Is it possible to factor y=6x^4-11x^3-51x^2+98x-27 y=6x4−11x3−51x2+98x−27? If so, what are the factors?
1 Answer
Explanation:
I suspect a typo in the question.
Consider the quartic:
f(x) = 6x^4-11x^3-51x^2+color(red)(99)x-27f(x)=6x4−11x3−51x2+99x−27
By the rational roots theorem, any rational zeros of
That means that the only possible rational zeros of
+-1/6, +-1/3, +-1/2, +-1, +-3/2, +-3, +-9/2, +-9, +-27/2, +-27±16,±13,±12,±1,±32,±3,±92,±9,±272,±27
Trying each in turn, the first zero we come across is:
f(1/3) = 6(1/81)-11(1/27)-51(1/9)+99(1/3)-27 = (2-11-153+891-729)/27 = 0f(13)=6(181)−11(127)−51(19)+99(13)−27=2−11−153+891−72927=0
So
6x^4-11x^3-51x^2+99x-27 = (3x-1)(2x^3-3x^2-18x+27)6x4−11x3−51x2+99x−27=(3x−1)(2x3−3x2−18x+27)
Notice that in the remaining cubic, the ratio of the first and second terms is the same as that between the third and fourth terms. So this cubic will factor by grouping:
2x^3-3x^2-18x+27 = (2x^3-3x^2)-(18x-27)2x3−3x2−18x+27=(2x3−3x2)−(18x−27)
color(white)(2x^3-3x^2-18x+27) = x^2(2x-3)-9(2x-3)2x3−3x2−18x+27=x2(2x−3)−9(2x−3)
color(white)(2x^3-3x^2-18x+27) = (x^2-9)(2x-3)2x3−3x2−18x+27=(x2−9)(2x−3)
color(white)(2x^3-3x^2-18x+27) = (x^2-3^2)(2x-3)2x3−3x2−18x+27=(x2−32)(2x−3)
color(white)(2x^3-3x^2-18x+27) = (x-3)(x+3)(2x-3)2x3−3x2−18x+27=(x−3)(x+3)(2x−3)
So we find:
6x^4-11x^3-51x^2+99x-27 = (3x-1)(x-3)(x+3)(2x-3)6x4−11x3−51x2+99x−27=(3x−1)(x−3)(x+3)(2x−3)
Footnote
The quartic as specified "will" factor, but only with very complicated coefficients. Here's one of them:
11/24-1/24 sqrt(937+(10376 3^(2/3))/(1/2 (37557+i sqrt(24771372627)))^(1/3)+4 2^(2/3) (3 (37557+i sqrt(24771372627)))^(1/3))-1/2 sqrt(937/72-(1/2 (37557+i sqrt(24771372627)))^(1/3)/(6 3^(2/3))-1297/(3 2^(2/3) (3 (37557+i sqrt(24771372627)))^(1/3))+13429/(72 sqrt(937+(10376 3^(2/3))/(1/2 (37557+i sqrt(24771372627)))^(1/3)+4 2^(2/3) (3 (37557+i sqrt(24771372627)))^(1/3))))
