# Help with Matlab symbolic toolbox

Trying to design a 3rd order sallen key filter using matlab:

``````[B,A]=cheby1(3,1,10*10^6*2*pi,'s');

%3rd order sallen key
syms R1 R2 R3 R4 R5 C1 C2 C3
M=1+R4/R5;
num=[M/(R1*R2*R3*C1*C2*C3)];
den=[1 (1/(R1*C1)+1/(R2*C1)+1/(R2*C2)+(1-M)/(R3*C3)+1/(R3*C2)) ((C3*R3+R1*C3+R2*C3+C1*R1+(1-M)*(R1+R2)*C2)/(R1*R2*R3*C1*C2*C3)) (1/(R1*R2*R3*C1*C2*C3))];

solve('B=num','A=den','M=5','R1','R2','R3','R4','R5')
``````

It tells me:

``````Warning: 3 equations in 5 variables. New variables might be introduced.
Warning: Explicit solution could not be found.
``````

`cheby1` gives you a transfer function (numerator and denominator) for a chebyshev type 1 filter; I'm then trying to equate it to the form of the transfer function of a 3rd order sallen key filter; and get matlab to solve for the resistor values in terms of the capacitor values.

==> How can I get the solution I want?

To note: this has nothing to do with the actual calculation being performed, and all to do with how to use matlab.

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This is not the right approach to this problem. –  nibot Aug 21 '11 at 23:19
Suggest migrating to dsp.SE or electronics.SE. –  nibot Aug 21 '11 at 23:28
the question is far more about the use of the matlab symbolic toolbox; less about the actual task I'm trying to do. –  daurnimator Aug 23 '11 at 5:22
@nibot, dsp.SE is still a private beta. Can't migrate there. –  Phonon Aug 24 '11 at 21:49

maybe I'm missing something, but B is 1x4 vectors, while num is a scalar, so there is no way you're going to get an answer. Also, (edit) you can't solve indirect equations from the command window (i.e. `solve('M=5','R1','R2')` won't work, but `solve('1 + R1/R2=5','R1','R2')` will)
Well, the MuPAD engine isn't really worth anything at all. It can't even solve the equation `M=1+R4/R5` for `R5`. You're right that the best way in this is using a numerical solution. –  Egon Aug 22 '11 at 10:01
I agree some things aren't soluble symbolically. But if your CAS can't solve such elementary equations as `M=1+R4/R5` (possibly with the constraint that `M=2`, I wouldn't really call that a decent CAS. Even my HP 50g can solve that symbolically. –  Egon Aug 22 '11 at 15:34