For a cubic equation with real coefficients, which patterns of roots are possible?

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Boost your skills in A Level Further Mathematics Core Pure. Study with flashcards and multiple choice questions, each question is followed by hints and explanations. Get prepared for your exam with confidence!

Multiple Choice

For a cubic equation with real coefficients, which patterns of roots are possible?

Explanation:
For a cubic with real coefficients, non-real roots must come in complex conjugate pairs, and because the degree is odd, there must be at least one real root. That means you can have either all roots real (they may be distinct or some repeated) or exactly one real root with the other two forming a complex conjugate pair. A cubic cannot have no real roots. The discriminant of the cubic helps: it’s positive when there are three distinct real roots, negative when there is one real root and a complex pair, and zero when a root is repeated. So both patterns—three real roots or one real root plus a complex conjugate pair—are possible.

For a cubic with real coefficients, non-real roots must come in complex conjugate pairs, and because the degree is odd, there must be at least one real root. That means you can have either all roots real (they may be distinct or some repeated) or exactly one real root with the other two forming a complex conjugate pair. A cubic cannot have no real roots. The discriminant of the cubic helps: it’s positive when there are three distinct real roots, negative when there is one real root and a complex pair, and zero when a root is repeated. So both patterns—three real roots or one real root plus a complex conjugate pair—are possible.

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