Examples
-9x3-6x2+20x-8−9x3−6x2+20x−8
Step 1
To find the possible number of positive roots, look at the signs on the coefficients and count the number of times the signs on the coefficients change from positive to negative or negative to positive.
f(x)=-9x3-6x2+20x-8f(x)=−9x3−6x2+20x−8
Step 2
Since there are 22 sign changes from the highest order term to the lowest, there are at most 22 positive roots (Descartes' Rule of Signs). The other possible numbers of positive roots are found by subtracting off pairs of roots (2-2)(2−2).
Positive Roots: 22 or 00
Step 3
To find the possible number of negative roots, replace xx with -x−x and repeat the sign comparison.
f(-x)=-9(-x)3-6(-x)2+20(-x)-8f(−x)=−9(−x)3−6(−x)2+20(−x)−8
Step 4
Step 4.1
Apply the product rule to -x−x.
f(-x)=-9((-1)3x3)-6(-x)2+20(-x)-8f(−x)=−9((−1)3x3)−6(−x)2+20(−x)−8
Step 4.2
Raise -1−1 to the power of 33.
f(-x)=-9(-x3)-6(-x)2+20(-x)-8f(−x)=−9(−x3)−6(−x)2+20(−x)−8
Step 4.3
Multiply -1−1 by -9−9.
f(-x)=9x3-6(-x)2+20(-x)-8f(−x)=9x3−6(−x)2+20(−x)−8
Step 4.4
Apply the product rule to -x−x.
f(-x)=9x3-6((-1)2x2)+20(-x)-8f(−x)=9x3−6((−1)2x2)+20(−x)−8
Step 4.5
Raise -1−1 to the power of 22.
f(-x)=9x3-6(1x2)+20(-x)-8f(−x)=9x3−6(1x2)+20(−x)−8
Step 4.6
Multiply x2x2 by 11.
f(-x)=9x3-6x2+20(-x)-8f(−x)=9x3−6x2+20(−x)−8
Step 4.7
Multiply -1−1 by 2020.
f(-x)=9x3-6x2-20x-8f(−x)=9x3−6x2−20x−8
f(-x)=9x3-6x2-20x-8f(−x)=9x3−6x2−20x−8
Step 5
Since there is 11 sign change from the highest order term to the lowest, there is at most 11 negative root (Descartes' Rule of Signs).
Negative Roots: 11
Step 6
The possible number of positive roots is 22 or 00, and the possible number of negative roots is 11.
Positive Roots: 22 or 00
Negative Roots: 11
