If p.q are the · roots of the equation x2 + px + q =0, then
p = 1, q = - 2
p = 0, q = 1
p = - 2, q = 0
p = - 2, q = 1
If are roots of ax + bx + c = 0, then the equation whose roots are is
a2x2 - (b2 - 2ac)x + c2 = 0
a2x2 + (b2 - ac)x + c2 = 0
a2x2 + (b2 + ac)x + c2 = 0
a2x2 + (b2 + 2ac)x + c2 = 0
The quadratic expression for any real x, if
p2 - 16p - 8q < 0
p2 - 8p + 16q < 0
p2 - 8p - 16q < 0
p2 - 16p + 8q < 0
Let f: Then, range of the function f(x) is
A.
For x to be. real, discriminant of the above quadratic equation should be greater than or equal to 0.