```
f = Sin[t];
plot = Plot[f, {t, 0, 10}]
```

One way to extract points is as follows:

```
points = Cases[
Cases[InputForm[plot], Line[___],
Infinity], {_?NumericQ, _?NumericQ}, Infinity];
```

ListPlot to 'take a look'

```
ListPlot[points]
```

giving the following:

**EDIT**
Brett Champion has pointed out that `InputForm`

is superfluous.

```
ListPlot@Cases[
Cases[plot, Line[___], Infinity], {_?NumericQ, _?NumericQ},
Infinity]
```

will work.

It is also possible to paste in the plot graphic, and this is sometimes useful. If,say, I create a ListPlot of external data and then mislay the data file (so that I only have access to the generated graphic), I may regenerate the data by selecting the graphic cell bracket,copy and paste:

```
ListPlot@Transpose[{Range[10], 4 Range[10]}]
points = Cases[
Cases[** Paste_Grphic _Here **, Point[___],
Infinity], {_?NumericQ, _?NumericQ}, Infinity]
```

**Edit 2**.

I should also have cross-referenced and acknowledged this very nice answer by Yaroslav Bulatov.

**Edit 3**

Brett Champion has not only pointed out that `FullForm`

is superfluous, but that in cases where a `GraphicsComplex`

is generated, applying `Normal`

will convert the complex into primitives. This can be very useful.

For example:

```
lp = ListPlot[Transpose[{Range[10], Range[10]}],
Filling -> Bottom]; Cases[
Cases[Normal@lp, Point[___],
Infinity], {_?NumericQ, _?NumericQ}, Infinity]
```

gives (correctly)

{{1., 1.}, {2., 2.}, {3., 3.}, {4., 4.}, {5., 5.}, {6., 6.}, {7.,
7.}, {8., 8.}, {9., 9.}, {10., 10.}}

Thanks to Brett Champion.

Finally, a neater way of using the general approach given in this answer, which I found here

The OP problem, in terms of a ListPlot, may be obtained as follows:

```
ListPlot@Cases[g, x_Line :> First@x, Infinity]
```

**Edit 4**

Even simpler

```
ListPlot@Cases[plot, Line[{x__}] -> x, Infinity]
```

or

```
ListPlot@Cases[** Paste_Grphic _Here **, Line[{x__}] -> x, Infinity]
```

or

```
ListPlot@plot[[1, 1, 3, 2, 1]]
```

This evaluates to `True`

```
plot[[1, 1, 3, 2, 1]] == Cases[plot, Line[{x__}] -> x, Infinity]
```

`AppendTo`

as a third argument of`Plot`

is not a supported syntax. I just examined the 19 year old paper (time flies if you're having fun) you were referring to and it uses the compound syntax similar to the one I used below. – Sjoerd C. de Vries Mar 19 '11 at 23:18