How would I write a code to solve a system of equations?

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Omar
Omar el 19 de Oct. de 2013
Respondida: anjali wavhale el 1 de Dic. de 2020
I need to solve a system of equations but I do not know the syntax for doing so. The equations are:
q1 = (1.53*10^-5)*t1^4 + (1.67*10^-2)*t1^3 + 6.85*t1^2 + 2746*t1 - 57793
q2 = 13.3*(t1-t2)
q3 = (1.53*10^-5)*t2^4 + (1.67*10^-2)*t2^3 + 6.85*t2^2 + 4846*t2 - 49161
also; q1=q2=q3
I'm new to MATLAB and not sure how to handle this many variables along with the scientific notation.
  2 comentarios
Qasim Manzoor
Qasim Manzoor el 19 de Oct. de 2013
do you have to use a mathematical method or any way would be fine?
Omar
Omar el 20 de Oct. de 2013
I don't know what you mean exactly. How would you solve this in a non-mathematical way?

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Respuestas (4)

sixwwwwww
sixwwwwww el 20 de Oct. de 2013
Editada: sixwwwwww el 20 de Oct. de 2013
Dear Omar, you can solve your system of equations using the following way:
t = sym('t%d', [1 2]);
q1 = 1.53e-5 * t(1)^4 + 1.67e-2 * t(1)^3 + 6.85 * t(1)^2 + 2746 * t(1) - 57793;
q2 = 13.3 * (t(1) - t(2));
q3 = 1.53e-5 * t(2)^4 + 1.67e-2 * t(2)^3 + 6.85 * t(2)^2 + 4846 * t(2) - 49161;
[solutions_t1, solutions_t2] = solve(q1 == q2 == q3, t(1), t(2))
Or
[solutions_t1, solutions_t2] = solve(q1 == q2, q2 == q3, t(1), t(2))
You can check which solutions are better because in first case you will get 4 solutions for both t1 and t2 and in second case you will get 16 solutions for both t1 and t2. I hope it helps. Good luck!
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Omar
Omar el 20 de Oct. de 2013
ok I got what I'm looking for. Thank you for your help.
sixwwwwww
sixwwwwww el 20 de Oct. de 2013
You are welcome dear

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Walter Roberson
Walter Roberson el 20 de Oct. de 2013
{q = 2003.839045, t1 = -819.5264017, t2 = -970.1909915},
{q = -10982.94224, t1 = -817.9943073, t2 = 7.790823431},
{q = 133.2164095, t1 = 20.04280634, t2 = 10.02653495},
{q = 13235.45859, t1 = 24.30348638, t2 = -970.8437757}
provided that you only want real-valued solutions.
This was done by substituting t1 for t(1) and t2 for t(2), and then plugging the three q equations into solve()
David
David el 21 de Oct. de 2013
Editada: David el 21 de Oct. de 2013
In addition to the answers already posted, be sure to put sym() around each of your equations. That is to say, do the following:
syms t1 t2
q1 = sym( 1.53e-5*t(1)^4 + 1.67e-2*t(1)^3 + 6.85*t(1)^2 + 2746*t(1) - 57793 );
q2 = sym( 13.3*(t(1) - t(2)) );
q3 = sym( 1.53e-5*t(2)^4 + 1.67e-2*t(2)^3 + 6.85*t(2)^2 + 4846*t(2) - 49161 );
[solutions_t1, solutions_t2] = solve(q1 == q2, q2 == q3, t1, t2);
solve requires that your equations be symbolic objects which is guaranteed by using sym().
  2 comentarios
Walter Roberson
Walter Roberson el 21 de Oct. de 2013
As long as anything in the equation is sym, the whole expression will be treated as sym. So
t = sym('t%d', [1 2]);
is enough to make the equations sufficiently sym() without requiring sym() around the equations.
David
David el 22 de Oct. de 2013
Oh? This seemed to correct a problem I was having earlier in using the solve function. You actually saw that question and made useful suggestions, though suggestions that did not quite do the trick. Maybe we are both missing something or maybe it's just me...

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anjali wavhale
anjali wavhale el 1 de Dic. de 2020
how to do least square estimation for system with the prbs as input to it

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