The number of values of k for which the equation `x^2-3x+k=0` has two real and distinct roots lying in the interval (0, 1), are

The number of values of k for which the equation x^(3)-3x+k=0 has two distinct roots lying in the interval (0,1) is three (b) two (c) infinitely many (d) zero

The equations x^(2) - 8x + k = 0 has real and distinct roots if :

If the equation x^(2) + 4x - k = 0 has real and distinct roots, then

the value(s) if k for which the equation 5kx^(2)-8x+2=0 has real roots

If the equation x^(2)+4x+k=0 has real and distinct roots, then find the value of 'k'.

The value of p for which the quadratic equation 2px^(2) + 6x + 5 = 0 has real and distinct roots is

If the equation x^4- λx^2+9=0 has four real and distinct roots, then lamda lies in the interval