# Labeling vertices of a polygon in Mathematica

Given a set of points in the plane `T={a1,a2,...,an}` then `Graphics[Polygon[T]]` will plot the polygon generated by the points. How can I add labels to the polygon's vertices? Have merely the index as a label would be better then nothing. Any ideas?

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``````pts = {{1, 0}, {0, Sqrt[3]}, {-1, 0}};
Graphics[
{{LightGray, Polygon[pts]},
{pts /. {x_, y_} :> Text[Style[{x, y}, Red], {x, y}]}}
]
``````

``````pts = {{1, 0}, {0, Sqrt[3]}, {-1, 0}};
Graphics[
{{LightGray, Polygon[pts]},
{pts /. {x_, y_} :> Text[Style[{x, y}, Red], {x, y}, {0, -1}]},
{pts /. {x_, y_} :> {Blue, PointSize[0.02], Point[{x, y}]}}
}
]
``````

update:

Use the index:

``````pts = {{1, 0}, {0, Sqrt[3]}, {-1, 0}};
Graphics[
{{LightGray, Polygon[pts]},
{pts /. {x_, y_} :>
Text[Style[Position[pts, {x, y}], Red], {x, y}, {0, -1}]}
}
]
``````

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This is really nice. Almost what I'm after. How can alter your example, and obtain the index of the vertex as a label rather then the coordinates? Thanks in advance! –  Dror Aug 3 '11 at 7:47
added to update.... –  Nasser Aug 3 '11 at 8:12
WOW! That's really great! Can you add some explanation what's the magic? –  Dror Aug 3 '11 at 8:25

Nasser's version (update) uses pattern matching. This one uses functional programming. `MapIndexed` gives you both the coordinates and their index without the need for `Position` to find it.

``````pts = {{1, 0}, {0, Sqrt[3]}, {-1, 0}};
Graphics[
{
{LightGray, Polygon[pts]},
MapIndexed[Text[Style[#2[[1]], Red], #1, {0, -1}] &, pts]
}
]
``````

or, if you don't like `MapIndexed`, here's a version with `Apply` (at level 1, infix notation `@@@`).

``````pts = {{1, 0}, {0, Sqrt[3]}, {-1, 0}};
idx = Range[Length[pts]];
Graphics[
{
{LightGray, Polygon[pts]},
Text[Style[#2, Red], #1, {0, -1}] & @@@ ({pts, idx}\[Transpose])
}
]
``````

This can be expanded to arbitrary labels as follows:

``````pts = {{1, 0}, {0, Sqrt[3]}, {-1, 0}};
idx = {"One", "Two", "Three"};
Graphics[
{
{LightGray, Polygon[pts]},
Text[Style[#2, Red], #1, {0, -1}] & @@@ ({pts, idx}\[Transpose])
}
]
``````

-

You can leverage the options of `GraphPlot` for this. Example:

``````c = RandomReal[1, {3, 2}]
g = GraphPlot[c, VertexLabeling -> True, VertexCoordinateRules -> c];

Graphics[{Polygon@c, g[[1]]}]
``````

This way you can also make use of `VertexLabeling -> Tooltip`, or `VertexRenderingFunction` if you want to. If you do not want the edges overlaid, you may add `EdgeRenderingFunction -> None` to the `GraphPlot` function. Example:

``````c = RandomReal[1, {3, 2}]
g = GraphPlot[c, VertexLabeling -> All, VertexCoordinateRules -> c,
EdgeRenderingFunction -> None,
VertexRenderingFunction -> ({White, EdgeForm[Black], Disk[#, .02],
Black, Text[#2, #1]} &)];

Graphics[{Brown, Polygon@c, g[[1]]}]
``````

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