If the quartic is monic (a = 1), the sum of squares α^2 + β^2 + γ^2 + δ^2 equals which of the following?

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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 (a = 1), the sum of squares α^2 + β^2 + γ^2 + δ^2 equals which of the following?

Explanation:
The key idea is to relate the sum of the squares of the roots to the sums of the roots and their pairwise products, using Vieta’s formulas for a monic quartic. Let the roots be α, β, γ, δ. Define S1 = α+β+γ+δ and S2 = αβ + αγ + αδ + βγ + βδ + γδ. A monic quartic with these roots has the form x^4 − S1 x^3 + S2 x^2 − S3 x + S4, so the coefficients give S1 = −b and S2 = c. The sum of squares can be written as α^2+β^2+γ^2+δ^2 = (α+β+γ+δ)^2 − 2(αβ+αγ+αδ+βγ+βδ+γδ) = S1^2 − 2S2. Substitute S1 = −b and S2 = c: this becomes (−b)^2 − 2c = b^2 − 2c. So the sum of the squares is b^2 − 2c.

The key idea is to relate the sum of the squares of the roots to the sums of the roots and their pairwise products, using Vieta’s formulas for a monic quartic.

Let the roots be α, β, γ, δ. Define S1 = α+β+γ+δ and S2 = αβ + αγ + αδ + βγ + βδ + γδ. A monic quartic with these roots has the form x^4 − S1 x^3 + S2 x^2 − S3 x + S4, so the coefficients give S1 = −b and S2 = c.

The sum of squares can be written as α^2+β^2+γ^2+δ^2 = (α+β+γ+δ)^2 − 2(αβ+αγ+αδ+βγ+βδ+γδ) = S1^2 − 2S2.

Substitute S1 = −b and S2 = c: this becomes (−b)^2 − 2c = b^2 − 2c.

So the sum of the squares is b^2 − 2c.

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