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If a is a square N-by-N matrix, poly (a)
is the row vector of the coefficients of det (z * eye (N) - a),
the characteristic polynomial of a. As an example we can use
this to find the eigenvalues of a as the roots of poly (a).
roots(poly(eye(3))) ⇒ 1.00000 + 0.00000i ⇒ 1.00000 - 0.00000i ⇒ 1.00000 + 0.00000i |
In real-life examples you should, however, use the eig function
for computing eigenvalues.
If x is a vector, poly (x) is a vector of coefficients
of the polynomial whose roots are the elements of x. That is,
of c is a polynomial, then the elements of
d = roots (poly (c)) are contained in c.
The vectors c and d are, however, not equal due to sorting
and numerical errors.
See also: eig, roots.
Write formatted polynomial
and return it as a string or write it to the screen (if
nargout is zero).
x defaults to the string "s".
See also: polyval, polyvalm, poly, roots, conv, deconv, residue,
filter, polyderiv, and polyinteg.
Reduces a polynomial coefficient vector to a minimum number of terms by
stripping off any leading zeros.
See also: poly, roots, conv, deconv, residue, filter, polyval,
polyvalm, polyderiv, polyinteg.
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