Difference between revisions of "MATLAB:Plotting Surfaces"

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Line 51: Line 51:
 
[x, y] = meshgrid(-2:1:2, -1:.25:1);
 
[x, y] = meshgrid(-2:1:2, -1:.25:1);
 
z = x + y;
 
z = x + y;
mesh(x, y, z);
+
meshc(x, y, z);
 
xlabel('x');
 
xlabel('x');
 
ylabel('y');
 
ylabel('y');
Line 71: Line 71:
 
[x, y] = meshgrid(-2:1:2, -1:.25:1);
 
[x, y] = meshgrid(-2:1:2, -1:.25:1);
 
r = sqrt( (x-(-1)).^2 + (y-(-0.5)).^2 );
 
r = sqrt( (x-(-1)).^2 + (y-(-0.5)).^2 );
mesh(x, y, r);
+
meshc(x, y, r);
 
xlabel('x');
 
xlabel('x');
 
ylabel('y');
 
ylabel('y');
Line 87: Line 87:
 
[x, y] = meshgrid(linspace(-1.2, 1.2, 20));
 
[x, y] = meshgrid(linspace(-1.2, 1.2, 20));
 
r = sqrt( (x-(-1)).^2 + (y-(-0.5)).^2 );
 
r = sqrt( (x-(-1)).^2 + (y-(-0.5)).^2 );
mesh(x, y, r);
+
meshc(x, y, r);
 
xlabel('x');
 
xlabel('x');
 
ylabel('y');
 
ylabel('y');
Line 134: Line 134:
 
     [x, y] = meshgrid(linspace(-1, 1, 31));
 
     [x, y] = meshgrid(linspace(-1, 1, 31));
 
z2 = exp(-sqrt(x.^2+y.^2)).*cos(4*x).*cos(4*y);
 
z2 = exp(-sqrt(x.^2+y.^2)).*cos(4*x).*cos(4*y);
mesh(x, y, z2);
+
meshc(x, y, z2);
 
xlabel('x');
 
xlabel('x');
 
ylabel('y');
 
ylabel('y');
Line 225: Line 225:
  
 
== Using Other Coordinate Systems ==
 
== Using Other Coordinate Systems ==
The plotting commands such as <code>mesh</code> and <code>surf</code> generate surfaces based on matrices of x, y, and z coordinates, respectively, but you can also use other coordinate systems to calculate where the points go.  As an example, the surface above could be plotted on a circular domain using polar coordinates.  To do that, ''r'' and <math>\theta</math> coordinates could be generated using meshgrid and the appropriate x, y, and z values could be obtained by noting that <math>x=r\cos(\theta)</math> and <math>y=r\sin(\theta)</math>.  z can then be calculated from any combination of x, y, r, and <math>\theta</math>:
+
The plotting commands such as <code>meshc</code> and <code>surfc</code> generate surfaces based on matrices of x, y, and z coordinates, respectively, but you can also use other coordinate systems to calculate where the points go.  As an example, the surface above could be plotted on a circular domain using polar coordinates.  To do that, ''r'' and <math>\theta</math> coordinates could be generated using meshgrid and the appropriate x, y, and z values could be obtained by noting that <math>x=r\cos(\theta)</math> and <math>y=r\sin(\theta)</math>.  z can then be calculated from any combination of x, y, r, and <math>\theta</math>:
 
<source lang="matlab">
 
<source lang="matlab">
 
  [r, theta] = meshgrid(...
 
  [r, theta] = meshgrid(...
Line 233: Line 233:
 
     y = r.*sin(theta);
 
     y = r.*sin(theta);
 
     z = exp(-r).*cos(4*x).*cos(4*y);
 
     z = exp(-r).*cos(4*x).*cos(4*y);
     mesh(x, y, z);
+
     meshc(x, y, z);
 
     xlabel('x');
 
     xlabel('x');
 
     ylabel('y');
 
     ylabel('y');
Line 244: Line 244:
 
though in this case, an interpolated surface plot might look better:
 
though in this case, an interpolated surface plot might look better:
 
<source lang="matlab">
 
<source lang="matlab">
surf(x, y, z);
+
surfc(x, y, z);
 
shading interp
 
shading interp
 
xlabel('x');
 
xlabel('x');

Revision as of 16:43, 22 September 2009

There are many problems in engineering that require examining a 2-D domain. For example, if you want to determine the distance from a specific point on a flat surface to any other flat surface, you need to think about both the x and y coordinate. There are various other functions that need x and y coordinates.

The meshgrid Command

The meshgrid command is specifically used to create matrices that will represent x and y coordinates. For example, note the output to the following MATLAB command:

[x, y] = meshgrid(-2:1:2, -1:.25:1)
x =

    -2    -1     0     1     2
    -2    -1     0     1     2
    -2    -1     0     1     2
    -2    -1     0     1     2
    -2    -1     0     1     2
    -2    -1     0     1     2
    -2    -1     0     1     2
    -2    -1     0     1     2
    -2    -1     0     1     2

y =

   -1.0000   -1.0000   -1.0000   -1.0000   -1.0000
   -0.7500   -0.7500   -0.7500   -0.7500   -0.7500
   -0.5000   -0.5000   -0.5000   -0.5000   -0.5000
   -0.2500   -0.2500   -0.2500   -0.2500   -0.2500
         0         0         0         0         0
    0.2500    0.2500    0.2500    0.2500    0.2500
    0.5000    0.5000    0.5000    0.5000    0.5000
    0.7500    0.7500    0.7500    0.7500    0.7500
    1.0000    1.0000    1.0000    1.0000    1.0000

The first argument gives the range that the first output variable should include, and the second argument gives the range that the second output variable should include. Note that the first output variable x basically gives an x coordinate and the second output variable y gives a y coordinate. This is useful if you want to plot a function in 2-D.

