For the same quartic, which expression equals αβγ + αβδ + αγδ + βγδ?

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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 the same quartic, which expression equals αβγ + αβδ + αγδ + βγδ?

Explanation:
Vieta’s formulas connect the roots to the coefficients of the quartic. If the quartic is a(x−α)(x−β)(x−γ)(x−δ) and you expand it, the coefficient of x is -a times the sum of all triple products αβγ + αβδ + αγδ + βγδ. Since this coefficient must equal d, you get d = -a(αβγ + αβδ + αγδ + βγδ). Rearranging gives αβγ + αβδ + αγδ + βγδ = -d/a. So the expression in question equals -d/a. This aligns with the general pattern: sum of roots is -b/a, sum of pairwise products is c/a, the sum of triple products is -d/a, and the product of all roots is e/a.

Vieta’s formulas connect the roots to the coefficients of the quartic. If the quartic is a(x−α)(x−β)(x−γ)(x−δ) and you expand it, the coefficient of x is -a times the sum of all triple products αβγ + αβδ + αγδ + βγδ. Since this coefficient must equal d, you get d = -a(αβγ + αβδ + αγδ + βγδ). Rearranging gives αβγ + αβδ + αγδ + βγδ = -d/a. So the expression in question equals -d/a. This aligns with the general pattern: sum of roots is -b/a, sum of pairwise products is c/a, the sum of triple products is -d/a, and the product of all roots is e/a.

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