# Make 3d surface [closed]

I have data for `x` and `y` when `z=z1, z=z2 and z=z3`. I'd like to plot the data on a 3d graph and approximate the curves with a 3d surface and to know the equation of the surface. Will this be easier to implement on R or on Mathematica? For instance how can I do it in R? Thanks

Data (example):

``````For z=0
y   0.00    1.50    1.92    2.24
x   0.0000  0.0537  0.0979  0.2492

For z=2
y   0.00    2.21    2.83    3.07
x   0.0000  0.0173  0.0332  0.0655

For z=5
y   0.00    0.29    2.49    3.56
x   0.0000  0.0052  0.0188  0.0380
``````
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## closed as not constructive by Chase, BenBarnes, High Performance Mark, GSee, Andrew BarberSep 5 '12 at 20:53

As it currently stands, this question is not a good fit for our Q&A format. We expect answers to be supported by facts, references, or expertise, but this question will likely solicit debate, arguments, polling, or extended discussion. If you feel that this question can be improved and possibly reopened, visit the help center for guidance. If this question can be reworded to fit the rules in the help center, please edit the question.

SO isn't really set up to answer "which is better/easier/faster/cooler/bigger/stronger" type questions...as they are inherently full of opinions and may change over time. For example, I use R all day every day, so doing this in R will almost certainly be easier for me. Can you rework your question to include some data points and ask for advice on plotting them in 3D? Then you can decide for your purposes if using R or mathematics is easier. –  Chase Sep 5 '12 at 11:46
Edited the question and added data. –  jpcgandre Sep 5 '12 at 12:36
Great, good luck! This question may be a useful starting point for you as it pertains to R. –  Chase Sep 5 '12 at 12:43

In Mathematica:

Suppose you have a set of points qt:

``````ListPointPlot3D[qt]
``````

You could easily build an interpolation function:

``````Plot3D[Interpolation[qt][x, y], {x, -2, 2}, {y, -2, 2}, Ealuated -> True]
``````

If you need an explicit function model, you can propose one and calculate its parameters:

``````model = a x^2 + b y^2;
fit = FindFit[qt, model, {a, b}, {x, y}];
Show[Plot3D[model /. fit, {x, -2, 2}, {y, -2, 2}, PlotRange -> All],
ListPointPlot3D[qt, PlotStyle -> Directive[PointSize[Medium], Red]]]
``````

Edit

And it is fairly easy to plot nice graphs:

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+1 pretty graphs –  Alex Brown Sep 5 '12 at 14:04
@AlexBrown Credit to @Heike –  belisarius Sep 5 '12 at 14:17