Let α, β be the roots of the equation x2-4 λ x+5=0 and α, γ be the roots of the equation x2-(3 √2+2 √3) x+7+3 λ √3=0 If β+γ=3 √2, then (α+2 β+γ)2 is equal to:

Question

Let α, β be the roots of the equation x2-4 λ x+5=0 and α, &gamma; be the roots of the equation x2-(3 √2+2 √3) x+7+3 λ √3=0 If β+&gamma;=3 √2, then (α+2 β+&gamma;)2 is equal to: (A)  (B)  (C)  (D)

Tardigrade Admin · Accepted Answer

x2-4 λ x+5=0 langleβα. x2-(3 √2+2 √3) x+(7+3 λ √3)=0 langle&gamma;α. α+β=4 λ α+&gamma;=3 √2+2 √3 β+λ=3 √2 ∴ α=2 λ+√3 β=2 λ-√3 α &gamma;=7+3 λ √3 α β=5 4 λ2=8 ⇒ λ=√2 ∴ (α+2 β+λ)2=(4 α+3 √2)2=(7 √2)2=98

Q. Let α,β be the roots of the equation x2−4λx+5=0 and α,γ be the roots of the equation x2−(32​+23​)x+7+3λ3​=0 If β+γ=32​, then (α+2β+γ)2 is equal to:

x2−4λx+5=0⟨βα​ x2−(32​+23​)x+(7+3λ3​)=0⟨γα​ α+β=4λ α+γ=32​+23​ β+λ=32​ ∴α=2λ+3​ β=2λ−3​ αγ=7+3λ3​ αβ=5 4λ2=8⇒λ=2​ ∴(α+2β+λ)2=(4α+32​)2=(72​)2=98

Q. Let $α, β$ be the roots of the equation $x^{2} - 4 λ x + 5 = 0$ and $α, γ$ be the roots of the equation $x^{2} - (32 + 23) x + 7 + 3 λ 3 = 0$ If $β + γ = 32$ , then $(α + 2 β + γ)^{2}$ is equal to: