# Mathematica Manipulate Plot: Scaling Axes

Say I have set up the following function `f[a,b,c]` which I wish to plot while varying `a` and `b`

``````f[a_,b_,c_]:=a b c Exp[a b]

Manipulate[
Plot
[
f[a,b,c],
{c,0,1},
PlotRange->{{0,0.05},Automatic}
],
{a,0,1},
{b,0,1}
]
``````

Is it possible to have the ordinate scaled automatically when I fix the abscissa viewing range? You'll notice with the code above that when varying `a` and `b` the ordinate does scale automatically as if I were viewing the whole range of `{c,0,1}`. I would like it to still handle `c` from 0 to 1, but if I want to view a smaller section of this plot, say `c` from 0 to 0.05, still have the vertical axis scaled correctly. Thank you all for your help.

-
I'd be great if there were a way to add PlotRange to Manipulate, but so far I haven't found anything saying this is possible... –  CaptanFunkyFresh Jan 9 '12 at 22:51

A variant on Artes Docendo's suggestion:

``````Manipulate[
Plot[f[a, b, c], {c, 0, Evaluate@d},
PlotRange -> {{0, Evaluate@d}, Full}], {a, 0., 1.}, {b, 0., 1.}, {d,
0.05, 1.}]
``````

Notice the `Evaluate` to force the machine-precision value to be fed to the `Plot` function before it actually tries to draw something.

I prefer `Full` instead of `Automatic` for the y-axis `PlotRange` in cases like this, because then you know it will never crop the plot in ways that hide parts of the curve.

-

Here is one of many possible solutions :

``````f[a_, b_, c_] := a b c Exp[a b]
Manipulate[ Plot[f[a, b, c], {c, 0, d}, PlotRange -> Automatic],
{a, 0, 1}, {b, 0, 1}, {d, 0.1, 1}, Initialization :> (d := 0.1)]
``````

However your example is not very instructive, to see how it works better try something like this :

``````g[a_, b_, c_] := 3 (a - 0.5) Cos[4 Pi (a - c)] Sin[8 Pi (c - 0.5)] Cos[6 Pi (b - c)]

Manipulate[
Plot[g[a, b, c], {c, 0, d}, PlotRange -> Automatic],
{a, 0, 1}, {b, 0, 1}, {d, 0.1, 1},
Initialization :> (a := 0.4; b := 0.4; d := 0.5)]
``````
-

See if this does what you want. I simply use ListPlot instead of plot.

But I am not sure what you are doing, as you are plotting `f` for c from 0 to 1, but then setting the x-range to only be from 0 to 0.05? Why not then just plot `f` using `{c,0,0.05}`? May be I am missing something.

Anyway, here is what I have

`````` Manipulate[

xmax = 0.05;
y = Table[f[a, b, c], {c, 0, xmax, 0.01}];
max = Max[y];
min = Min[y];

Plot[f[a, b, c], {c, 0, 1},
PlotRange -> {{0, xmax}, {min, max}}, ImagePadding -> 30],

{a, 0, 1},
{b, 0, 1},
Initialization :>
(
f[a_, b_, c_] := a b c Exp[a b]
)

]
``````

edit(1)

it just occurred to me, to make the above more efficient, is to use the first Table command, to generate the data itself as well, and not just find the max/min of the plot range. And then use `ListPlot` instead of `Plot`. This should be faster, so that sampling of the function `f` only happens once instead of 2 times?

So here is second version

``````Manipulate[xmax = 0.05;

data = Table[{c, f[a, b, c]}, {c, 0, xmax, 0.01}];
max = Max[data[[All, 2]]];
min = Min[data[[All, 2]]];

ListPlot[
data,
PlotRange -> {Automatic, {min, max}},
Joined -> True,