Solving for unisolated variable

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Jonathan
Jonathan am 22 Nov. 2013
Kommentiert: Jonathan am 23 Nov. 2013
Hello all, I'm having a bit of trouble finding a method to solve a nonlinear equation. I've looked into "fsolve" a little but couldn't figure out if it would be effective. I'm using MatLab 2009.
Here is the equation, for ease I've simplified the constants to A,B,C. Variable to solve for is x.
x = arctan( (A - C*cos(x)) / (B*cos(x)) )
Which was derived from
A = B*sin(x) + C*cos(x)
Any help would be greatly appreciated... Rather than relying on MatLab to solve I would like to have x = F(A,B,C) where A,B,C are known but change with each iteration.
Another consideration is that this value needs to be found 5-10 times per second.
Thank you in advance! - Jon

Antworten (2)

Walter Roberson
Walter Roberson am 22 Nov. 2013
There are two solutions:
T0 = sqrt(C^2*B^2 - B^2*A^2 + B^4);
X = [(C*A + T0)/(C^2+B^2), (C*A - T0)/(C^2+B^2)]; %just sign difference between two
Y = (A - C*X) / B;
atan2(Y, X)
  2 Kommentare
Jonathan
Jonathan am 23 Nov. 2013
Thanks for the quick response! I will be out of my lab until Sunday, so I can't verify until then. Can I ask either of you how you derived this solution? This information could be helpful to future projects and I'd love to see your work. Thanks!
Walter Roberson
Walter Roberson am 23 Nov. 2013
I used a symbolic engine.

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Roger Stafford
Roger Stafford am 23 Nov. 2013
Two solutions can be expressed as:
x = asin(A/sqrt(B^2+C^2)) - atan2(C,B);
and
x = pi - asin(A/sqrt(B^2+C^2)) - atan2(C,B)
Also either value with any integral multiple of 2*pi added or subtracted is a solution, thus giving infinitely many solutions.
  3 Kommentare
Roger Stafford
Roger Stafford am 23 Nov. 2013
My reasoning went this way. Starting with
A = B*sin(x) + C*cos(x)
notice that any pair of numbers B and C can always be represented by
B = sqrt(B^2+C^2)*cos(t)
C = sqrt(B^2+C^2)*sin(t)
for an appropriate angle t, which can be evaluated by
t = atan2(C,B)
(That in fact is one way to define the function atan2.) This gives
A = sqrt(B^2+C^2)*(cos(t)*sin(x)+sin(t)*cos(x))
= sqrt(B^2+C^2)*sin(x+t)
sin(x+t) = A/sqrt(B^2+C^2)
x + t = asin(A/sqrt(B^2+C^2))
x = asin(A/sqrt(B^2+C^2)) - t = asin(A/sqrt(B^2+C^2)) - atan2(C,B)
Jonathan
Jonathan am 23 Nov. 2013
Interesting... Thank you very much. I'll let you know if it accomplishes the task!

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