# How do we store the some specific coefficients of a symbolic expression in matlab ver 5.3.1?

Hallo friends, I want to figure out the following problem: Suppose,we have expression like,

``````syms t k A0
r1=(-1+k-3/4*k*A0^2)*sin(t)+1/4*k*A0^2*sin(3*t)+A0*sin(5*t);
``````

we want to remove the coefficients of `sin(t)` and solve it for `A0` & finally put this value to the rest of the expression.How can we do it without cut and paste.

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Will you please, as I and others have asked before, take the trouble to learn how to format code in questions (and answers) for SO. Will you please also read the answers to your other questions and give us the impression that you are learning some of this yourself and not just using SO to do your work. –  High Performance Mark Jul 22 '10 at 9:19

## 1 Answer

I don't know what symbolic capabilities were available for MATLAB version 5.3.1, but you can solve your problem using the functions COEFFS, SUBS, and SOLVE from the current Symbolic Math Toolbox:

``````>> eqCoeffs = coeffs(r1,sin(t));  %# Get coefficients for polynomial in sin(t)
>> b = eqCoeffs(2);               %# Second coefficient is what you want
>> bValue = 1;                    %# The value to set the coefficient equal to
>> newA0 = solve(subs('b = bValue'),A0)  %# Solve for A0

newA0 =

-(2*3^(1/2)*(k - 2)^(1/2))/(3*k^(1/2))  %# Note there are two values since
(2*3^(1/2)*(k - 2)^(1/2))/(3*k^(1/2))  %#   A0 is squared in the equation

>> r2 = subs(r1,A0,newA0)                %# Substitute the new A0 values into r1

r2 =

sin(t) + (sin(3*t)*(k - 2))/3 - (2*3^(1/2)*sin(5*t)*(k - 2)^(1/2))/(3*k^(1/2))
sin(t) + (sin(3*t)*(k - 2))/3 + (2*3^(1/2)*sin(5*t)*(k - 2)^(1/2))/(3*k^(1/2))
``````

Note that the coefficients of `sin(t)` in the two equations of `r2` are equal to 1 (the value I used for `bValue`).

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