What are the possible rational roots #x^5 -12x^4 +2 x^3 -3x^2 +8x-12 = 0#?

1 Answer
Aug 6, 2016

This quintic has no rational roots.

Explanation:

#f(x) = x^5-12x^4+2x^3-3x^2+8x-12#

By the rational root theorem, any zeros of #f(x)# are expressible in the form #p/q# for integers #p, q# with #p# a divisor of the constant term #-12# and #q# a divisor of the coefficient #1# of the leading term.

That means that the only possible rational zeros are:

#+-1, +-2, +-3, +-4, +-6, +-12#

Note that #f(-x) = -x^5-12x^4-2x^3-3x^2-8x-12# has all negative coefficients. Hence #f(x)# has no negative zeros.

So the only possible rational zeros are:

#1, 2, 3, 4, 6, 12#

Evaluating #f(x)# for each of these values, we find none is a zero. So #f(x)# has no rational zeros.

In common with most quintics and polynomials of higher degree, the zeros are not expressible in terms of #n#th roots or elementary functions, including trigonometric functions.

You can use numerical methods such as Durand-Kerner to find approximations:

#x_1 ~~ 11.8484#

#x_(2,3) ~~ -0.640414+-0.877123i#

#x_(4,5) ~~ 0.716229+-0.587964i#