How to take input values from users symbolically while running a code?

3 visualizzazioni (ultimi 30 giorni)
o2 = [0, 0, 0]; % Origin for ain
ain = [26, 0, 0]; % Initial vector for ain
input_axis = [0, 1, 0]; % Axis of rotation for ain (y-axis)
theta1 = deg2rad(10); % Angle of rotation for ain in radians
% Rotation matrix function
rot_matrix = @(axis, theta) cos(theta) * eye(3) + ...
sin(theta) * [0, -axis(3), axis(2); axis(3), 0, -axis(1); -axis(2), axis(1), 0] + ...
(1 - cos(theta)) * (axis' * axis);
% Compute the rotated vector for ain
a_rotated = rot_matrix(input_axis, theta1) * (ain' - o2') + o2';
a_final = a_rotated';
disp(norm(a_final));
cin=[122.95, -20, 0];
c_rotated= rot_matrix(input_axis, theta1) * (cin' - o2') + o2';
naxis=[sin(theta1),0,cos(theta1)];
syms phi;
c_final_rotated=rot_matrix(naxis,phi)*(c_rotated-a_rotated)+a_rotated;
bin = [29.5, 30, 0];
o4 = [13.5, 30, 0]; % Origin for bin
output_axis = [0, 1, 0]; % Axis of rotation for bin (y-axis)
theta2 = deg2rad(10); % Angle of rotation for bin in radians
% Compute the rotated vector for bin
b1_rotated = rot_matrix(output_axis, theta2) * (bin' - o4') + o4';
b1_final = b1_rotated';
disp(norm(b1_final-o4));
coupler = c_final_rotated'-b1_final;
coupler = subs(coupler, conj(phi), phi);
%%in this code,i want to take theta1 and theta2 values from the user before from doing parametric substitution(t) given below and want to show eq in terms of theta1 and theta2 and phi
eq=norm(coupler)-106;
disp(eq);
%%after doing this ,put values of theta 1 and theta2 in
coupler = subs(coupler, conj(phi), phi);
%%and continue further as below
syms t;
cos_phi = (1 - t^2) / (1 + t^2);
sin_phi = 2 * t / (1 + t^2);
% Substitute parametric forms into coupler components
coupler_parametric = subs(coupler, [cos(phi), sin(phi)], [cos_phi, sin_phi]);
% Display the parametric coupler
disp('Parametric form of coupler:');
disp(coupler_parametric);
syms targetvalue % it might be 3.5 ...
normsq = expand(sum(coupler_parametric.^2) - targetvalue^2);
normpoly = simplify(normsq*(t^2+1)^2);
vpa(expand(normpoly),4);
tsolve = solve(normpoly,t,'maxdegree',4,'returnconditions',true);
h=vpa(subs(tsolve.t,targetvalue, 106));
%disp(h);
real_solutions = h(imag(h) == 0);
disp('Real roots:');
disp(real_solutions);
angles_rad = 2 * atan(real_solutions);
angles_deg = rad2deg(angles_rad);
% Display angles in degrees
disp('Angles in degrees before adjustment:');
disp(angles_deg);
phi=double(angles_rad(1));
c1_position = double(rot_matrix(naxis,phi) * (c_rotated - a_rotated) + a_rotated);
p=(c1_position'-a_final)';
%q=(c1_position'-b1_final)';
angle=acosd(p(2)/norm(p));
disp(angle);
%%at last i want to display value of angle for both theta1 and theta2 equal to 10 degrees
%%please help someone ,i am getting no real solution if i am taking theta1 and theta2 from user as 10 degrees but no error if i am explicitly defining like in this code

Risposte (1)

Athanasios Paraskevopoulos
Modificato: Athanasios Paraskevopoulos il 13 Giu 2024
I think this is what you asked for
% Function to generate rotation matrix
rot_matrix = @(axis, theta) cos(theta) * eye(3) + ...
sin(theta) * [0, -axis(3), axis(2); axis(3), 0, -axis(1); -axis(2), axis(1), 0] + ...
(1 - cos(theta)) * (axis' * axis);
% Predefined values for theta1 and theta2
theta1_deg = 10; % Replace with desired value
theta2_deg = 10; % Replace with desired value
theta1 = deg2rad(theta1_deg); % Convert to radians
theta2 = deg2rad(theta2_deg); % Convert to radians
% Initial data and vectors
o2 = [0, 0, 0];
ain = [26, 0, 0];
input_axis = [0, 1, 0]; % Axis of rotation for ain (y-axis)
a_rotated = rot_matrix(input_axis, theta1) * (ain' - o2') + o2';
a_final = a_rotated';
cin = [122.95, -20, 0];
c_rotated = rot_matrix(input_axis, theta1) * (cin' - o2') + o2';
naxis = [sin(theta1), 0, cos(theta1)];
syms phi;
c_final_rotated = rot_matrix(naxis, phi) * (c_rotated - a_rotated) + a_rotated;
bin = [29.5, 30, 0];
o4 = [13.5, 30, 0];
output_axis = [0, 1, 0]; % Axis of rotation for bin (y-axis)
b1_rotated = rot_matrix(output_axis, theta2) * (bin' - o4') + o4';
b1_final = b1_rotated';
% Calculate the coupler
coupler = c_final_rotated' - b1_final;
coupler = subs(coupler, conj(phi), phi);
% Show the equation in terms of theta1, theta2, and phi
eq = norm(coupler) - 106;
disp('Equation in terms of theta1, theta2, and phi:');
Equation in terms of theta1, theta2, and phi:
disp(eq);
% Continue further calculations with substituted values of theta1 and theta2
syms t;
cos_phi = (1 - t^2) / (1 + t^2);
sin_phi = 2 * t / (1 + t^2);
% Substitute parametric forms into coupler components
coupler_parametric = subs(coupler, [cos(phi), sin(phi)], [cos_phi, sin_phi]);
disp('Parametric form of coupler:');
Parametric form of coupler:
disp(coupler_parametric);
syms targetvalue; % It might be 3.5 ...
normsq = expand(sum(coupler_parametric.^2) - targetvalue^2);
normpoly = simplify(normsq * (t^2 + 1)^2);
vpa(expand(normpoly), 4);
tsolve = solve(normpoly, t, 'maxdegree', 4, 'returnconditions', true);
h = vpa(subs(tsolve.t, targetvalue, 106));
real_solutions = h(imag(h) == 0);
disp('Real roots:');
Real roots:
disp(real_solutions);
angles_rad = 2 * atan(real_solutions);
angles_deg = rad2deg(angles_rad);
disp('Angles in degrees before adjustment:');
Angles in degrees before adjustment:
disp(angles_deg);
phi = double(angles_rad(1));
c1_position = double(rot_matrix(naxis, phi) * (c_rotated - a_rotated) + a_rotated);
p = (c1_position' - a_final)';
angle = acosd(p(2) / norm(p));
disp('Final angle:');
Final angle:
disp(angle);
88.7282
  5 Commenti
Athanasios Paraskevopoulos
Modificato: Athanasios Paraskevopoulos il 16 Giu 2024
@Amani I just did what you asked for. You wanted disp(eq) in terms of variables theta1 and theta2 and phi and then solve for phi by doing parametric substitution. The first one does not give you that
Aman
Aman il 17 Giu 2024
@Athanasios Paraskevopoulos thank you sir,but why i am not getting real solutions in 2nd code instead i am giving the same input values,if you can help,it will be nice.
Thanks!!

Accedi per commentare.

Community Treasure Hunt

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

Start Hunting!

Translated by