The equation `kx^(2)+x+k=0` and `kx^(2)+kx+1=0` have exactly one root in common for

Find the value of k, so that the equation 2x^(2)+kx-5=0 and x^(2)-3x-4=0 may have one root in common.

Find the value of k, so that the equation 2x^(2)+kx-5=0 and x^(2)-3x-4=0 may have one root in common.

The equation k^(2)x^(2)+kx+1=0 has

Find the value of k, so that the equation 2x^(2)+kx-5=0 and x^(2)-4x+4=0 may have one root common.

The equation (x-2)^(4)-(x-2)=0 and x^(2)-kx+k=0 have two roots in common, then the value of k is

Find the value of k , so that the equation 2x^2+kx-5=0 and x^2-3x-4=0 may have one root in common.

For which value of k will the equations x^(2)-kx-21=0 and x^(2)-3kx+35=0 have one common root ?

The positive value of K for which both the equations x^(2)+Kx+64=0 and x^(2)-8x+K=0 have real roots, is

If the equation x^(2)+x-k=0 and x^(2)-kx+8=0 have a common root for a fixed real number k then k is equal to

If the equations x^2 + 5x + 6 = 0 and x^2 + kx + 1 = 0 have a common root, then what is the value of k?