Need Help with a Simple Symbolic Equation Solve in Matlab 2015a

S H
24 Jul. 2015
4 Respuestas
Actualizado a las 28 En. 2019
1 Visualización (30 días)

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I am trying the following code in Matlab 2015a. It cannot solve it. Correct solution should be simply k. Could you tell me what is wrong?
syms Z k
assume(Z,'real')
assume(k,'real')
[Z]=solve(abs(k/(k+1i*Z))==1/sqrt(2));
Z=????

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Roger Stafford
Roger Stafford el 24 de Jul. de 2015
Without your assumptions that k and Z are real, the solution for any given k would be Z = w*k where w = x+1i*y is any point on the circle in the complex plane:
x^2 + (y-1)^2 = 2
In other words there would be an infinite continuum of possible solutions and 'solve' could not give you an answer.
Given that k and Z must be real, the solution is thereby restricted to the two points, Z = k and Z = -k, where the circle crosses the real line, so that 'solve' could and should have given you that answer. I suspect that the combination of the given assumptions together with the 'abs' operator confused Mathworks' 'solve' to the point where it was unable to give this simple answer.
S H
S H el 24 de Jul. de 2015
Even if I try the following code, still Matlab answer does not make any sense:
clear all
syms Z k
[sol]=solve(abs(k/(k+1i*Z))==1/sqrt(2),Z);
.
.
.
and the answer will be k*1i + 2^(1/2)*abs(k)*1i which cannot be interpreted in anyhow as the correct answer of k.

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Respuestas (4)

Torsten
Torsten el 24 de Jul. de 2015

0 votos

Maybe
[Z]=solve(abs(k/(k+1i*Z))==1/sqrt(2),Z);
?
Best wishes
Torsten.
S H
S H el 24 de Jul. de 2015

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Still does not work or better said, Matlab cannot solve this simple equation.
Sean de Wolski
Sean de Wolski el 24 de Jul. de 2015

0 votos

One equation with two unknowns. What do you expect?
Torsten's suggestion gives you the result for Z:
ZZ = solve(abs(k/(k+1i*Z))==1/sqrt(2),Z);
ZZ = k*1i - 2^(1/2)*exp(z*2i)*abs(k)*1i
But it will of course include k because you have two unknowns.
S H
S H el 24 de Jul. de 2015
Editada: S H el 24 de Jul. de 2015

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It is not one equation with two unknowns as laid out clearly by Matlab symbolic documentation. The solve function should be able to find one symbolic variable in terms of other symbolic variables. In this case, Matlab provides a ridiculous answer of Z = k*1i - 2^(1/2)*exp(z*2i)*abs(k)*1i. But the correct answer must be simply Z=k. What needs to be answered is how Matlab cannot solve such a simple equation while Symbolic documentation shows the solve function is capable of finding all complex trigonometric functions in terms of symbolic variables. If there is no way that Matlab 2015a and older versions can find Z=k as the answer, then I consider this as a bug or premature Matlab symbolic tool.

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Walter Roberson
Walter Roberson el 24 de Jul. de 2015
No the answer is Z = +/- k
S H
S H el 28 de En. de 2019
This is overdue, but it seems the later versions of Matlab can solve this equation properly.

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