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When plotting a function using Plot, I would like to obtain the set of data points plotted by the Plot command.

For instance, how can I obtain the list of points {t,f} Plot uses in the following simple example?

f = Sin[t]
Plot[f, {t, 0, 10}]

I tried using a method of appending values to a list, shown on page 4 of Numerical1.ps (Numerical Computation in Mathematica) by Jerry B. Keiper, http://library.wolfram.com/infocenter/Conferences/4687/ as follows:

f = Sin[t]
flist={}
Plot[f, {t, 0, 10}, AppendTo[flist,{t,f[t]}]]

but generate error messages no matter what I try.

Any suggestions would be greatly appreciated.

share|improve this question
    
The error messages are quite understandable. The use of AppendTo as a third argument of Plot is not a supported syntax. I just examined the 19 year old paper (time flies if you're having fun) you were referring to and it uses the compound syntax similar to the one I used below. –  Sjoerd C. de Vries Mar 19 '11 at 23:18
    
Is this question a duplicate? I know it has been asked before, and I thought I saw it on StackOverflow, but now I cannot find it. –  Mr.Wizard Mar 20 '11 at 5:25
    
@Mr. Wizard. Perhaps here? –  TomD Mar 20 '11 at 12:38
    
@TomD I don't believe that is what I am recalling. It was probably a MathGroup message. –  Mr.Wizard Mar 20 '11 at 13:01

7 Answers 7

up vote 12 down vote accepted
f = Sin[t];
plot = Plot[f, {t, 0, 10}]

One way to extract points is as follows:

points = Cases[
   Cases[InputForm[plot], Line[___], 
    Infinity], {_?NumericQ, _?NumericQ}, Infinity];

ListPlot to 'take a look'

ListPlot[points]

giving the following:

enter image description here

EDIT Brett Champion has pointed out that InputForm is superfluous.

ListPlot@Cases[
  Cases[plot, Line[___], Infinity], {_?NumericQ, _?NumericQ}, 
  Infinity]

will work.

It is also possible to paste in the plot graphic, and this is sometimes useful. If,say, I create a ListPlot of external data and then mislay the data file (so that I only have access to the generated graphic), I may regenerate the data by selecting the graphic cell bracket,copy and paste:

ListPlot@Transpose[{Range[10], 4 Range[10]}]

points = Cases[
  Cases[** Paste_Grphic _Here **, Point[___], 
   Infinity], {_?NumericQ, _?NumericQ}, Infinity] 

Edit 2.

I should also have cross-referenced and acknowledged this very nice answer by Yaroslav Bulatov.

Edit 3

Brett Champion has not only pointed out that FullForm is superfluous, but that in cases where a GraphicsComplex is generated, applying Normal will convert the complex into primitives. This can be very useful.

For example:

lp = ListPlot[Transpose[{Range[10], Range[10]}], 
  Filling -> Bottom]; Cases[
 Cases[Normal@lp, Point[___], 
  Infinity], {_?NumericQ, _?NumericQ}, Infinity] 

gives (correctly)

{{1., 1.}, {2., 2.}, {3., 3.}, {4., 4.}, {5., 5.}, {6., 6.}, {7., 7.}, {8., 8.}, {9., 9.}, {10., 10.}}

Thanks to Brett Champion.

Finally, a neater way of using the general approach given in this answer, which I found here

The OP problem, in terms of a ListPlot, may be obtained as follows:

ListPlot@Cases[g, x_Line :> First@x, Infinity]

Edit 4

Even simpler

ListPlot@Cases[plot, Line[{x__}] -> x, Infinity]

or

ListPlot@Cases[** Paste_Grphic _Here **, Line[{x__}] -> x, Infinity]

or

ListPlot@plot[[1, 1, 3, 2, 1]]

This evaluates to True

plot[[1, 1, 3, 2, 1]] == Cases[plot, Line[{x__}] -> x, Infinity]
share|improve this answer
3  
InputForm is unnecessary, but you might replace it with Normal if you don't have control over where the plot is coming from. If you add a Filling option, for example, the plot will contain GraphicsComcplex and the points will just be integer references to the global set of points. –  Brett Champion Mar 19 '11 at 20:19
    
