If `x^(2)+bx+1=0,binR` has imaginary root z such that `|z+1|=3` then `|b|` can be:

If ax^(2)+bx+c=0 has imaginary roots and a,b,c in Rsuch that a+4c<2b then

if ax^(2)+bx+c=0 has imaginary roots and a+c

If y=f(x)=ax^(2)+2bx+c=0 has Imaginary roots and 4a+4b+c<0 then

If a,b in R,a!=0 and the quadratic equation ax^(2)-bx+1=0 has imaginary roots,then (a+b+1) is a.positive b.negative c.zero d. Dependent on the sign of b

If all the three equations x^2+ax+10=0, x^2+bx+8=0 and x^2(2a+3b)x+60=0, where a,binR have a common root, then a value of (a-b) can be (A) -1 (B) 0 (C) 1 (D) 2

If the roots of ax^(2)+b(2x+1)=0 are imaginary then roots of bx^(2)+(b-c)x=c+a-b are

If the cubic equation z^(3)+az^(2)+bz+c=0 AA a, b, c in R, c ne0 has a purely imaginary root, then (where i^(2)=-1 )

Equation a/(x-1)+b/(x-2)+c/(x-3)=0(a,b,cgt0) has (A) two imaginary roots (B) one real roots in (1,2) and other in (2,3) (C) no real root in [1,4] (D) two real roots in (1,2)

If roots of the equation ax^(2)+2(a+b)x+(a+2b+c)=0 are imaginary then roots of the equation ax^(2)+2bx+c=0 are

If the equation ax^(2)+bx+c=0,0