If a, b, c are real, then both the roots of the equation (x - b)(x - c) + (x - c)(x - a) + (x - a)(x - b) = 0
positive
negative
real
imaginary
If be the roots of x2 - a(x - 1) + b = 0, then the value of is
0
- 1
C.
0
Since, are the roots of x2 - a(x - 1) + b = 0, then
The quadratic equation whose roots are three times the roots of 3ax2 + 3bx + c = 0 is
ax2 + 3bx + 3c = 0
ax2 + 3bx + c
9ax2 + 9bx + c
ax2 + bx + 3c
Find the values of 'a' for which the expression x2 - (3a - 1)x + 2a2 + 2a - 11 is always positive
The value of (1 - w + w2)5 + (1 + w - w2)5, where w and w2 are the complex cube roots of unity, is
0
32w
- 32
32
Let