@Brett Champion Thanks! I never realized that InputForm was superfluous. I have edited accordingly. I usually 'take a look' before data extraction. ( Usually a strategy then suggests itself.) Can you post an example where GraphicsComplex will give integer refs? f = Sin[t]; plotfill = Plot[f, {t, 0, 10}, Filling -> Axis]; ListPlot@Cases[ Cases[plot, GraphicsComplex[___], Infinity], {_?NumericQ, _?NumericQ}, Infinity] will work, for example. Thanks for your comment. I use this approach quite a bit. –  TomD Mar 19 '11 at 23:11
2  
ListPlot[{1, 2}, Filling -> Bottom] contains the following GraphicsComplex: GraphicsComplex[{{1., 1.}, {2., 2.}, {1., 0.}, {2., 0.}, {1., 1.}, {2., 2.}}, {{{}, {}, {}, {}, {Directive[{Opacity[0.2], Hue[0.67, 0.6, 0.6]}], Line[{3, 1}], Line[{4, 2}]}}, {{}, {Hue[0.67, 0.6, 0.6], Point[{5, 6}]}, {}}}]. The Line[{4,2}] means that we're drawing a line from the fourth point ({2., 0.}) to the second point ({2., 2.}). –  Brett Champion Mar 20 '11 at 3:24
    
@Brett Champion Once again, many thanks! I'm afraid I initially missed you point about Normal and how (as I learn from the Help on GraphicsComplex) it may be used to split a GraphicsComplex into primitives. Cases[Cases[Normal@ListPlot[{1, 2}, Filling -> Bottom], Point[___], Infinity], {_?NumericQ, _?NumericQ}, Infinity] will abstract the (two) data points from the example you give. Leaving it out, or substituting FullForm will not work. This is good to know, and (again) thanks! –  TomD Mar 21 '11 at 17:07

One way is to use EvaluationMonitor option with Reap and Sow, for example

In[4]:= 
(points = Reap[Plot[Sin[x],{x,0,4Pi},EvaluationMonitor:>Sow[{x,Sin[x]}]]][[2,1]])//Short

Out[4]//Short= {{2.56457*10^-7,2.56457*10^-7},<<699>>,{12.5621,-<<21>>}}
share|improve this answer
4  
And for any situation where EvaluationMonitor is not available you can make use of a compound statement, e.g. as in: {plot, {points}} = Reap[Plot[Sow[x]; Sin[x], {x, 0, 4 Pi}]]; Note that in this particular case the first two points should be dropped as they are not part of the numerical evaluation loop. –  Sjoerd C. de Vries Mar 19 '11 at 21:31
    
@Sjoerd I second this. I actually used this method in this post: stackoverflow.com/questions/4667323/… . But, since I assumed that the OP saw that answer, and since EvaluationMonitor allows to avoid this step and is perhaps generally "cleaner" when available, I used it here. –  Leonid Shifrin Mar 19 '11 at 22:20
    
A very nice method –  TomD Mar 19 '11 at 23:35
    
EvaluationMonitor:>Sow[{x,Sin[x]}] requires additional evaluation of the objective function at every point. See my answer for much more efficient solution (similar to @Sjoerd's but different). –  Alexey Popkov Nov 6 '11 at 20:47

In addition to the methods mentioned in Leonid's answer and my follow-up comment, to track plotting progress of slow functions in real time to see what's happening you could do the following (using the example of this recent question):

(* CPU intensive function *)
LogNormalStableCDF[{alpha_, beta_, gamma_, sigma_, delta_}, x_] :=
 Block[{u},
  NExpectation[
   CDF[StableDistribution[alpha, beta, gamma, sigma], (x - delta)/u], 
   u \[Distributed] LogNormalDistribution[Log[gamma], sigma]]]

(* real time tracking of plot process *)
res = {};
ListLinePlot[res // Sort, Mesh -> All] // Dynamic

