# Forcing x axis to align with y axis in Mathematica Plot

In Mathematica, when I plot things sometimes I don't always get the x-axis to line up with the exact bottom of the plot. Is there any way I can force it to do this all the time?

Here's an example of what I'm talking about: http://i.imgur.com/3lcWd.png

I want the x-axis to line up perfectly with the zero tick mark way at the bottom, not in the middle of the y-axis as it is in that image.

Any way I can accomplish this?

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I think it would help if you could add the mathematica statement that produced that plot/image to your question? –  dbjohn Sep 30 '11 at 21:12

Use the option `AxesOrigin -> {0,0}`

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Perfect! That's exactly what I was looking for, thank you! –  Mike Bantegui Sep 30 '11 at 21:37

The following will draw your Axes on the left and bottom, irrespective to the coordinate values:

``````aPlot[f_, var_, opts : OptionsPattern[]] :=
Plot[f, var,
AxesOrigin ->
First /@ (# /. AbsoluteOptions[Plot[f, var, opts], #] &@PlotRange), opts]

aPlot[Evaluate[Table[BesselJ[n, x], {n, 4}]], {x, 0, 10}, Filling -> Axis]
``````

``````aPlot[Sin[x], {x, 0, 2 Pi}]
``````

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+1 Handy! ----- –  Simon Oct 1 '11 at 11:31
@belisarius: I like your solution and Alexey Popkov's derived solution for their generality, but I want to stay away from them simply because it's so much more complicated and the alignment I need to do is easily satisfied by `AxesOrigin->{0, 0}`. It's too bad something like this isn't already built into Mathematica. –  Mike Bantegui Oct 11 '11 at 4:37
@Mike If all you need is the {0,0} case, obviously `AxesOrigin` is the way to go! –  belisarius is forth Oct 11 '11 at 4:41

You could also use something like: `Frame -> {{Automatic, None}, {Automatic, None}}`

(Also I think that fact that it's not choosing `{0,0}` by default means that `y=0` is being brought into range by `PlotRangePadding`. So that may be another option to keep an eye on.)

-

Here is (IMO) more elegant method based on belisarius's code which uses the `DisplayFunction` option (see here interesting discussion on this option):

``````Plot[Evaluate[Table[BesselJ[n, x], {n, 4}]], {x, 0, 10},
Filling -> Axis,
DisplayFunction ->
Function[{plot},
Show[plot,
AxesOrigin ->
First /@ (PlotRange /. AbsoluteOptions[plot, PlotRange]),
DisplayFunction -> Identity]]]
``````

The only drawback of both methods is that `AbsoluteOptions` does not always give correct value of `PlotRange`. The solution is to use the `Ticks` hack (which gives the complete `PlotRange` with explicit value of `PlotRangePadding` added):

``````completePlotRange[plot_] :=
Last@Last@
Reap[Rasterize[
Show[plot, Ticks -> (Sow[{##}] &), DisplayFunction -> Identity],
ImageResolution -> 1]]
Plot[Evaluate[Table[BesselJ[n, x], {n, 4}]], {x, 0, 10},
Filling -> Axis,
DisplayFunction ->
Function[{plot},
Show[plot, AxesOrigin -> First /@ completePlotRange[plot],
DisplayFunction -> Identity]]]
``````

It is interesting to note that this code gives exactly the same rendering as simply specifying `Frame -> {{Automatic, None}, {Automatic, None}}, Axes -> False`:

``````pl1 = Plot[Evaluate[Table[BesselJ[n, x], {n, 4}]], {x, 0, 10},
Filling -> Axis,
DisplayFunction ->
Function[{plot},
Show[plot, AxesOrigin -> First /@ completePlotRange[plot],
DisplayFunction -> Identity]]];
pl2 = Plot[Evaluate[Table[BesselJ[n, x], {n, 4}]], {x, 0, 10},
Filling -> Axis, Frame -> {{Automatic, None}, {Automatic, None}},
Axes -> False];
Rasterize[pl1] == Rasterize[pl1]

=> True
``````
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I knew about the PlotRange anomaly, but I thought it was related to some Plot[] cousins, but not to Plot[] itself. –  belisarius is forth Oct 1 '11 at 19:56