# plotting on the y-axis in Mathematica

I have another question about Wolfram Mathematica. Is there someone that knows how I can plot a graphic on the y axis?

I hope that the figure helps. • I have an update of my answer in case you need the `Filling` option. – Sjoerd C. de Vries Jun 2 '11 at 21:23

One possibility is to use a `ParametricPlot` like this:

``````ParametricPlot[
{-y*Exp[-y^2], y}, {y, -0.3, 4},
PlotRange -> {{-2, 2}, All},
AxesLabel -> {"x", "y"},
AspectRatio -> 1/4
]
`````` ``````ParametricPlot[{5 Sin[y], y}, {y, -2 \[Pi], 2 \[Pi]},
Frame -> True,  AxesLabel -> {"x", "y"}]
`````` EDIT

None of the answers given thus far can work with Plot's `Filling` option. Plot's output contains a `GraphicsComplex` in that case (which, incidentally, breaks Mr.Wizard's replacements). To get the filling capability (it doesn't work for a standard plot without filling) you could use the following:

``````Plot[Sin[x], {x, 0, 2 \[Pi]}, Filling -> Axis] /.  List[x_, y_] -> List[y, x]
`````` ``````Plot[{Sin[x], .5 Sin[2 x]}, {x, 0, 2 \[Pi]}, Filling -> {1 -> {2}}]
/. List[x_, y_] -> List[y, x]
`````` • oh, you beat me to it ;) – Thies Heidecke Jun 1 '11 at 17:32
• @Thies It's a jungle out there ;-) – Sjoerd C. de Vries Jun 1 '11 at 17:34
• @Thies and, apparently, it doesn't help to be first (even by 2 min only). Yours got accepted. – Sjoerd C. de Vries Jun 1 '11 at 17:51
• I already voted for this, so I cannot vote again, but good update! – Mr.Wizard Jun 2 '11 at 21:30
• @Sjoerd the carefully avoided regions measure zero in my Lebesgue ruler – Dr. belisarius Jun 3 '11 at 20:56

You can flip the axes after plotting with `Reverse`:

``````g = Plot[Sin[x], {x, 0, 9}];

Show[g /. x_Line :> Reverse[x, 3], PlotRange -> Automatic]
`````` With a minor change this works for plots using `Filling` as well:

``````g1 = Plot[{Sin[x], .5 Sin[2 x]}, {x, 0, 2 \[Pi]}];
g2 = Plot[{Sin[x], .5 Sin[2 x]}, {x, 0, 2 \[Pi]}, Filling -> {1 -> {2}}];

Show[# /. x_Line | x_GraphicsComplex :> x~Reverse~3,
PlotRange -> Automatic] & /@ {g1, g2}
`````` (It may be more robust to replace the RHS of `:>` with `MapAt[#~Reverse~2 &, x, 1]`)

### As a Function

Here is the form I recommend one use. It includes flipping of the original `PlotRange` rather than forcing `PlotRange -> All`:

``````axisFlip = # /. {
x_Line | x_GraphicsComplex :>
MapAt[#~Reverse~2 &, x, 1],
x : (PlotRange -> _) :>
x~Reverse~2 } &;
``````

To be used like: `axisFlip @ g1` or `axisFlip @ {g1, g2}`

A different effect can be had with `Rotate`:

``````Show[g /. x_Line :> Rotate[x, Pi/2, {0,0}], PlotRange -> Automatic]
`````` • @belisarius thanks! I added a couple of variants. – Mr.Wizard Jun 2 '11 at 12:07
• +1 I feel the version that includes filling should be the definitive answer. The Rotate version is wrong in the same way as Alexey's: wrong sign of y. – Sjoerd C. de Vries Jun 3 '11 at 20:50

Just for fun:

ContourPlot is another alternative. Using Thies function:

``````ContourPlot[-y*Exp[-y^2/2] - x == 0,
{x, -2, 2}, {y, 0, 4},
Axes -> True, Frame -> None]
`````` RegionPlot is another

``````RegionPlot[-y*Exp[-y^2/2] > x,
{x, -2.1, 2.1}, {y, -.1, 4.1},
Axes -> True, Frame -> None, PlotStyle -> White,
PlotRange -> {{-2, 2}, {0, 4}}]
`````` And finally, a REALLY convoluted way using `ListCurvePathPlot` and `Solve`:

``````Off[Solve::ifun, FindMaxValue::fmgz];

ListCurvePathPlot[
Join @@
Table[
{x, y} /. Solve[-y*Exp[-y^2/2] == x, y],
{x, FindMaxValue[-y*Exp[-y^2/2], y], 0, .01}],
PlotRange -> {{-2, 2}, {0, 4}}]

On[Solve::ifun, FindMaxValue::fmgz];
`````` Off Topic

Answer to Sjoerd's `None of the answers given thus far can work with Plot's Filling option`.

``````f={.5 Sin[2 y],Sin[y]};
RegionPlot[Min@f<=x<=Max@f,{x,-1,1},{y,-0.1,2.1 Pi},
Axes->True,Frame->None,
PlotRange->{{-2,2},{0,2 Pi}},
PlotPoints->500]
`````` • I thought about `RegionPlot` as well, but the syntax for that is different from `Plot` and more complex. It is more familiar to be able to simply add: `Filling -> True` – Mr.Wizard Jun 3 '11 at 20:14
• @Mr. True! But this is just a little joke we are enjoying with Sjoerd :) – Dr. belisarius Jun 3 '11 at 20:18
• Yes @mr.Wizard, don't spoil our fun. This is our battle of wits. – Sjoerd C. de Vries Jun 3 '11 at 20:44
• Your almost there :-D Perhaps 1000 points will do? – Sjoerd C. de Vries Jun 4 '11 at 15:18
• @Sjoerd You shouldn't laugh at my efforts. I am now exploring `AxesStyle -> Thickness[.1]` with very good results – Dr. belisarius Jun 4 '11 at 15:40

Depending on how you wanted the axis labels to show, you could just wrap the code for the original Plot in the Rotate function.