What are the roots of #6x^4-11x^3-28x^2-15x+18=0# ?

1 Answer
Oct 13, 2017

The roots of #6x^4-11x^3-28x^2color(red)(+)15x+18=0# are:

#1, 3, -2/3, -3/2#

Explanation:

Assuming that this problem is supposed to be reasonably tractable, there is probably a typo in the question, with the correct quartic being:

#6x^4-11x^3-28x^2color(red)(+)15x+18=0#

First note that the sum of the coefficients is #0#, that is:

#6-11-28+15+18 = 0#

So #x=1# is a root and #(x-1)# a factor:

#6x^4-11x^3-28x^2+15x+18 = (x-1)(6x^3-5x^2-33x-18)#

By the rational roots theorem, any rational zeros of the remaining cubic are expressible in the form #p/q# for integers #p, q# with #p# a divisor of the constant term #-18# and #q# a divisor of the coefficient #6# of the leading term.

Further note that since #6# has only #2# prime factors, then if all of the zeros are rational then at least one is an integer factor of #18#.

Trying a few possibilities we find #x=3# is a zero and #(x-3)# a factor:

#6^3-5x^2-33x-18 = (x-3)(6x^2+13x+6)#

To factor the remaining quadratic use an AC method:

Find a pair of factors of #AC = 6*6 = 36# with sum #B=13#.

The pair #9,4# works.

Use this pair to split the middle term and factor by grouping:

#6x^2+13x+6 = (6x^2+9x)+(4x+6)#

#color(white)(6x^2+13x+6) = 3x(2x+3)+2(2x+3)#

#color(white)(6x^2+13x+6) = (3x+2)(2x+3)#

Hence the other two zeros are:

#x = -2/3" "# and #" "x = -3/2#