I am trying to fix the Phase plot part of BodePlot, as it does not wrap correctly. And there is no option that I can use to tell it to wrap.

So, instead of doing the full plot myself, (I can do that if I have to) I am thinking of first making the BodePlot, grab the data points, do the wrapping on the data (once I get the x,y data, the rest is easy), then I need to put the new list of points back into the plot, and then use Show to display it.

The part I am stuck at, is extracting the points from FullForm. I can't get the correct Pattern to do that.

This is what I go to so far:

```
hz=z/(z^2-z+0.3);
tf=TransferFunctionModel[hz,z,SamplingPeriod->2];
phasePlot=BodePlot[tf,{0.001,2 Pi},
ScalingFunctions->{Automatic,{"Linear","Degree"}},PlotLayout->"List"][[2]]
```

You see how it does not wrap at 180 degrees. It is more common in dsp that Bode phase plot wraps. Here is what it 'should' look like:

So, this is what I did:

```
FullForm[phasePlot]
Graphics[List[
List[List[], List[],
List[Hue[0.67, 0.6, 0.6],
Line[List[List[0.0010000243495554542, -0.2673870119911639],
List[0.0013659538057574799, -0.36521403872250247],
List[0.0017318832619595053, -0.46304207336414027],
....
```

I see the data there (the x,y) But how to pull them out? I tried this:

```
Cases[FullForm[phasePlot], List[x_, y_] -> {x, y}, Infinity];
```

But the above matches in addition to the list of point, other stuff that I do not need. I tried many other things, but can't get only the list of points out.

I was wondering if someone knows how to pull only the (x,y) points from the above plot. Is there a better way to do this other than using FullForm?

Thanks

**Update:**

I just find a post here which shows how to extract data from plot. So I used it:

```
points = Cases[Normal@phasePlot, Line[pts_] -> pts, Infinity]
```

`FullForm`

. See my comments on David's answer. (I just noticed that you also used`FullForm`

in the question.) – Szabolcs Jul 27 '11 at 12:00`EvaluationMonitor`

, together with Sow/Reap, may be used to 'cleanly' extract data points from`Plot`

. This can be useful. For example, the following evaluates to True.`Sort /@ Last@ Reap[Plot[Sin[x], {x, 0, 4 Pi}, EvaluationMonitor :> Sow[{x, Sin[x]}]]] == Cases[Plot[Sin[x], {x, 0, 4 Pi}], x_Line :> First@x, Infinity]`

– TomD Jul 27 '11 at 12:50