# Filling Styles using a single Plot in Mathematica

Could I specify different filling colors for within a single plot like the bellow or would I need to "Show" several Plots ? Let`s say I would like the filling style to be the same as the PlotStyle.

``````priorMean = 50;
priorVar = 100;

llhMean = 30;
llhVar = 40;

postMean=35.71;
postVar=28.57;

Plot[
Function[{\[Mu], \[Sigma]},
PDF[NormalDistribution[\[Mu], Sqrt[\[Sigma]]], x]],
{{priorMean, llhMean, postMean}, {priorVar, llhVar, postVar}}],
{x, 0, 100}, Filling -> Axis, PlotStyle -> {Red, Green, Blue}]
``````

• Doesn't `FillingStyle` do what you want? – Verbeia Dec 19 '11 at 20:08
• 500 I am curious: I thought you would like my answer, but no comment. Does it not work for your application? – Mr.Wizard Dec 21 '11 at 2:50
• @Mr. It is ! I have had that deadline that disabled me to dig into it yet. But i was actually thinking that this along with 2 others of your solution regarding Graphics represent a nice philosophy of setting things "in the rock" I just need to ask you questions about it ! But I do like it ! – 500 Dec 21 '11 at 3:00
• Okay. I have gotten used to your friendly "Thank you" notes on good answers, but I see now that you didn't give that to anyone on this question. Good luck with the deadline! – Mr.Wizard Dec 21 '11 at 3:02

You'll need to use `FillingStyle` to fill in. I think you got stuck in the syntax for `FillingStyle`, which is not the same as that for `PlotStyle`, although you'd expect it to be. You'll have to assign a color for each curve as `FillingStyle -> {1 -> color1, 2 -> color2}`, etc. Here's an example:

``````colors = {Red, Green, Blue};
Plot[Evaluate@
Function[{\[Mu], \[Sigma]},
PDF[NormalDistribution[\[Mu], Sqrt[\[Sigma]]], x]], {{priorMean,
llhMean, postMean}, {priorVar, llhVar, postVar}}], {x, 0, 100},
Filling -> Axis, PlotStyle -> colors,
FillingStyle ->
MapIndexed[#2 -> Directive[Opacity[0.3], #] &, colors]]
``````

I propose making an extension to the definition of `Plot`. I have done this before.

``````toDirective[{ps__} | ps__] := Flatten[Directive @@ Flatten[{#}]] & /@ {ps}

makefills = MapIndexed[#2 -> Join @@ toDirective@{Opacity[0.3], #} &, #] &;

Unprotect[Plot];
Plot[a__, b : OptionsPattern[]] :=
Block[{\$FSmatch = True},
With[{fills = makefills@OptionValue[PlotStyle]},
Plot[a, FillingStyle -> fills, b]
]] /; ! TrueQ[\$FSmatch] /; OptionValue[FillingStyle] === "Match"
``````

With this in place, you can use `FillingStyle -> "Match"` to auto-style the fills to match the main styles.

``````Plot[{Sin[x], Cos[x], Log[x]}, {x, 0, 2 Pi},
PlotRange -> {-2, 2},
PlotStyle -> {{Blue, Dashing[{0.04, 0.01}]},
{Thick, Dashed, Orange},
{Darker@Green, Thick}},
Filling -> Axis,
FillingStyle -> "Match"
]
``````

• I like this approach. – abcd Dec 20 '11 at 0:22
• @yoda, thank you – Mr.Wizard Dec 20 '11 at 0:22

You could do something like

``````With[{colours = {Red, Green, Blue}},
Plot[Evaluate@
Function[{\[Mu], \[Sigma]},
PDF[NormalDistribution[\[Mu], Sqrt[\[Sigma]]], x]],
{{priorMean, llhMean, postMean}, {priorVar, llhVar, postVar}}],
{x, 0, 100},
Filling ->
MapIndexed[#2[[1]] -> {Axis, Directive[Opacity[.3, #1]]} &, colours],
PlotStyle -> colours]]
``````

This gets a result:

``````Plot[Evaluate@
Function[{\[Mu], \[Sigma]},
PDF[NormalDistribution[\[Mu], Sqrt[\[Sigma]]], x]], {{priorMean,
llhMean, postMean}, {priorVar, llhVar, postVar}}], {x, 0, 100},
Filling -> {1 -> {Axis, Red}, 2 -> {Axis, Green}, 3 -> {Axis, Blue}},
PlotStyle -> {Red, Green, Blue}]
``````

Found in the help under FillingStyle, Scope, Filling Style.

And alternatively:

``````f = MapThread[
Function[{\[Mu], \[Sigma]},
PDF[NormalDistribution[\[Mu], Sqrt[\[Sigma]]], x]],
{{priorMean, llhMean, postMean}, {priorVar, llhVar, postVar}}];
c = {Red, Green, Blue};
Show[Array[
Plot[f[[#]], {x, 0, 100}, Filling -> {1 -> {Axis, c[[#]]}},
PlotRange -> {Automatic, 0.08}, PlotStyle -> c[[#]]] &, 3]]
``````