How i can run this code with simple boundary conditions given in code
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fun_u
J1=0.1;J2=0.1;J3=0.1;J4=0.1;J5=0.1;J6=0.1;
S = 0.0001;
GC = 0.1;
Gr = 0.1;
Ha2 = 0.1;
a=1;
m = 2;
G = 1;
t = 0.1;
phi=0.1;
u1 = exp(-t) - 1;
term1 = (-33 / J1) * (1 - exp_t - 2 / 3 * S);
term2 = 2 * GC * J3 + 2 * Gr * J2;
term3 = (2 * J4 * Ha2) / (1 + m^2);
term4 = 3 * GC * exp_t + 6 * exp_t / ((1 - phi)^2.5);
term5 = 2 * GC * J3 * exp_t + 2 * Gr * J2 * exp_t;
u2 = exp(-t)*(term1 + term2 - term3 - term4 - term5 + term3 * (exp_t - m + m * exp_t)) / (6 * a);
u = u1 * y + u2 * y^2;
% b.c
u(0)=0; u(1)=0;
axis([0 1 0 0]);
end
Respuestas (1)
Hi Sharqa,
I see that you are having difficulty in executing the provided code snippet with certain no of constants.
Please note that the code provided has few issues. You can follow the modified workaround to execute the fixed code:
function u = fun_u(y)
% Parameters
J1 = 0.1; J2 = 0.1; J3 = 0.1; J4 = 0.1; J5 = 0.1; J6 = 0.1;
S = 0.0001;
GC = 0.1;
Gr = 0.1;
Ha2 = 0.1;
a = 1;
m = 2;
G = 1;
t = 0.1;
phi = 0.1;
% Calculations
exp_t = exp(-t);
u1 = exp_t - 1;
term1 = (-33 / J1) * (1 - exp_t - 2 / 3 * S);
term2 = 2 * GC * J3 + 2 * Gr * J2;
term3 = (2 * J4 * Ha2) / (1 + m^2);
term4 = 3 * GC * exp_t + 6 * exp_t / ((1 - phi)^2.5);
term5 = 2 * GC * J3 * exp_t + 2 * Gr * J2 * exp_t;
u2 = exp_t * (term1 + term2 - term3 - term4 - term5 + term3 * (exp_t - m + m * exp_t)) / (6 * a);
% Function output
u = u1 * y + u2 * y^2;
end
% Define the range of y
y_values = linspace(0, 1, 100);
% Calculate u for each y
u_values = arrayfun(@fun_u, y_values);
% Plot the results
figure;
plot(y_values, u_values);
xlabel('y');
ylabel('u(y)');
title('Plot of u(y)');
axis([0 2 -6 1]); % Adjusted axis limits for visualization after using 'plot'
I have generated a sample array y_values to demonstrate the execution. Please move ahead with using the correct array.
I hope it answers your query.
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