To calculate: polynomial equation with real coefficients that has roots -2,i

Ava-May Nelson

Ava-May Nelson

Answered question

2021-08-03

To calculate: Polynomial equation with real coefficients that has roots 2,i.

Answer & Explanation

tabuordg

tabuordg

Skilled2021-08-04Added 99 answers

Given:
2,i
Formula Used:
(a+b)(ab)=a2b2
Calculation:
If the polynomial has real coefficients, then it’s imaginary roots occur in conjugate pairs. So, a polynomial with the given root i must have another root as -i.
Since each root of the equation corresponds to a factor of the polynomial, also, the roots indicate zeros of that polynomial, thus, the polynomial equation is written as,
[x(2)](xi)[x(i)]=0
(x+2)(xi)(x+i)=0
Further use arithmetic rule,
(a+b)(ab)=a2b2
Here, a=x,b=i and i2=1.
Now, the polynomial equation is,
(x+2)(x2(i)2)=0
(x+2)(x2+1)=0
x3+x+2x2+2=0
x3+2x2+x+2=0
Hence, the polynomial equation of given roots 2,i is x3+2x2+x+2=0.
Jeffrey Jordon

Jeffrey Jordon

Expert2022-07-06Added 2605 answers

Answer is given below (on video)

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