Let pa n dq be real numbers such that p!...

Let `pa n dq` be real numbers such that `p!=0,p^3!=q ,a n d p^3!=-qdot` If `alphaa n dbeta` are nonzero complex numbers satisfying `alpha+beta=-pa n dalpha^3+beta^3=q` , then a quadratic equation having `alpha//betaa n dbeta//alpha` as its roots is A. `(p^3+q)x^2-(p^3+2q)x+(p^3+q)=0` B. `(p^3+q)x^2-(p^3-2q)x+(p^3+q)=0` C. `(p^3+q)x^2-(5p^3-2q)x+(p^3-q)=0` D. `(p^3+q)x^2-(5p^3+2q)x+(p^3+q)=0`

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