How do you use the rational roots theorem to find all possible zeros of # p(x)=x^5-4x^4+3x^3+2x-6#?
1 Answer
The only rational zero is
The other zeros are non-Real Complex roots.
Explanation:
The rational root theorem tells us that any rational zeros of
That is, the only possible rational zeros are:
#+-1# ,#+-2# ,#+-3# ,#+-6#
Trying each in turn, we find:
#p(3) = 243-324+81+6-6 = 0#
So
#x^5-4x^4+3x^3+2x-6 = (x-3)(x^4-x^3+2)#
By the rational root theorem, the only remaining possible rational zeros are:
#+-1# ,#+-2#
None of these is a zero of
That's as far as we can go with the rational root theorem.
Epilogue
It is possible to express the solutions of
If you are interested, here's the beginning of the solution...
To solve
#0 = 4t^4-2t+2#
#= (2t^2+at+b)(2t^2-at+c)#
#= 4t^4+(2b+2c-a^2)t^2+a(c-b)t+bc#
Equating coefficients and rearranging a little:
#b+c = a^2/2#
#b-c = 2/a#
#bc = 2#
Then:
#(a^2)^2/4 = (b+c)^2 = (b-c)^2+4bc = 4/(a^2)+8#
Hence:
#(a^2)^3-32(a^2)-16 = 0#
This cubic in
Substitute
Then:
#16 = (a^2)^3-32(a^2)#
#= (8/3 sqrt(6) cos theta)^3-32(4/3 sqrt(6) cos theta)^2#
#= 256/9sqrt(6)(4 cos^3 theta - 3 cos theta)#
#= 256/9sqrt(6) cos (3theta)#
So:
#cos(3theta) = (3sqrt(6))/32#
So:
#theta = +-1/3 (arccos((3sqrt(6))/32) + 2kpi)# for#k = 0, 1, 2#
So:
#a^2 = 8/3 sqrt(6) cos(1/3 (arccos((3sqrt(6))/32) + 2kpi))#
for
This gives a positive value (
So we can let
#a = sqrt(8/3 sqrt(6) cos(1/3 arccos((3sqrt(6))/32))#
Then
Hence we get quadratics to solve for
