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42 votes
42 votes
Hello, just want to make sure my answer is correct. Thank you!

Hello, just want to make sure my answer is correct. Thank you!-example-1
User Leng
by
2.6k points

1 Answer

17 votes
17 votes

Given the zeros:


\begin{gathered} x_1=4 \\ x_2=4-5i \end{gathered}

You need to remember that the Factor Theorem states that, if, for a polynomial:


f(a)=0

Then, this is a factor of the polynomial:


(x-a)

In this case, you know that:


\begin{gathered} f(4)=0 \\ f(4-5i)=0 \end{gathered}

Therefore, you can determine that these are factors of the polynomial:


\begin{gathered} (x-4) \\ (x-(4-5i)) \end{gathered}

By definition, Complex Conjugates have this form:


(a+bi)(a-bi)

Therefore, you can determine that this is also a factor:


(x-(4+5i))

Now you can set up that the Factored Form of the polynomial is:


(x-4)(x-(4-5i))(x-(4+5i))

You need to expand the expression by applying the Distributive Property and applying:


(a-b)(a+b)=a^2-b^2

Then:


=(x-4)((x-4)^2-25i^2)

By definition:


(a-b)^2=a^2-2ab+b^2

Then, you get:


=(x-4)(x^2-(2)(x)(4)+4^2-25i^2)
=(x-4)(x^2-8x+16-25i^2)

Knowing that:


i^2=-1

And adding the like terms, you get:


=(x-4)(x^2-8x+16-25(-1))
=(x-4)(x^2-8x+16+25)
=(x-4)(x^2-8x+41)

Applying the Distributive Property and adding the like terms, you get:


=(x^2)(x)-(x)(8x)+(x)(41)-(4)(x^2)+(4)(8x)-(4)(41)
=x^3-8x^2+41x-4x^2+32x-164
=x^3-12x^2+73x-164

Hence, the answer is: Second option.

User Trevor Gowing
by
3.2k points