cant figure this out

[aidan]

How do I find a polynomial function of least degree having only real coefficients , a leading coefficient of 1, and roots of 1- square root 3, 1+ square root 3, and 7-i The polynomial function is P(x) =. Simplify answer

 

[MarkFL]

Hello, and welcome to FMH!

Your polynomial is going to have one root not listed...can you state that root?

 

[aidan]

sorry 7+i

 

[tkhunny]

That's good. Now, what to do with that?

 

[aidan]

thats the point that I am stuck at, I just cannot remember what to do once I have all of the roots

 

[MarkFL]

thats the point that I am stuck at, I just cannot remember what to do once I have all of the roots

Hint:

[MATH]P(x)=\prod_{k=1}^4(x-r_k)=(x-r_1)(x-r_2)(x-r_3)(x-r_4)[/MATH]

 

[Steven G]

Suppose x= 7 is a root of a polynomial, P(x). Please assume that 7* means any number BUT 7.

Assume P(x) = (x-7*)(x-7*)(x-7*)...(x-7*). Will P(7) = 0? Why not? What must a factor of P(x) be so that P(7)=0?