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A student claims that -4i is the only imaginary root of a quadratic polynomial equation that has real coefficients. 1. What is the student’s mistake? 2. Write one possible polynomial that has the correct
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A student claims that -4i is the only imaginary root of a quadratic polynomial equation that has real coefficients.

1. What is the student’s mistake?
2. Write one possible polynomial that has the correct roots from part a in standard form.

Please explain your answer. Thank you!

User Behzad M Salehi
by
4.7k points

1 Answer

2 votes

Answer:

See explanation

Explanation:

1. The student is wrong because imaginary roots always occur in conjugate pairs.

So -4i cannot be the only imaginary root. It has to be accompanied by 4i also.

2. So the 2 roots can be 4i and -4i.

therefore the equation can be

(x - 4i)(x + 4i) = 0


x^(2) + 16 = 0

User Lourens
by
5.2k points
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