I want to include the some region plots in a `Manipulate`

structure, however the rendering is almost prohibitively slow. The code is

```
ClearAll[regions, rplot]
r:regions[n_Integer, o_Integer] := r = Apply[And,
Subsets[Table[(#1 - Cos[t])^2 + (#2 - Sin[t])^2 <= 1, {t, 2 Pi/n,
2 Pi, 2 Pi/n}], {o}], {1}] &
r:rplot[n_Integer, o_Integer] := r = Show[{RegionPlot[
Evaluate[regions[n, o][x, y]], {x, -2, 2}, {y, -2, 2},
PlotRange -> {{-2, 2}, {-2, 2}}, PlotRangePadding -> .1,
Frame -> False, PlotPoints -> 100],
Graphics[Table[Circle[{Cos[t], Sin[t]}, 1], {t, 2 Pi/n, 2 Pi, 2 Pi/n}]]}]
```

Which produces graphics like

```
GraphicsGrid[{{rplot[3, 2], rplot[5, 3]}, {rplot[7, 2], rplot[4, 1]}}]
```

The above takes about 40 seconds to calculate and render on my computer. Can anyone suggest a way to get similar quality graphics more quickly?

Note 1: I've memoized the graphics object so that doesn't need to recalculate it each time in my demonstration - but it's too slow even the first time.

Note 2: I'm happy with rasterized images, so maybe a flood fill type solution would be an option...

Note 3: I need something like ```
Manipulate[
rplot[n, o], {n, 2, 10, 1, Appearance -> "Labeled"}, {{o, 1},
Range[1, (n + 1)/2], ControlType -> RadioButtonBar}]
```

to be usable.

`rplot`

that, apart from its speed, is indistinguishable from the above. But, if you have a more general solution, that's also welcome! – Simon Dec 7 '11 at 5:55nor more circles overlap, with each discrete region colored differently. Is this correct? – Mr.Wizard Dec 7 '11 at 6:04`n`

circles overlap. If the fill is not completely opaque, then the places with more than`n`

overlaps will be darker. – Simon Dec 7 '11 at 6:16morethan`n`

circles overlap, wouldn't those areas bewhiteinstead of darker? – Mr.Wizard Dec 7 '11 at 6:21