solve multiple algebric integral equations
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Hi I have three equations and three unknowns I need to solve these.
Two of the equations are integral equations
Could Matlab do that ?
unknowns are a,b,c. equations:
0 = integral (c^2/(a-(x-1/2)*b-1/2*sin(pi*x))^2) dx , from x=0 to x=1.
0 = integral (x-1/2)*(1-c)^2/(1-a +(x-1/2)*b-1/2*sin(pi*x))^2 dx , from x=0 to x=1.
0 = c^2-2*c^2*a-a^2-a*b+b^2/4-2*a*b*c ..
I need to solve these three equations to find three unknowns a,b,c.
x is double variable from 0 to 1 with the increnment of 0.01. So we have 101 x values.
Could I find the answer numerically?
I have R2014b version.
4 Commenti
John D'Errico
il 31 Gen 2015
Modificato: John D'Errico
il 31 Gen 2015
It COULD. But then again, maybe it could not. You never know. And how can we possibly know if you do not show us what they are?
Are you looking for a symbolic solution, or a numerical one?
What version of MATLAB do you have? The symbolic TB? The optimization TB?
The point is you need to be more forthcoming with details, else we cannot help.
The crystal ball is so cloudy today.
Matt J
il 31 Gen 2015
I wonder if the equations are correct. The first equation only has a solution if c=0, since the integrand is non-negative everywhere. If c=0, then the 3rd equation implies one of 2 possible relationships between a and b
a = b*(sqrt(2)-1)/2
or
a = b*(-sqrt(2)-1)/2
Meva
il 1 Feb 2015
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Matt J
il 31 Gen 2015
I wonder if the equations are correct. The first equation only has a solution if c=0, since the integrand is non-negative everywhere. If c=0, then the 3rd equation implies one of 2 possible relationships between a and b
a = b*(sqrt(2)-1)/2
or
a = b*(-sqrt(2)-1)/2
This reduces the 2nd equation to an equation in 1 variable, and you can solve with fzero.
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