Question 72094: find all roots of the polynomial x3 - x2 +16x -16
possible answers:
1, 4, -4
-1, 4, -4
-1, 4i, -4i
1, 4i, -4i
what does the i come from? please explain equation and solution.Thank you
Answer by rmromero(383)   (Show Source):
You can put this solution on YOUR website!
find all roots of the polynomial x^3 - x^2 +16x -16
possible answers:
1, 4, -4
-1, 4, -4
-1, 4i, -4i
1, 4i, -4i
what does the i come from? please explain equation and solution.Thank you
To solve for the roots of the polynomial(sometimes called zeros of the polynomial)
Let us find possible factors of x^3 - x^2 +16x -16, p/q
| |
q p
Where p = 16 (possible factor) = 1, -1, 4, -4, 16, -16
q = 1 (possible factor) = 1, -1
The possible factors of x^3 - x^2 +16x -16 are
p/q = 1, -1, 4, -4, 16, -16
Now we can use synthetic division to check which are the true factor.
factor Coefficients
1| 1 -1 16 -16
1 0 16
_______________
1 0 16 0 --> since no reminder, 1 is a factor of f(x)
Then lets find other factors aside from x - 1
the quotient 1 0 16 means x^2 + 16
Solve for x to find other factors of x^3 - x^2 +16x -16:
x^2 + 16 = 0
 Remember 
x = ±4i
Therefore the roots of the polynomial are
1, 4i, -4i
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