Creating a 3D Plot In Matlab With 2 Changing Variables

I am trying to create a 3D plot in Matlab.

I have a very long problem starting with the data set of Y and Z. With much manipulation it boils down to a simple y/z problem

``````y=[1, 2, 3, 4, 5, 6, 7, 8, 9, 10];
z=[5, 10, 15, 20, 25, 30, 35, 40, 45, 50];

x=(y_new)/(z_new)
``````

There is about 100 lines of equations manipulating y and z, to become two new variables y_new and z_new. I would like to create a 3d plot of x,y,z. I would want an x value for (1,5) and (1,10), (2,5), (2,10) etc.

The way I have the problem setup is only using y=1 and z=5. I have been trying to use for-loops or while-loops for the past few hours but I am getting stuck.

If someone can help me I would appreciate the time and effort!

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I don't understand where you're stuck. Is all you need an element-wise operation, i.e. `x=y_new./z_new`? Or are `y-new` and `z_new` scalars, so that you'd want `x(i)=y_new/z_new`? –  Jonas Mar 14 '12 at 3:20
Well the whole problem is done with y=1 and z=5, for example. I get an x value. I just am looking for a way to change y ten different times, change z different times, and get 100 values of x. –  michael Mar 14 '12 at 3:28

You don't need to use a `for` loop. Instead, use the builtin function `meshgrid()` which is designed to solve exactly this problem.

Here's a tutorial from 'abbe' at MIT which details how to create a 3D plot of a function `f(x,y)` using `meshgrid()`.

To quote the blurb:

3D plotting

When you make a 3-dimensional plot, you usually have a z variable that is a function of both x and y. When you want x and y to vary over some range, you need a matrix (rather than a vector) for x and y to get a complete domain that covers all the different combinations of those x and y values over some range. A function called meshgrid will set up x and y matrixes like this for you. The x matrix varies the x down rows and keeps it constant in columns, and the y matrix varies the y in columns and keeps it constant across rows, so you get all combinations of x and y if you use the two matrices.

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Thank you so much, this was exactly what I was looking for! I saw this a few hours about but the article was very confusing. The piece you posted was very clear and concise. Thank you again! –  michael Mar 14 '12 at 5:08
No worries, mate. Glad to help. :) –  Li-aung Yip Mar 14 '12 at 5:13