The domain of sin-1log3x3 is
[1, 9]
[- 1, 9]
[- 9, 1]
[- 9, - 1]
The value of m for which the function f(x) = mx2, x ≤ 1 2x, x > 1, is differentiable at x = 1, is
0
1
2
does not exist
If y = (1 + x1/4)(1 + x1/2)(1 - x1/4), then dy/dx is equal to
- 1
x
If y = loglogx, then eydydx is equal to
1xlogx
1x
1logx
ey
B.
Given, y = loglogx⇒ ey = logxOn differentiating w.r.t. x, we get eydydx = 1x
For the function f(x) = x2 - 6x + 8, 2 ≤ x ≤ 4, the value of x for which f'(x) vanishes, is
9/4
5/2
3
7/2
The function f(x) = cot-1(x) + x, increases in the interval
1, ∞
- 1, ∞
- ∞, ∞
0, ∞
For all real values of x, increasing function is
x- 1
x2
x3
x4
Maximum value of f(x) = sin(x) + cos(x) is
12
The greatest value of f(x) = (x + 1)1/3 - (x - 1)1/3 on [0, 1] is
1/3
If y = x + 1 + x2n, then 1 + x2d2ydx2 + xdydx is equal to
n2y
- n2y
- y
2x2y