Let `alpha and beta` be real and distinct roots of `ax^(2) +bx-c= 0`. If p and q are real and distinct roots of `ax^(2)+bx-|c|=0`, where `a gt 0`, then

Find the value of a if x^(3) - 3x + a = 0 has three distinct real roots.

If alpha and beta are the distinct roots of ax^(2)+bx+c=0 , where a, b and c are non-zero real numbers, then (aalpha^(2)+balpha+6c)/(alphabeta^(2)+b beta+9c)+(abeta^(2)+b beta+19c)/(aalpha^(2)+balpha+13c) is equal to

If sin alpha and cos alpha are the roots of the equition ax^(2) + bx + c = 0 , then

If alpha and beta are the roots of x ^(2) - ax + b ^(2) = 0, then alpha ^(2) + beta ^(2) is equal to

If a and b are the non-zero distinct roots of x^(2) + ax + b =0 , then the minimum value of x^2 + ax + b is