Let p and q be real numbers such that p ≠ 0, p3 ≠ q and p3 ≠-q. If α and β are nonzero complex numbers satisfying α+β=-p and α3+β3=q, then a quadratic equation having (α/β) and (β/α) as its roots is

Question

Let p and q be real numbers such that p ≠ 0, p3 ≠ q and p3 ≠-q. If α and β are nonzero complex numbers satisfying α+β=-p and α3+β3=q, then a quadratic equation having (α/β) and (β/α) as its roots is (A) (p3+q) x2-(p3+2 q) x+(p3+q)=0 (B) (p3+q) x2-(p3-2 q) x+(p3+q)=0 (C) (p3-q) x2-(5 p3-2 q) x+(p3-q)=0 (D) (p3-q) x2-(5 p3+2 q) x+(p3-q)=0

Tardigrade Admin · Accepted Answer

q=α3+β3=(α+β)3-3 α β(α+β) =-p3+3 α β p ⇒ α β=(p3+q/3 p) We have (α/β)+(β/α)=(α2+β2/α β) =((α+β)2-2 α β/α β)=((α+β)2/α β)-2 =(p2/(p3+q) / 3 p)-2 =(3 p3-2 p3-2 q/p3+q)=(p3-2 q/p3+q) text and (α/β) ⋅ (β/α)=1 Thus, required quadratic equation is x2-((p3-2 q)/p3+q) x+1=0 or (p3+q) x2-(p3-2 q) x+(p3+q)=0

Q. Let $p$ and $q$ be real numbers such that $p$ $\neq = 0, p^{3} \neq = q$ and $p^{3} \neq = - q$ . If $α$ and $β$ are nonzero complex numbers satisfying $α + β = - p$ and $α^{3} + β^{3} = q$ , then a quadratic equation having $\frac{α}{β}$ and $\frac{β}{α}$ as its roots is

$(p^{3} + q) x^{2} - (p^{3} + 2 q) x + (p^{3} + q) = 0$

$(p^{3} + q) x^{2} - (p^{3} - 2 q) x + (p^{3} + q) = 0$

$(p^{3} - q) x^{2} - (5 p^{3} - 2 q) x + (p^{3} - q) = 0$

$(p^{3} - q) x^{2} - (5 p^{3} + 2 q) x + (p^{3} - q) = 0$

Q. Let p and q be real numbers such that p =0,p3=q and p3=−q. If α and β are nonzero complex numbers satisfying α+β=−p and α3+β3=q, then a quadratic equation having βα​ and αβ​ as its roots is

(p3+q)x2−(p3+2q)x+(p3+q)=0

(p3+q)x2−(p3−2q)x+(p3+q)=0

(p3−q)x2−(5p3−2q)x+(p3−q)=0

(p3−q)x2−(5p3+2q)x+(p3−q)=0

Q. Let $p$ and $q$ be real numbers such that $p$ $\neq = 0, p^{3} \neq = q$ and $p^{3} \neq = - q$ . If $α$ and $β$ are nonzero complex numbers satisfying $α + β = - p$ and $α^{3} + β^{3} = q$ , then a quadratic equation having $\frac{α}{β}$ and $\frac{β}{α}$ as its roots is

$(p^{3} + q) x^{2} - (p^{3} + 2 q) x + (p^{3} + q) = 0$

$(p^{3} + q) x^{2} - (p^{3} - 2 q) x + (p^{3} + q) = 0$

$(p^{3} - q) x^{2} - (5 p^{3} - 2 q) x + (p^{3} - q) = 0$

$(p^{3} - q) x^{2} - (5 p^{3} + 2 q) x + (p^{3} - q) = 0$