plot evaluates before the rule-replacement is because /. is just an infix operator for the ReplaceAll function. f[x] /. x-> y is therefore just the expression ReplaceAll[f[x], x->y] and ReplaceAll does not have any Hold* attributes. See this tutorial for more basics about Mathematica's evaluation semantics: – Michael Pilat Mar 25 '10 at 17:42

As an alternative to Peter's Hold/ReleaseHold strategy you could do

Plot[Evaluate[ f[t]/. {{f -> Sin}, {f -> Cos}} ], {t, 0, 2*Pi}]

which is a little cleaner to read. This ensures that f is substituted before Plot is evaluated.

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You don't even need the Evaluate[], just having moved the substitution inside the Plot[] is enough. Plot[f[t]/. {{f -> Sin}, {f -> Cos}}, {t, 0, 2*Pi}] – Isaac Mar 22 '10 at 7:57
@Isaac: Not always. There have been times I have found that it is necessary to Evaluate first, otherwise Plot doesn't do what you expect. – rcollyer Mar 22 '10 at 18:46
@rcollyer: Yes, it depends on what's being substituted. In this particular instance, it works as I said, though (at least for me in your code produces the curves in two different colors and my code produces both curves in the same color. Of course, both your code and mine produce two curves on one grid, which may not have been what the original poster intended (perhaps two separate grids). – Isaac Mar 22 '10 at 21:17
I'm sorry to keep jumping with my accepted answer. I realized that Isaac is right: I did want two separate plots. Your answer is still very interesting, though. – Ilya Mar 23 '10 at 2:38
Using Evaluate means the susbtitution is done once and then the result is used by Plot; without Evaluate, the ReplaceAll will be once per plot point. Then Plot won't do the analysis that lets it automagically give curves different colors. It's also slower if you aren't doing something simple--stick an NDSolve on the right side of that /. and you'll probably have time to get a cup of coffee if the Evaluate isn't there. 9 times out of 10 Evaluate is the right solution: the exception is if the thing you're trying to Plot needs a numerical argument to work. – Pillsy Mar 24 '10 at 13:58

This one is even shorter:

Plot[#[t], {t, 0, 2*Pi}] & /@ {Sin, Cos}
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This is very nice! I'm accepting Peter's answer since it seems less like a puzzle, but this is certainly a cool way to shorten my "solution" to a line. – Ilya Mar 23 '10 at 2:41
To further lobby for this method (and Peter's can be extended in the same way), this can be extended using MapIndexed or MapThread to allow you to style each plot differently. Additionally, they can then be combined using Show to create rather complex plots. (This is the method I tend to favor in my data analysis.) – rcollyer Mar 23 '10 at 12:25

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