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
```