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If I do a Plot with Frame->True is there a way I can find the coordinates of the corners of the Frame in the absolute coordinates of the image? I have the numerical values of PlotRange and PlotRangePadding but note that I don't want to tamper with the actual plot in any way, just find out where in the full display area Mathematica chooses to place the frame/axes of the plot.

As pointed out by Brett Champion, I'm looking for the coordinates {x,y} such that Scaled[{0,0}] == ImageScaled[{x,y}].

[Note that I edited this question to remove my confusing misuse of the term "scaled coordinates".]

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Thanks so much, everyone, especially Brett! I appended a function, geom, to Brett's answer that does exactly what I want, using his Rasterize trick (which I never would've thought of!). –  dreeves Apr 8 '11 at 22:49

3 Answers 3

up vote 7 down vote accepted

The corners of the frame are at Scaled[{0,0}] and Scaled[{1,1}].

The corners of the full graphic (including labels) are at ImageScaled[{0,0}] and ImageScaled[{1,1}].

Converting between them is hard, although in theory it's possible to convert Scaled and user (unscaled) coordinates if you know the actual, numeric, settings for PlotRange and PlotRangePadding.

Depending on your application, you might also be able to use MousePosition, which knows these things as well.

Rasterize (and HTML export) also know how to find bounding boxes of annotations, in a bitmap/pixel coordinate system:

In[33]:= Rasterize[
 Plot[Sin[x], {x, 0, 10}, Frame -> True, 
  Prolog -> {LightYellow, 
    Annotation[Rectangle[Scaled[{0, 0}], Scaled[{1, 1}]], "One", 
     "Region"]}], "Regions"]

Out[33]= {{"One", "Region"} -> {{22., 1.33573}, {358.9, 209.551}}}

Here's how dreeves used that Rasterize trick to make a function to return exactly what he was looking for (note the assumption of a global variable imgsz which gives the ImageSize option for rasterizing the plot -- the coordinates of the frame depend on that value):

(* Returns the geometry of the frame of the plot: 
   {width, height, x offset, y offset, total width, total height}. *)
geom[p_Graphics] := Module[{q, x1, y1, x2, y2, xmax, ymax},
  q = Show[p, Prolog->{Annotation[Rectangle[Scaled[{0,0}], Scaled[{1,1}]], 
  {{x1,y1}, {x2,y2}} = Rasterize[q, "Regions", ImageSize->imgsz][[1,2]];
  {xmax,ymax} = Rasterize[p, "RasterSize", ImageSize->imgsz];
  {x2-x1, y2-y1, x1, y1, xmax, ymax}]
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Ah, this is helpful! Converting Scaled[{0,0}] and Scaled[{1,1}] to ImageScaled is what I'm after. Ie, what is the (x,y) such that Scaled[{0,0}] == ImageScaled[{x,y}]. I do know the settings PlotRange and PlotRangePadding. I guess I'll add that to the question. Thanks again, Brett! –  dreeves Apr 8 '11 at 3:47
Oh, wow, didn't see your addendum when I wrote my comment. So that Annotation trick seems to be generating exactly what I'm looking for... –  dreeves Apr 8 '11 at 3:53
You should be able to do that with a couple of calls to Rasterize, then. Once with "Regions", and once with "RasterSize". –  Brett Champion Apr 8 '11 at 3:55
+1 I did not know about "Regions" in Razterize! –  Mr.Wizard Apr 8 '11 at 6:50
I like that this also works without modifying the plot (call it p): Rasterize[ Show[p, Prolog -> {Annotation[ Rectangle[Scaled[{0, 0}], Scaled[{1, 1}]], "One", "Region"]}], "Regions"] –  Mr.Wizard Apr 8 '11 at 7:03

The coordinates of the upper left corner of the frame are always Scaled[{0,1}]. The coordinates of the lower right corner of the frame are always Scaled[{1,0}].

Let's place large points at the upper left and lower right corners:

Plot[Cos[x], {x, 0, 10}, Frame -> True, 
Epilog -> {PointSize[.08], Point[Scaled[{0, 1}]], Point[Scaled[{1, 0}]]} ]

When I click on the graph (see below) , it is obvious that there is no padding around the frame of the plot.

no padding

Now, with ImagePadding on, let's place Points in the same corners:

Plot[Cos[x], {x, 0, 10}, Frame -> True,  
ImagePadding -> {{37, 15}, {20, 48}}, 
Epilog -> {PointSize[.08], Point[Scaled[{0, 1}]],  Point[Scaled[{1, 0}]]} ]

The Points stay at the corners of the graph frame. There is ImagePadding around the graph frame.

with padding

EDIT: Based on the clarification of the question by dreeves.

Plot[Cos[x], {x, 1, 9}, ImageSize -> 300, AspectRatio -> 1, 
Frame -> True, ImagePadding -> 30, 
FrameTicks -> {Range[9], Automatic}, 
Epilog -> {PointSize[.08], Point[Scaled[{0, 1}]], Point[Scaled[{1, 0}]]}]


I've drawn the plot as 300x300 to simplify the numbers. Here's the analysis.

  1. Documentation states that ImagePadding "is defined within ImageSize".
  2. The image shown above has a width and height of 300 pixels.
  3. There is a 30 pixel margin drawn around the frame; this corresponds to 10% of the width and height.
  4. So the frame corners should be, starting from the origin, at ImageScaled[{.1,.1}], ImageScaled[{.9,.1}, ImageScaled[{.9,.9}] & ImageScaled[{.1,.9}].

It's easy to work out the value for other AspectRatios and ImageSizes.

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Yeah, I probably mean something like "absolute coordinates in the full display area". Do you know the right terminology? I'll update the question (or feel free to!). –  dreeves Apr 8 '11 at 3:03
Oh, but if scaled coordinates have (0,0) at one corner of the full display area and (1,1) at the other corner, then scaled coordinates would indeed tell me what I want to know, namely where are the corners of the actual frame? –  dreeves Apr 8 '11 at 3:07
@dreeves Precisely. I'll try to show it by plotting points. –  David Carraher Apr 8 '11 at 3:09
Thanks. Makes sense. I just edited the question to be clearer about what I'm really after: what are the coordinates of those black dots in ImageScaled coordinates, where {0,0} is the corner of the whole display area, not just the frame? –  dreeves Apr 8 '11 at 4:00
@dreeves I attempted to show how to describe the corners of the frame according to their location in the full image space. –  David Carraher Apr 8 '11 at 4:35

One possibility is to take manual control of ImagePadding:

Plot[Sin[x], {x, 0, 10}, Frame -> True, 
 ImagePadding -> {{30, 5}, {20, 5}}]

enter image description here

ImageTake[Rasterize[%], {5, -20}, {30, -5}]

enter image description here

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Ah, that cuts off the text if it's too wide. Try plotting Sin[x]+10^6 in your example. Good approach but that glitch is a dealbreaker for what I'm after. –  dreeves Apr 8 '11 at 2:57
@dreeves yes, but of course you could use different values. I also don't know if this addresses your scaling concern. –  Mr.Wizard Apr 8 '11 at 3:03
Well, I don't want to mess with the original plot, just find out the coordinates of the frame edges, wherever mma decides to put them. –  dreeves Apr 8 '11 at 3:04
@dreeves you may be able to extract useful information from FullGraphics but that loses aspect ratio, and at the moment I cannot recall how to fix that; it's somewhere in the MathGroup archive. ps forgot to upvote your question; fixed! –  Mr.Wizard Apr 8 '11 at 3:07

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