Let f(x) = 2x3 - 9ax2 + 12a2x + 1, where a > 0. The minimum of f is attained at a point q and the maximum is attained at a point p. If p = q, then a is equal to
1
3
2
0
For all rest numbers x and y, it is known as the real valued function f satisfies f(x) + f(y) = f(x + y). If f(1) = 7, then is equal to
7 x 51 x 102
6 x 50 x 102
7 x 50 x 102
7 x 50 x 101
The difference between the maximum and minimum value of of the function on [2, 3] is
39/6
49/6
59/6
69/6
C.
59/6
If a and b are the non-zero distinct roots of x2 + ax + b = 0, then the minimum value of x2 + ax + b is
2/3
9/4
- 9/4
- 2/3
Let f(x + y) = f(x) f(y) and f(x) = 1 + sin(3x) g(x), where g is differentiable.The f'(x) is equal to
3f(x)
g(0)
f(x)g(0)
3g(x)