Plot 3D Contour plot on Surface Plot

7 visualizaciones (últimos 30 días)
N/A
N/A el 18 de Oct. de 2023
Comentada: Voss el 18 de Oct. de 2023
I am trying to plot a contour 3D ontop of a surface plot. But, I do not understand why no contours are being plotted. Code being...mains cript first followed by an associated function.
%% Main Script.
%% Clear the MATLAB Workspace.
clear
clc
close all
format compact
format long
% Constants.
mu = 0.0121505856; % Mass parameter.
% Setup the mesh for computing the effective potential some range and
% in steps of n.
X = -2:0.01:2;
Y = X;
[ x, y ] = meshgrid(X, Y);
% Compute the effective potential.
U_bar = Effective_Potential(x, y, mu);
% Plot the contours of the effective potential.
figure(1),
surf(x, y, U_bar, 'EdgeColor', 'none'), ax = gca;
ax.CLim = [1.5 5.0]; grid on, hold on,
contour3(U_bar, 10, '-k', 'Linewidth', 1.5), hold off,
title('Earth-Moon Pseudo Potential', 'Fontsize', 15),
xlabel('x'), ylabel('y'), zlabel('z'),
axis([-1.5 1.5 -1.5 1.5 1.49 5.0]), view([26, 40]),
colorbar, colormap('turbo'), shading('interp')
%% Asscoiated functions.
function [ U ] = Effective_Potential(x, y, mu)
% Inputs:
% x: A 2D mesh grid of N by N size for the x-coordinate.
% y: A 2D mesh grid of N by N size for the y-coordinate.
% mu: The mass parameter for a CR3BP system.
% Outputs:
% U_bar: 2D mesh grid of N by N size containing the effective
% potential values for the given x and y coordinates.
% Compute the distance of the s/c from the smaller primary.
r_1 = sqrt((x + mu - 1).^2 + y.^2);
% Compute the distance of the s/c from the bigger primary.
r_2 = sqrt((x + mu).^2 + y.^2);
% Compute the effective potential.
U = -(-(1 - mu)./r_2 - mu./r_1 -(1/2)*(x.^2 + y.^2));
end

Respuesta aceptada

Voss
Voss el 18 de Oct. de 2023
Here I specify x and y as well as the contour levels in the contour3 call. Adjust as desired.
%% Main Script.
%% Clear the MATLAB Workspace.
clear
clc
close all
format compact
format long
% Constants.
mu = 0.0121505856; % Mass parameter.
% Setup the mesh for computing the effective potential some range and
% in steps of n.
X = -2:0.01:2;
Y = X;
[ x, y ] = meshgrid(X, Y);
% Compute the effective potential.
U_bar = Effective_Potential(x, y, mu);
% Plot the contours of the effective potential.
figure(1),
surf(x, y, U_bar, 'EdgeColor', 'none'), ax = gca;
ax.CLim = [1.5 5.0]; grid on, hold on,
contour3(x, y, U_bar, 1.5:0.1:5.0, '-k', 'Linewidth', 1.5), hold off,
title('Earth-Moon Pseudo Potential', 'Fontsize', 15),
xlabel('x'), ylabel('y'), zlabel('z'),
axis([-1.5 1.5 -1.5 1.5 1.49 5.0]), view([26, 40]),
colorbar, colormap('turbo'), shading('interp')
%% Asscoiated functions.
function [ U ] = Effective_Potential(x, y, mu)
% Inputs:
% x: A 2D mesh grid of N by N size for the x-coordinate.
% y: A 2D mesh grid of N by N size for the y-coordinate.
% mu: The mass parameter for a CR3BP system.
% Outputs:
% U_bar: 2D mesh grid of N by N size containing the effective
% potential values for the given x and y coordinates.
% Compute the distance of the s/c from the smaller primary.
r_1 = sqrt((x + mu - 1).^2 + y.^2);
% Compute the distance of the s/c from the bigger primary.
r_2 = sqrt((x + mu).^2 + y.^2);
% Compute the effective potential.
U = -(-(1 - mu)./r_2 - mu./r_1 -(1/2)*(x.^2 + y.^2));
end
  3 comentarios
N/A
N/A el 18 de Oct. de 2023
Gotcha! Thanks so much. It works.
Voss
Voss el 18 de Oct. de 2023
You're welcome!

Iniciar sesión para comentar.

Más respuestas (0)

Categorías

Más información sobre Surface and Mesh Plots en Help Center y File Exchange.

Productos


Versión

R2022b

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by