Given that a polynomial with real coefficients has a root of , the other root must be .
Answer & Analysis
Analysis
Question Analysis
This problem tests the application of the Conjugate Root Theorem, which states that if a polynomial with real coefficients has a complex root, its conjugate must also be a root.
Key Concept Explanation
The Conjugate Root Theorem: If is a polynomial with real coefficients and is a root, then is also a root.
Step-by-step Solution
1. Identify the given root:
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