BVP PROBLEM how can we take 'c' in x-axis(continuous range.[-1.3:0.02:-1.1]) and to find f"(0)

1 visualización (últimos 30 días)

MINATI el 3 de Mzo. de 2019

0
Enlazar

Enlace directo a esta pregunta

https://es.mathworks.com/matlabcentral/answers/447970-bvp-problem-how-can-we-take-c-in-x-axis-continuous-range-1-3-0-02-1-1-and-to-find-f-0

Comentada: MINATI el 7 de Mzo. de 2019

function main
    S = 1; c  = -1.25; Pr = 0.7; n  = -0.8;
    x  = [3 -1];
    x1 = fsolve(@solver, x);
    function F = solver(x)
        [t, u] = ode45(@equation,[0,5], [S, c, x(1), 1, x(2)]);
             F = [u(end, 2)-1  u(end, 4)];
     figure(1)
    plot(t, u(:,2));
    hold on
    end 
    function dy = equation(t, y)
        dy    = zeros(5,1);
        dy(1) = y(2);
        dy(2) = y(3);
        dy(3) = y(2)^2 - y(1) * y(3) - 1;
        dy(4) = y(5);
        dy(5) = Pr * (n * y(2) * y(4) - y(1) * y(5));
    end
end

2 comentarios
Mostrar NingunoOcultar Ninguno

Torsten el 4 de Mzo. de 2019

Is f = y(1) ?

MINATI el 4 de Mzo. de 2019

Dear Torsten

yes f = y(1)

Sorry for seeing late

Iniciar sesión para comentar.

Iniciar sesión para responder a esta pregunta.

Respuesta aceptada

Torsten el 4 de Mzo. de 2019

0
Enlazar

Enlace directo a esta respuesta

https://es.mathworks.com/matlabcentral/answers/447970-bvp-problem-how-can-we-take-c-in-x-axis-continuous-range-1-3-0-02-1-1-and-to-find-f-0#answer_363729

function main
    S = 1; c  = [-1.3:0.02:-1.1]; Pr = 0.7; n  = -0.8;
    sol = zeros(numel(c),1);
    x  = [3 -1];
    
    for i = 1:numel(c)
      c_actual = c(i);  
      x1 = fsolve(@solver, x);
      sol(i) = x1(1);
      x = x1;
    end
    plot(c,sol)
    function F = solver(x)
        [t, u] = ode45(@equation,[0,5], [S, c_actual, x(1), 1, x(2)]);
        F = [u(end, 2)-1 , u(end, 4)];
    end 
    function dy = equation(t, y)
        dy    = zeros(5,1);
        dy(1) = y(2);
        dy(2) = y(3);
        dy(3) = y(2)^2 - y(1) * y(3) - 1;
        dy(4) = y(5);
        dy(5) = Pr * (n * y(2) * y(4) - y(1) * y(5));
    end
end

15 comentarios
Mostrar 13 comentarios más antiguosOcultar 13 comentarios más antiguos

MINATI el 4 de Mzo. de 2019

Editada: MINATI el 4 de Mzo. de 2019

Actually first code was OK for different values of 'n' but need f ' vs c graph.

Here is the modified (your) code for reference:

function main

S = 1; c = [-1.3:0.02:-1.1]; Pr = 0.7; %n = -0.8;

n=input('n=')

sol = zeros(numel(c),1);

x = [3 -1];

for i = 1:numel(c)

c_actual = c(i);

x1 = fsolve(@solver, x);

sol(i) = x1(1);

x = x1;

end

plot(c,sol)

hold on

function F = solver(x)

[t, u] = ode45(@equation,[0,5], [S, c_actual, x(1), 1, x(2)]);

F = [u(end, 2)-1 , u(end, 4)];

end

function dy = equation(t, y)

dy = zeros(5,1);

dy(1) = y(2);

dy(2) = y(3);

dy(3) = y(2)^2 - y(1) * y(3) - 1;

dy(4) = y(5);

dy(5) = Pr * (n * y(2) * y(4) - y(1) * y(5));

end

And also I didnt get you here:

sol(i) in the code from above contains f''(0) for given c(i) - so plot what you like with the arrays sol and c.

I am not so strong as you in programming, perhaps

So please modify if possible

MINATI el 6 de Mzo. de 2019

Editada: MINATI el 7 de Mzo. de 2019

dualsol.pdf

I am working on this attached paper. For reference you can follow:

http://dx.doi.org/10.1016/j.jppr.2017.07.007

Want to solve Eq.(11)(12) with B.Cs (13)(14)

In Fig. (2-5), in X-axis c/a is taken.

In other figs., dual solution concept is used i.e if we change x = [3 -1]; as anything like x = [5 -2]; or any other, we will get SECOND solution.

MINATI el 7 de Mzo. de 2019

Please have a look

Iniciar sesión para comentar.

Más respuestas (0)

Iniciar sesión para responder a esta pregunta.

Categorías

Signal Processing Signal Processing Toolbox Digital and Analog Filters Digital Filter Analysis

Más información sobre Digital Filter Analysis en Help Center y File Exchange.

Community Treasure Hunt

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

Start Hunting!

Translated by