Answer:
[tex]\displaystyle P(x)=-\frac{1}{2}(x^2+2x+10)(x-2)[/tex]
Step-by-step explanation:
Factored Form Of Polynomials
If we know the roots of a polynomial as
[tex]\alpha _1,\alpha _2,\alpha _3[/tex]
the polynomial can be expressed in factored form as
[tex]a(x-\alpha _1)(x-\alpha _2)(x-\alpha _3)[/tex]
We are given two of the three roots of the polynomial:
[tex]\alpha _1=1-3i[/tex]
[tex]\alpha _2=2[/tex]
The other root must be the conjugate of the complex root:
[tex]\alpha _3=1+3i[/tex]
Recall the product of two complex conjugate numbers is
[tex](1-3i)(1+3i)=1^2-(3i)^2=1+9=10[/tex]
The required polynomial is
[tex]P(x)=a\left[ x-(1-3i)\right ]\left[ x-(1+3i)\right ](x-2)[/tex]
[tex]P(x)=a(x^2+2x+10)(x-2)[/tex]
This is the factored form of the polynomial where only real numbers appear
We need to find the value of a, such as
[tex]P(0)=10[/tex]
[tex]P(0)=a(0^2+2(0)+10)(0-2)=10[/tex]
[tex]-20a=10[/tex]
Thus the value of a is
[tex]\displaystyle a=-\frac{1}{2}[/tex]
The expression of the required polynomial is
[tex]\boxed{P(x)=-\frac{1}{2}(x^2+2x+10)(x-2)}[/tex]
