If the equation `x^(2)+px+q=0 and x^(2)+qx+p=0` have a common root then 1+p+q =

If the equations x^(2) -px +q=0 and x^(2)+qx-p=0 have a common root, then which one of the following is correct?

If the equations x^(2)-px+q=0 and x^(2)-ax+b=0 have a common root and the second equation has equal roots then

If the equation x^(2)+px+q=0 and x^(2)+p'x+q'=0 have a common root show that it must be equal to (pq'-p'q)/(q-q') or (q-q')/(p'-p)

If the equations x^(2)-x-p=0 and x^(2)+2px-12=0 have a common root,then that root is

If the equations px^2+2qx+r=0 and px^2+2rx+q=0 have a common root then p+q+4r=

If the equations px^(2)+qx+r=0 and rx^(2)+qx+p=0 have a negative common root then the value of (p-q+r)=

If the equations x^2+px+q=0 and x^2+qx+p=0 have a common root, which of the following can be true?

If quadratic equations x^(2)+px+q=0 & 2x^(2)-4x+5=0 have a common root then p+q is never less than {p,q in R}:-