how to draw a hyperboloid?
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bsd
el 25 de Sept. de 2011
Comentada: Benjamin Backus
el 22 de Jul. de 2020
Hai,
I need to draw a hyperboloid in matlab. How is it I could do it?
BSD
6 comentarios
Fangjun Jiang
el 25 de Sept. de 2011
Then you need to explain what is hyperboloid and what you want to do. I can search for hyperboloid and it gives me lots of hits. For your benefit, barely mention hyperboloid in your question is not sufficient, right?
Respuesta aceptada
UJJWAL
el 26 de Sept. de 2011
Hi BSD,
I hope the following code will help. Reply back :-
clc;
clear all;
[X,Y,Z] = meshgrid(-10:0.5:10,-10:0.5:10,-10:0.5:10);
a=1;
b=1;
c=1;
V = X.^2/a^2 + Y.^2/b^2 - Z.^2/c^2;
p=patch(isosurface(X,Y,Z,V,1)); % This is the key step. It involves getting the part of the volume corresponding to the surface defined by the equation
set(p,'FaceColor','red','EdgeColor','none');
daspect([1 1 1])
view(3);
camlight
Hope This helps..
Happy To Help
UJJWAL
2 comentarios
UJJWAL
el 28 de Sept. de 2011
Hi BSD,
That is very easy as you just have to change the range of the x,y and z points you use in meshgrid
For getting the upper portion you just need to set z from 0:0.5:10
so in the above code just replace the meshgrid line with the following :-
[X,Y,Z] = meshgrid(-10:0.5:10,-10:0.5:10,0:0.5:10);
Hope This Helps
HAPPY TO HELP
UJJWAL
Más respuestas (3)
Fangjun Jiang
el 25 de Sept. de 2011
As long as you have the mathematical equation describing that hyperboloid, you should be able to generate some data and then draw it.
Take a unit sphere for example, the equation is x^2+y^2+z^2=1; If you carefully set the mesh grid for x and y, then you can calculate the corresponding value for z. Then you can use surf() to plot it.
MATLAB has the sphere() function. Here I am using it to generate the data first and then plot it. Running sphere alone can plot it too.
[x,y,z]=sphere;
surf(x,y,z)
0 comentarios
Chaowei Chen
el 25 de Sept. de 2011
[x,y]=meshgrid(-10:10);
r_sq=x.^2+y.^2;
z=sqrt(r_sq+1);
surf(x,y,z)
2 comentarios
Bud Kelly
el 30 de Mzo. de 2018
This is very clever. Thank you, I will keep it for reference. I had thought that you needed to purchase Symbolic Math Toolbox to plot 3D explicit functions, but now I am encouraged. Thanks.
Benjamin Backus
el 22 de Jul. de 2020
That doesn't look like an ellipsoid to me. The 3rd line should rather be:
z=sqrt(200 - r_sq);
in order to have an ellipsoid of equation x^2 + y^2 + z^2 = 200 (200 because x and y have magnitude 10)
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