Trailing coefficient of a polynomial
This functionality does not run in MATLAB.
tcoeff(p, <order>) tcoeff(f, <vars>, <order>)
tcoeff(p) returns the trailing coefficient of the polynomial p.
The returned coefficient is "trailing" with respect to the lexicographical ordering, unless a different ordering is specified via the argument order. Cf. Example 1.
A polynomial expression f is first converted to a polynomial with the variables given by vars. If no variables are given, they are searched for in f. See poly about details of the conversion. The result is returned as polynomial expression. FAIL is returned if f cannot be converted to a polynomial. Cf. Example 3.
We demonstrate how various orderings influence the result:
p := poly(5*x^2*y^3 + 4*x^3*y*z + 3*x*y^4*z, [x, y, z]): tcoeff(p), tcoeff(p, DegreeOrder), tcoeff(p, DegInvLexOrder)
The following call uses the reverse lexicographical order on 3 indeterminates:
The result of tcoeff is not fully evaluated:
p := poly(27*x^2 + a*x, [x]): a := 5: tcoeff(p), eval(tcoeff(p))
delete p, a:
The expression 1/x may not be regarded as polynomial:
The term ordering: either LexOrder, or DegreeOrder, or DegInvLexOrder, or a user-defined term ordering of type Dom::MonomOrdering. The default is the lexicographical ordering LexOrder.
Element of the coefficient domain of the polynomial or FAIL.