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Real Roots of a Polynomial

62 vues (au cours des 30 derniers jours)
Philosophaie
Philosophaie le 18 Sep 2013
I have used "solve" to factor a fourth order polynomial. It has four roots with three complex numbers. I used:
xf = solve(x^4+7*x^3-8*x^2+5*x+2,x)
if (isreal(xf)==1)
...
end;
to try to pull out the real roots but it did not work.
Is there a better way?
  2 commentaires
Matt Kindig
Matt Kindig le 18 Sep 2013
Modifié(e) : Matt Kindig le 18 Sep 2013
Are you sure there are real roots to the polynomial? It is not a given that there are.
Azzi Abdelmalek
Azzi Abdelmalek le 18 Sep 2013
Polynomial with real coefficient can not have an odd number of complex roots,

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Réponse acceptée

Roger Stafford
Roger Stafford le 18 Sep 2013
Modifié(e) : Roger Stafford le 18 Sep 2013
Use 'roots' to find the roots of polynomials.
r = roots([1,7,-8,5,1]); % Get all the roots
r = r(imag(r)==0); % Save only the real roots
The 'isreal' function is true only if All elements of a vector are real, so it isn't appropriate for sorting out the real roots.
A polynomial with all real coefficients such as yours cannot have an odd number of complex roots. They must occur in conjugate pairs. As you see, in your particular polynomial there are just two complex roots, which are conjugates of one another.
  1 commentaire
Philosophaie
Philosophaie le 18 Sep 2013
Modifié(e) : Philosophaie le 18 Sep 2013
I get:
acp1 =
[ empty sym ]
There is a real root to the polynomial in question.
It works my mistake.
Is there any way of getting Matlab to complete the addition,subtraction, mult and divide?

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Plus de réponses (1)

Azzi Abdelmalek
Azzi Abdelmalek le 18 Sep 2013
%P=x^4+7*x^3-8*x^2+5*x+2
p=[1 7 -8 5 2]
result=roots(p)
  2 commentaires
Azzi Abdelmalek
Azzi Abdelmalek le 18 Sep 2013
If all your roots are real,
syms x
factor(x^4+7*x^3-8*x^2+5*x+2)
should work
Roger Stafford
Roger Stafford le 18 Sep 2013
Only two of the roots are real. The other two are a complex conjugate pair. However the polynomial can still be factored using these complex values.

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