Difference between revisions of "008A Sample Final A, Question 9"

Question: a) List all the possible rational zeros of the function ${\displaystyle f(x)=x^{4}+5x^{3}-27x^{2}+31x-10}$

 b) Find all the zeros, that is, solve f(x) = 0

Solution:

Step 1:
Start by factoring -10, and 1. Then the Rational Zeros Theorem gives us that the possible rational zeros are ${\displaystyle \pm 1,\pm 2,\pm 5,}$ and ${\displaystyle \pm 10}$.

Step 2:
Start testing zeros with 1 and -1 since they require the least arithmetic. You will also find that 1 is a zero. Applying synthetic division you can reduce the polynomial to ${\displaystyle (x-1)(x^{3}+6x^{2}-21x+10)}$.

Step 3:
Now we just need to find the zeros of ${\displaystyle x^{3}+6x^{2}-21x+10}$. Since we are not down to a quadratic polynomial we have to find another zero from the list of rational zeros we found in step 1. You will find 2 is another root, and the polynomial can further be reduced to ${\displaystyle (x-1)(x-2)(x^{2}+8x-5)}$

Step 4:

Now that the polynomial has been reduced to a quadratic polynomial we can use the quadratic formula to find the rest of the zeros. By doing so we find the roots are ${\displaystyle {\frac {-8\pm {\sqrt {64+20}}}{2}}={\frac {-8\pm {\sqrt {4\cdot 21}}}{2}}=-4\pm {\sqrt {21}}}$. Thus the zeros of ${\displaystyle x^{4}+5x^{3}-27x^{2}+31x-10}$ are ${\displaystyle 1,2,}$and ${\displaystyle -4\pm {\sqrt {21}}}$

Final Answer:
The roots are ${\displaystyle x=1,2,}$and ${\displaystyle -4\pm {\sqrt {21}}}$

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