Plot[(AppendTo[res, {x, #}]; #) &@
  LogNormalStableCDF[{1.5, 1, 1, 0.5, 1}, x], {x, -4, 6}, 
 PlotRange -> All, PlotPoints -> 10, MaxRecursion -> 4]

enter image description here

enter image description here

enter image description here

etc.

share|improve this answer
    
IMHO this is a very nice way to monitor plot progress. kudos. –  belisarius Mar 19 '11 at 22:35

Here is a very efficient way to get all the data points:

{plot, {points}} = Reap @ Plot[Last@Sow@{x, Sin[x]}, {x, 0, 4 Pi}]
share|improve this answer
    
+1 for terse code :-) –  Mr.Wizard Nov 7 '11 at 6:50
2  
Alternatively, one could make the part inside Plot and the assignment a little cleaner, at the expense of a more elaborate Reap syntax: {plot, points} = Reap[ Plot[Sow[Sin@x, x], {x, 0, 4 Pi}], _, {#, #2[[1]]} &] –  Mr.Wizard Nov 7 '11 at 7:08
    
@Mr. It is very instructive example of usage of the third argument of Reap, thank you! –  Alexey Popkov Nov 7 '11 at 7:44

Based on the answer of Sjoerd C. de Vries, I've now written the following code which automates a plot preview (tested on Mathematica 8):

pairs[x_, y_List]:={x, #}& /@ y
pairs[x_, y_]:={x, y}
condtranspose[x:{{_List ..}..}]:=Transpose @ x
condtranspose[x_]:=x
Protect[SaveData]
MonitorPlot[f_, range_, options: OptionsPattern[]]:=
  Module[{data={}, plot},
    Module[{tmp=#},
      If[FilterRules[{options},SaveData]!={},
        ReleaseHold[Hold[SaveData=condtranspose[data]]/.FilterRules[{options},SaveData]];tmp]]&@
    Monitor[Plot[(data=Union[data, {pairs[range[[1]], #]}]; #)& @ f, range,
                 Evaluate[FilterRules[{options}, Options[Plot]]]],
      plot=ListLinePlot[condtranspose[data], Mesh->All,
      FilterRules[{options}, Options[ListLinePlot]]];
      Show[plot, Module[{yrange=Options[plot, PlotRange][[1,2,2]]},
        Graphics[Line[{{range[[1]], yrange[[1]]}, {range[[1]], yrange[[2]]}}]]]]]]
SetAttributes[MonitorPlot, HoldAll]

In addition to showing the progress of the plot, it also marks the x position where it currently calculates.

The main problem is that for multiple plots, Mathematica applies the same plot style for all curves in the final plot (interestingly, it doesn't on the temporary plots).

To get the data produced into the variable dest, use the option SaveData:>dest

share|improve this answer
1  
Very nice! +1. An example of use: MonitorPlot[Pause[.08];Sin[x],{x,0,Pi},PlotRange->{{0,Pi},Full}]. –  Alexey Popkov Nov 6 '11 at 20:27
1  
Related: "How Plot[] works in mathematica." –  Alexey Popkov Nov 6 '11 at 20:30

Just another way, possibly implementation dependent:

ListPlot@Flatten[
            Plot[Tan@t, {t, 0, 10}] /. Graphics[{{___, {_, y__}}}, ___] -> {y} /. Line -> List
         , 2]

enter image description here

share|improve this answer
    
I would like to do a rewrite of your answer to stackoverflow.com/questions/2969696 -- is that OK, or should I post a separate answer? –  Mr.Wizard Mar 20 '11 at 12:17
    
@Mr. The usual procedure for code golf questions is to edit the existing answer if your mod is a minor update using the same method, or adding a new one if you propose a different approach. Feel free to decide on that basis. –  belisarius Mar 20 '11 at 15:43

Just look into structure of plot (for different type of plots there would be a little bit different structure) and use something like that:

plt = Plot[Sin[x], {x, 0, 1}];
lstpoint = plt[[1, 1, 3, 2, 1]];
share|improve this answer
    
This is already covered in TomD's answer, under Edit 4. –  Mr.Wizard Oct 16 '12 at 13:23

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