Find the values of `a` for which all the roots of the euation `x^4-4x^3-8x^2+a=0` are real.

The smallest value of k for which both the roots of the equation x^(2)-8 k x+16(k^(2)-k+1)=0 are real, distinct and have values atleast 4 is

Let (sin a) x^(2)+(sin a) x+(1-cos a)=0 . The set of values of a for which roots of this equation are real and distinct is

Find the value of the discriminant of the quadratic equation 2x^(2)-4x+3=0

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

The roots of the equation |[2+x,3,-4],[2,3+x,-4],[2,3,-4+x]|=0 are

The number of real roots of the equation |x|^(2)-3|x|+2=0 is

All possible values of a, so that 6 lies between the roots of the equation x^2 + 2(a-3)x +9 =0

Find the values of a and b for which zeros of q(x) = x^(3) + 2x^(2) +a are also the zero of p(x) = x^(5) - x^(4) - 4x^(3) + 3x^(2) + 3x +bp . Also, find zeros of p(x) which are not zeros of q(x) .

Find all roots of the equation X^(6)-X^(5)+X^(4)-X^(3)+X^(2)-X+1=0.

Find all the number 'a' for which any root of the equation sin 3x =a sin x +(4-2|a|)sin^(2) x is a root of the equation sin 3x + cos 2 x =1+2 sinx cos 2x and any root of the latter equation is a root of the former .