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)-4x+4=0 may have one root common.

Find the value of lamda so that the equations x^(2)-x-12=0 and lamdax^(2)+10x+3=0 may have one root in common. Also, find the common root.

Find the value of lamda so that the equations x^(2)-x-12=0 and lamdax^(2)+10x+3=0 may have one root in common. Also, find the common root.

Find the value of lamda so that the equations x^(2)-x-12=0 and lamdax^(2)+10x+3=0 may have one root in common. Also, find the common root.

Find the value of lamda so that the equations x^(2)-x-12=0 and lamdax^(2)+10x+3=0 may have one root in common. Also, find the common root.

Find the value of lamda so that the equations x^(2)-x-12=0 and lamdax^(2)+10x+3=0 may have one root in common. Also, find the common root.

Find those values of k for which the equations x^2-kx-21=0 and x^2-3kx-35=0 have a common root.

Determine the value of k such that the equation (2k-5)x^2-4x-15=0 and (3k-8)x^2-5x-21=0 may have a common root.

Find the sum of all the values of m so that , the equations 3x^(2)-2mx-4=0" and x^(2)-4mx+2=0 " may have a common root.(" Can the equations have a common nonreal root)

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