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1 August, 18:21

It is known that a polynomial has solution if - 1 and 3i. What is the lowest possible degree polynomial with these solutions? (1) 1 (2) 2 (3) 3 (4) 4

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  1. 1 August, 22:14
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    (3) the polynomial has degree 3. If it were a complex coefficient polynomial, then the answer is 2.

    Step-by-step explanation:

    I am assuming it is a real coefficient polynomial, otherwise the answer will be 2. Since 3i is a root, then so is its conjugate - 3i, therefore the polynomial is a multiple of (x - (-1)) * (x-3i) * (x - (-3i)) = (x+1) * (x²+9), which has real coefficients. Hence, its degree is atleast 3. Option (3) is correct
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