In the quadratic equation x^(2)+(p + iq)...

In the quadratic equation `x^(2)+(p + iq)x+3i=0` ,where `p` and `q` are real If the sum of the squares of the roots is `8` ,then the ordered pair `(p, q)` is given by :
(A) `(3,1)`
(B) `(-3,-1)`
(C) `(-3,1)`
(D) `(3,-1)`

Similar Questions

Explore conceptually related problems

if 2+isqrt3 be a root of the equation x^(2) + px + q =0 , where p and q are real, then find p and q

If -3+5i is a root of the equation x^(2)+px+q=0 then the ordered pair (p,q)is (p,qinR)

If 2 + isqrt3 is a root of x^(3) - 6x^(2) + px + q = 0 (where p and q are real) then p + q is

If -3+5i is a root of the equation x^(2)+px+q=0, then the ordered pair (p,q) is (p,q in R)(-6,34) (b) (6,34)34,-6) (d) 34,6)

If the sum of square of roots of equation x^(2)+(p+iq)x+3i=0 is 8, then find p and q,where p and q are real.

If (sqrt3 + i)^(100) = 2^(99) (p + iq) , then p and q are roots of the equation:

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