Examples Using 2 Independent Variables

For example, to plot z=x+y over the ranges of x and y specified above - the code would be:

[x, y] = meshgrid(-2:1:2, -1:.25:1);
z = x + y;
meshc(x, y, z);
xlabel('x');
ylabel('y');
zlabel('z');
title('z = x + y');

and the graph is:

SurfExp01.png

To find the distance r from a particular point, say (-1,-0.5), you just need to change the function. Since the distance between two points \((x, y)\) and \((x_0, y_0)\) is given by \( r=\sqrt{(x-x_0)^2+(y-y_0)^2} \) the code could be:

[x, y] = meshgrid(-2:1:2, -1:.25:1);
r = sqrt( (x-(-1)).^2 + (y-(-0.5)).^2 );
meshc(x, y, r);
xlabel('x');
ylabel('y');
zlabel('r');
title('r = Distance from (-1,-0.5)');

and the plot is

SurfExp02.png

Examples Using Refined Grids

You can also use a finer grid to make a better-looking plot:

[x, y] = meshgrid(linspace(-1.2, 1.2, 20));
r = sqrt( (x-(-1)).^2 + (y-(-0.5)).^2 );
meshc(x, y, r);
xlabel('x');
ylabel('y');
zlabel('r');
title('r = Distance from (-1,-0.5)');

and the plot is:

SurfExp03.png

Note that the meshgrid command was given only one argument - in that case, the range of x and y will be the same.

Finding Minima and Maxima in 2-D

You can also use these 2-D structures to find minima and maxima. For example, given the grid in the code directly above, you can find the minimum and maximum distances and where they occur:

MinDistance = min(r(:)) 
MaxDistance = max(r(:))
XatMin = x(find(r == MinDistance))
YatMin = y(find(r == MinDistance))
XatMax = x(find(r == MaxDistance))
YatMax = y(find(r == MaxDistance))
MinDistance =
    0.0782
MaxDistance =
    2.7803
XatMin =
   -0.9474
YatMin =
   -0.4421
XatMax =
    1.2000
YatMax =
    1.2000

If there are multiple maxima or minima, the find command will report them all. For example, with the following code,

    [x, y] = meshgrid(linspace(-1, 1, 31));
z2 = exp(-sqrt(x.^2+y.^2)).*cos(4*x).*cos(4*y);
meshc(x, y, z2);
xlabel('x');
ylabel('y');
zlabel('z');
title('z = e^{-(x^2+y^2)^{0.5}} cos(4x) cos(4y)');
MinVal = min(min(z2))
MaxVal = max(max(z2))
XatMin = x(find(z2 == MinVal))
YatMin = y(find(z2 == MinVal))
XatMax = x(find(z2 == MaxVal))
YatMax = y(find(z2 == MaxVal))

which gives a graph of:

SurfExp04.png

the matrix z2 has four entries with the same minimum value and one with the maximum value:

MinVal =
   -0.4699

MaxVal =
     1

XatMin =
   -0.7333
         0
         0
    0.7333

YatMin =
         0
   -0.7333
    0.7333
         0

XatMax =
     0

YatMax =
     0

Higher Refinement

As seen in creating line plots using different scales, you may want to use a more highly-refined grid to locate maxima and minima with greater precision. This may include reducing the overall domain of the function as well as including more points. For example, the changing the grid to have 1001 points in either direction makes for a more refined grid. The code below demonstrates how to increase the refinement:

[xp, yp] = meshgrid(linspace(-1.2, 1.2, 1001));
z2p = exp(-sqrt(xp.^2+yp.^2)).*cos(4*xp).*cos(4*yp);
MinValp = min(min(z2p))
MaxValp = max(max(z2p))
XatMinp = xp(find(z2p == MinValp))
YatMinp = yp(find(z2p == MinValp))
XatMaxp = xp(find(z2p == MaxValp))
YatMaxp = yp(find(z2p == MaxValp))

The results obtained are:

MinValp =
   -0.4703

MaxValp =
     1

XatMinp =
   -0.7248
         0
         0
    0.7248

YatMinp =
         0
   -0.7248
    0.7248
         0

XatMaxp =
     0

YatMaxp =
     0

Note that graphing the more refined points would be a bad idea - there are now over one million nodes and MATLAB will have a hard time rendering such a surface.

Using Other Coordinate Systems

The plotting commands such as meshc and surfc generate surfaces based on matrices of x, y, and z coordinates, respectively, but you can also use other coordinate systems to calculate where the points go. As an example, the surface above could be plotted on a circular domain using polar coordinates. To do that, r and \(\theta\) coordinates could be generated using meshgrid and the appropriate x, y, and z values could be obtained by noting that \(x=r\cos(\theta)\) and \(y=r\sin(\theta)\). z can then be calculated from any combination of x, y, r, and \(\theta\):

 [r, theta] = meshgrid(...
        linspace(0, 1.7, 60), ...
        linspace(0, 2*pi, 73));
    x = r.*cos(theta);
    y = r.*sin(theta);
    z = exp(-r).*cos(4*x).*cos(4*y);
    meshc(x, y, z);
    xlabel('x');
    ylabel('y');
    zlabel('z');

produces:

SurfExp06a.png

though in this case, an interpolated surface plot might look better:

surfc(x, y, z);
shading interp
xlabel('x');
ylabel('y');
zlabel('z');

SurfExp06b.png


Questions

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External Links

References