Solving Integral for an Unknown Interval
Mostrar comentarios más antiguos
Is it possible to solve an integral for an interval/ limit of integration without the symbolic toolbox? My problem is of the same form as:(∫f(x)dx)/Z on the interval[-a,a]is equal to (∫g(x)dx)/Y on the interval [-c,c], where Z, a, and Y are known values and c is the unknown variable.
Respuesta aceptada
Friedrich
el 18 de Jul. de 2011
Hi,
so doing something like this:
function out = test_func( c )
out = quad(@lhs,-.25,.25) ./10 - quad(@rhs,-c,c)./6;
function out_lhs = lhs(x)
out_lhs = sqrt(5.^2 - x.^2);
end
function out_rhs = rhs(x)
out_rhs = sqrt(2.5^2 - x.^2);
end
end
And call it through:
fzero(@test_func,1)
Más respuestas (2)
Friedrich
el 18 de Jul. de 2011
0 votos
Hi,
no. You can't get a symbolic solution without the symbolic math toolbox. When you know c you can use the quad function:
4 comentarios
John
el 18 de Jul. de 2011
Friedrich
el 18 de Jul. de 2011
Why not calculate it manually and than hardcode it. Or do your functions change during runtime?
John
el 18 de Jul. de 2011
Friedrich
el 18 de Jul. de 2011
Ah okay. Not sure if this will work fine but you could use the fzero function and search the root of (∫sqrt(5^2-x^2)dx)/10 [-25,.25] - (∫sqrt(2.5^2-x^2)dx)/6 [-c,c] , where you solve the integradl with quad
Bjorn Gustavsson
el 18 de Jul. de 2011
One super-tool you should take a long look at is the Chebfun tools: http://www2.maths.ox.ac.uk/chebfun/
and my Q-D stab would be something like this:
I_of_f = quadgk(f(x)/Z,-a,a);
c = @(a,Z,Y,f,g) fminsearch(@(c) (I_of_f-quadgk(@(x) g(x)/Y,-c,c))^2,1)
I think that should work...
Categorías
Más información sobre Common Operations en Centro de ayuda y File Exchange.
el 18 de Jul. de 2011
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
Translated by 
