`x^3+3x^2 -x - 3 =0`
if the roots of the equation above are p,q, and r, where p < q < r . Find the product pq.

Find the roots of the equations. Q. 2x^(2)+x-3=0

If 3+4i is a root of equation x^(2)+px+q=0 where p, q in R then

If p + iq be one of the roots of the equation x^(3) +ax +b=0 ,then 2p is one of the roots of the equation

If x^2+p x+q=0 is the quadratic equation whose roots are a-2a n d b-2 where aa n db are the roots of x^2-3x+1=0, then p-1,q=5 b. p=1,1=-5 c. p=-1,q=1 d. p=1,q=-1

If x^2+p x+q=0 is the quadratic equation whose roots are a-2a n d b-2 where aa n db are the roots of x^2-3x+1=0, then p-1,q=5 b. p=1,1=-5 c. p=-1,q=1 d. p=1,q=-1

If x^2+p x+q=0 is the quadratic equation whose roots are a-2a n d b-2 where aa n db are the roots of x^2-3x+1=0, then p-1,q=5 b. p=1,1=-5 c. p=-1,q=1 d. p=1,q=-1

If the roots of the equation x^3+P x^2+Q x-19=0 are each one more that the roots of the equation x^3-A x^2+B x-C=0,w h e r eA ,B ,C ,P ,a n dQ are constants, then find the value of A+B+Cdot

Let alpha,beta be the roots of the equation x^(2)-px+r=0 and alpha//2,2beta be the roots of the equation x^(2)-qx+r=0 , then the value of r is (1) (2)/(9)(p-q)(2q-p) (2) (2)/(9)(q-p)(2p-q) (3) (2)/(9)(q-2p)(2q-p) (4) (2)/(9)(2p-q)(2q-p)

Fill in the blanks If 2+isqrt(3) is a root of the equation x^2+p x+q=0,w h e r epa n dq are real, then (p ,q)=(______,_____) .

Find the sum of the squares and the sum of the cubes of the roots of the equations x^3-px^2+qx-r=0 in terms of p,q,r