Greetings dear friends, I am trying to graph this integral so that I can obtain a graph x =f(t), thanks for your help!

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Lewis HC el 25 de Feb. de 2022

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Respondida: Lewis HC el 1 de Mzo. de 2022

Respuesta aceptada: Voss

I need to get this curve in my 3D graph:

My code which I was working is this:

Thank you dear friends!

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Paul el 26 de Feb. de 2022

How does exp(i*p*x) in the equation become just cos(p*x) in the code? Unless of course only the real part of the integral is goal.

Torsten el 26 de Feb. de 2022

The imaginary part of the function is odd in p - so the integral is 0.

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Voss el 25 de Feb. de 2022

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Editada: Voss el 25 de Feb. de 2022

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Note that t > 0 and the grids on the surface in the desired image are more widely spaced than the actual points where the surface has been calculated (i.e., there is curvature in between grid lines).

t = linspace(0.0001,2,50);

x = linspace(-2,2,50);

[T,X] = meshgrid(t,x);

for i = 1:numel(x)

for j = 1:numel(t)

% f = @(p)1/pi*sqrt(2*pi)*sin(p)./p.*exp(-T(i,j).*p.^2).*cos(p.*X(i,j));

f = @(p)1/(pi*sqrt(2*pi))*sin(p)./p.*exp(-T(i,j).*p.^2).*cos(p.*X(i,j));

F(i,j) = integral(f,-Inf,Inf);

end

surf(T,X,F);

colormap(flip(autumn()));

xlabel('t');

ylabel('x');

zlabel('u(x,t)');

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Torsten el 25 de Feb. de 2022

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f = @(p)1/(pi*sqrt(2*pi))*sin(p)./p.*exp(-T(i,j).*p.^2).*cos(p.*X(i,j));

instead of

f = @(p)1/pi*sqrt(2*pi)*sin(p)./p.*exp(-T(i,j).*p.^2).*cos(p.*X(i,j));

Voss el 25 de Feb. de 2022

Oh yeah! Thanks!

I saw your comment before, but then I just typed in the code from the screenshot in the question anyway. D'oh!

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Lewis HC el 1 de Mzo. de 2022

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I really don't know what I would do without your great help, thank you very much dear friends, you are the best!

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