Symbolic variables: Isolate a variable in an equation?

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Artur M. G. Lourenço on 23 Sep 2011

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Commented: Walter Roberson on 8 Jan 2018

Accepted Answer: Walter Roberson

I always have trouble isolating symbolic variables in equations. See this for example:

8*x1 + 2*x2 + 3*x3 - 51 = 0

want to isolate x1, manually know is this:

x1 = (51 - 2*x2 - 3*x3)/8

how can I do this in matlab? Thanks in advance.

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Accepted Answer

Walter Roberson on 23 Sep 2011

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solve(8*x1 + 2*x2 + 3*x3 - 51, x1)

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Artur M. G. Lourenço on 23 Sep 2011

Thanks again. I was trying this, but I do not know because once was not working. Now it worked. It must have been symbiosis through the monitor.

thanks again.

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Arash Moharjeri on 10 Nov 2017

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Edited: Walter Roberson on 10 Nov 2017

Hi all,

I am trying to rearrange the below equation to solve for R0.

This is how I have written the equation in MATLAB.

syms  R0 H hs K_h rw P
EQN= (H - power((power(hs,2))+((P/K_h)*((power(R0,2)*log(R0/rw))-(power(R0,2)-power(rw,2))*0.5)),0.5) == 0);
EQN2=isolate (EQN, R0)

When I run isolate, it doesn't give me an error but it doesn't give me a correct answer either. It gives me the original equation.

Can anyone assist me with this issue? Is it because the equation is too complicated to rearrange ?

Thanks

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andrea giovannini on 8 Jan 2018

Hi, I can't say the ranges for the values, because I'm working to built a completely general Bayesian Network to estimate the scour depth. I'll try with the numerical method and see what happens. Thank a lot for your time and disponibility.

Walter Roberson on 8 Jan 2018

Estimating the scour depth given the depth of the river and the other aspects would be fairly different mathematically than attempting to find the depth of the river with that formula.

Dc = ((3*d*u+8*v)*exp(-RootOf(-2*n*Z*(72*exp(Z)*u*y-3*d*u-8*v)-9*y^(5/3)*sqrt(s)*sqrt(2)*(ln(2)+ln(5))*exp(Z),Z))-36*y*u)/(36*u)

where RootOf(-2*n*Z*(72*exp(Z)*u*y-3*d*u-8*v)-9*y^(5/3)*sqrt(s)*sqrt(2)*(ln(2)+ln(5))*exp(Z),Z) means the set of Z such that -2*n*Z*(72*exp(Z)*u*y-3*d*u-8*v)-9*y^(5/3)*sqrt(s)*sqrt(2)*(ln(2)+ln(5))*exp(Z) is 0 -- the roots of that expression.

That expression does not have a closed form solution, but it would be pretty tractable to solve numerically I think, whereas I think solving for y would be more difficult numerically.

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