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

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

The equations x^(2)+x+a=0 and x^(2)+ax+1=0 have a common real root (a) for no value of a. (b) for exactly one value of a. (c) for exactly two values of a. (d) for exactly three values of a.

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

If the equation x ^(4)+kx ^(2) +k=0 has exactly two distinct real roots, then the smallest integral value of |k| is:

The equations x^2 - 4x + k = 0 and x^2 + kx -4 = 0 where k is a real number have exactly one common root. What is the value of k.

For what value of k does 4x^2 + kx + 25 = 0 have exactly one real solution for x?

If the equation cosx + 3cos(2Kx) = 4 has exactly one solution, then