For what values of the parameter `a` the equation `x^(4)+2ax^(3)+x^(2)+2ax+1=0` has atleast two distinct negative roots?

Determine all real values of the parameter 'a' for which the equation 16x^4 - ax^3 + (2a + 17) x^2 - ax + 16 = 0 has exactly four distinct real roots that form a geometric progression.

Find all values of the parameter a for which the quadratic equation (a+1)x^(2)+2(a+1)x+a-2=0 (i) has two distinct roots. (ii) has no roots. (iii) has to equal roots.

The roots of the equation x^(2)+2ax+a^(2)+b^(2)=0 are

Find the values of p for which the equation x^(4)-14x^(2)+24x-3-p=0 has (a) Two distinct negative real roots (b) Two real roots of opposite sign (c) Four distinct real roots (d) No real roots

The number of positive integral values of m , m le 16 for which the equation (x^(2) +x+1) ^(2) - (m-3)(x^(2) +x+1) +m=0, has 4 distinct real root is:

If a gt 2 , then the roots of the equation (2-a)x^(2)+3ax-1=0 are

If 1,2,3 are the roots of the equation x^(3) + ax^(2) + bx + c=0 , then

If the equation x^(3)-3ax^(2)+3bx-c=0 has positive and distinct roots, then

The value of k for which the equation (k-2) x^(2) + 8x + k + 4 = 0 has both roots real, distinct and negative, is

The roots of the equation x^2+ax+b=0 are