If the quartic is monic, the sum of triple products αβγ + αβδ + αγδ + βγδ equals which expression?

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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

If the quartic is monic, the sum of triple products αβγ + αβδ + αγδ + βγδ equals which expression?

Explanation:
Think of the quartic as built from its roots α, β, γ, δ: f(x) = (x−α)(x−β)(x−γ)(x−δ). When you expand this, the signs of the elementary symmetric sums alternate: x^4 − (sum of roots) x^3 + (sum of pairwise products) x^2 − (sum of triple products) x + (product of roots). So the coefficient of x is minus the sum of the triple products αβγ + αβδ + αγδ + βγδ. If the polynomial is written as x^4 + b x^3 + c x^2 + d x + e, then −(sum of triple products) = d, hence the sum of triple products equals −d.

Think of the quartic as built from its roots α, β, γ, δ: f(x) = (x−α)(x−β)(x−γ)(x−δ). When you expand this, the signs of the elementary symmetric sums alternate: x^4 − (sum of roots) x^3 + (sum of pairwise products) x^2 − (sum of triple products) x + (product of roots).

So the coefficient of x is minus the sum of the triple products αβγ + αβδ + αγδ + βγδ. If the polynomial is written as x^4 + b x^3 + c x^2 + d x + e, then −(sum of triple products) = d, hence the sum of triple products equals −d.

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