A real quadratic equation without real zeros always has two conjugate imaginary zeros. What does it mean for the two zeros to be conjugate?

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According to th e conjugate zeros theorem,  when a polynomial has a complex zero, so the  conjugate  of such a zero is also a zero.  What is a Conjugate Zeros Theorem?  According to the Conjugate Zeros Theorem, when a  complex number  a + bi is such a zero of such a polynomial with real coefficients, then its complex conjugate, a - bi, is likewise a zero of the polynomial. It's also known as that of the  Conjugate Pair Theorem .  Some key features regarding the conjugate zero theorem are-   One method for determining the zeros of an extended  polynomial  has been the conjugate zeros theorem.   If we are provided an imaginary zero, we can occasionally factor this polynomial and find additional zeros using the conjugate zeros theorem.   According to the conjugate zeros theorem, if a polynomials uses a single complex zero, therefore the conjugate of such a zero is also a zero.  This Conjugate Zeros Theorem can be used to assist us find the zeros of an extended polynomial.   When we are given a  imaginary zero , we can factor the polynomial then find the other zeros using the conjugate zeros theorem.   To know more about the  conjugate zero theorem , here   https://brainly.com/question/13721456    #SPJ4

What is a Conjugate Zeros Theorem?

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