QuestionFind the complex zeros of the polynomial .
Studdy Solution
STEP 1
Assumptions1. The polynomial function is . We are looking for complex zeros of the function, which are the values of for which
STEP 2
To find the zeros of the function, we need to solve the equation . This gives us the following equation
STEP 3
This is a cubic equation, and solving it exactly can be quite complex. However, we can start by trying to find one root using the Rational Root Theorem, which states that any rational root of the polynomial, expressed in lowest terms, has a numerator that is a factor of the constant term (-145) and a denominator that is a factor of the leading coefficient (1).
STEP 4
The factors of -145 are ±1, ±, ±29, ±145. We can test these values in the equation to see if any of them are roots.
STEP 5
After testing these values, we find that is a root of the equation. This means that is a factor of the polynomial.
STEP 6
We can perform polynomial division or use the factor theorem to find the other factor of the polynomial. The factor theorem states that if is a factor of a polynomial , then can be expressed as , where is another polynomial.
STEP 7
Dividing the given polynomial by , we get
STEP 8
Now we need to find the roots of the quadratic equation . We can use the quadratic formula to do this
STEP 9
Substitute , , and into the quadratic formula
STEP 10
implify the expression under the square root
STEP 11
implify further
STEP 12
The square root of a negative number is imaginary, so we can write as . This gives us
STEP 13
implify to get the final answerSo the complex zeros of the function are , , and .
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