If f(x) = √ (1+√x?)  , x >  0, then f(x) ⋅ f′(x) is equal to

1) ?1 / 2√x? .
2) 1 / 2
3) 1 / 4√x
4) (2√x?+1) / 4√x
.

If the imaginary part of the expression $$\cfrac{z-1}{{{e}^{\theta t}}}+\cfrac{{{e}^{\theta t}}}{z-1}$$  be zero, then the locus of z can be

1) A parabola
2) A circle of radius 1
3) A straight line parallel to x - axis
4) A rectangle hyperbola

On a busy road in a city the number of persons sitting in the cars passing by were observed during a particular interval of time. Data of $$60$$ such cars is given in the following table.

1) $$\dfrac {1}{6}$$
2) $$\dfrac {1}{12}$$
3) $$\dfrac {1}{10}$$
4) None of these

The number of solutions of the equation 6cos⁵θ  – 6cos⁴θ – 5cos³θ + 5cos²θ + cosθ – 1 = 0, where 0 < q < 360° is-

1)  2
2) 4
3) 6
4) 8

Let A, B, C, D be (not necessarily square) real matrices such that A^T=BCD;B^T=CDA;C^T=DAB and D^T=ABC
for the matrix S=ABCD, consider the two statements.
I  S³=S
II S²=S4

1) II is true but not I
2) I is true but not II
3) Both I and II are true
4) Both I and II are false

f(x) = ?x−1?+?x−3? then f′(2)=

1) ?−2? .
2) 2
3) 0
4) 1
.

$$\dfrac{dy}{dx}=e^{-2y},x=5\Rightarrow y=0,$$ then &#160;$$y=3,find\ the\ value\ of\ 2x$$.

1) e⁵ + 9
2) e⁶ + 9
3) e⁸ + 9
4) e⁴ + 9
.

A room has three electric lamps. From a collection of 10 electric bulbs of which 6 are good 3 are selected at random & put in the lamps. Find the probability that the room is lighted

1)$$\displaystyle \frac {29}{30}$$

2)$$\displaystyle \frac {1}{30}$$

3)$$\displaystyle \frac {23}{30}$$

4)$$\displaystyle \frac {7}{30}$$

For all values of  $$\Theta \in \left( 0 , \dfrac { \pi } { 2 } \right)$$ the determinants of the matrix $$\left[ \begin{array} { c c c } { - 2 } & { \tan \theta + \sec ^ { 2 } \theta } & { 3 } \\ { - \sin \theta } & { \cos \theta } & { \sin \theta } \\ { - 3 } & { 4 } & { 3 } \end{array} \right]$$  always lies in the interval:

1) (-4,3)
2) (1,2)
3) (4,3)
4) (4, 5)

In a binomial distribution consisting of 5 independent trials, the probability of 1 and 2 successes are 0.4096 and 0.2048 respectively. The parameter p of the distribution is

1) $$1/3$$
2) $$1/4$$
3) $$1/5$$
4) None of these