Let p and q be real numbers such that p!...

Let `p and q` be real numbers such that `p!=0,p^3!=q ,and p^3!=-qdot` If `alpha and beta` are nonzero complex numbers satisfying `alpha+beta=-p and alpha^3+beta^3=q` , then a quadratic equation having `alpha//beta and beta//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`

Similar Questions

Explore conceptually related problems

Let p and q real number such that p!= 0 , p^3!=q and p^3!=-q . if alpha and beta are non-zero complex number satisfying alpha+beta=-p and alpha^3+beta^3=q , then a quadratic equation having alpha/beta and beta/alpha as its roots is

Q. Let p and q real number such that p!= 0 , p^2!=q and p^2!=-q . if alpha and beta are non-zero complex number satisfying alpha+beta=-p and alpha^3+beta^3=q , then a quadratic equation having alpha/beta and beta/alpha as its roots is

Let alpha,beta in Rdot If alpha,beta^2 are the roots of quadratic equation x^2-p x+1=0. a n dalpha^2,beta are the roots of quadratic equation x^2-q x+8=0, then find p ,q,alpha,betadot

If alpha,beta are the roots of the equation x^2+p x+q=0,t h e n-1/alpha,-1/beta are the roots of the equation (a) x^2-p x+q=0 (b) x^2+p x+q=0 (c) q x^2+p x+1=0 (d) q x^2-p x+1=0

If a tangent drawn at P(alpha, alpha^(3)) to the curve y=x^(3) meets it again at Q(beta, beta^(3)) , then 2beta+alpha is equal to

If sec alpha and alpha are the roots of x^2-p x+q=0, then (a) p^2=q(q-2) (b) p^2=q(q+2) (c) p^2q^2=2q (d) none of these

Let alpha,beta in Rdot If alpha,beta^2 are the roots of quadratic equation x^2-p x+1=0a n dalpha^2,beta is the roots of quadratic equation x^2-q x+8=0 , then the value of rifr/8 is the arithmetic mean of p a n d q , is

If alphaa n dbeta are the zeros of the quadratic polynomial f(x)=x^2-p x+q , prove that (alpha^2)/(beta^2)+(beta^2)/(alpha^2)=(p^4)/(q^2)-(4p^2)/q+2

If alpha, beta be the roots of the equation x^2-px+q=0 then find the equation whose roots are q/(p-alpha) and q/(p-beta)

In the quadratic equation x^2+(p+i q)x+3i=0,p&q are real. If the sum of the squares of the roots is 8 then: p=3,q=-1 b. p=3,q=1 c. p=-3,q=-1 d. p=-3,q=1

Similar Questions

Recommended Questions