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`

).