Online Aptitude Test - Aptitude Test - Random

Let AB be the observer and CD be the tower.

Draw BE CD.

Then, CE = AB = 1.6 m,

      BE = AC = 203 m.

DE	= tan 30° =	1
BE		3

DE =	203	m = 20 m.
	3

CD = CE + DE = (1.6 + 20) m = 21.6 m.

Gain = 20%

I. Profit = (S.P.) - (C.P.) = Rs. 40.

Thus, I give the answer. But, II does not give the answer.

Correct answer is (A).

  I. Let Ravi's present age be x years. Then, his father's present age = 2x years.

II. After 5 years,	Ravi's age	=	6
	Father's age		11

III. Ravi is younger than his brother.

From I and II, we get	x + 5	=	6	.   This gives x, the answer.
	2x + 5		11

Thus, I and II together give the answer. Clearly, III is redundant.

Correct answer is (A).

I. S = 5D    D =	S	....(i)
	5

II. S - 5 = 25 (D - 5)    S = 25D - 120 ....(ii)

Using (i) in (ii), we get S =		25 x	S		- 120
			5

4S = 120.

S = 30.

Thus, I and II both together give the answer. So, correct answer is (E).

Let 0.0169 x x = 1.3.

Then, 0.0169x = (1.3)² = 1.69

x =	1.69	= 100
	0.0169

Total number of balls = (2 + 3 + 2) = 7.

Let S be the sample space.

Then, n(S)	= Number of ways of drawing 2 balls out of 7
	= 7C2 `
	= (7 x 6) (2 x 1)
	= 21.

Let E = Event of drawing 2 balls, none of which is blue.

n(E)	= Number of ways of drawing 2 balls out of (2 + 3) balls.
	= 5C2
	= (5 x 4) (2 x 1)
	= 10.

P(E) =	n(E)	=	10	.
	n(S)		21

S.P. = Rs. 250 each.

To find gain percent, we must know the C.P. of each.

Correct answer is (B).

P.W. = Rs.		100 x 2310		= Rs. 1680.
		100 + 15 x 5 2

 I. Let the list price be Rs. x.

Then, S.P. = 95% of Rs. x = Rs.		x x	95		= Rs.	19x
			100			20

II. When S.P. = Rs. x and gain = 20%.

Then, C.P. = Rs.		100	x x		= Rs.	5x
		120				6

Gain =		19x	-	5x		=		57x - 50x		=	7x
		20		6				60			60

Gain % =		7x	x	6	x 100	% = 14%.
		60		5x

Thus, I and II only give the answer.

Correct answer is (A).

Suppose the man works overtime for x hours.

Now, working hours in 4 weeks = (5 x 8 x 4) = 160.

160 x 2.40 + x x 3.20 = 432

3.20x = 432 - 384 = 48

x = 15.

Hence, total hours of work = (160 + 15) = 175.

There are two series (8, 11, 14, 17, 20) and (7, 12, 17, 22) increasing by 3 and 5 respectively.

Cost Price (C.P.) = Rs. (4700 + 800) = Rs. 5500.

Selling Price (S.P.) = Rs. 5800.

Gain = (S.P.) - (C.P.) = Rs.(5800 - 5500) = Rs. 300.

Gain % =		300	x 100	%	= 5	5	%
		5500				11

Suppose A, B and C take x,	x	and	x	days respectively to finish the work.
	2		3

Then,		1	+	2	+	3		=	1
		x		x		x			2

	6	=	1
	x		2

x = 12.

So, B takes (12/2) = 6 days to finish the work.

Speed =		300		m/sec =	50	m/sec.
		18			3

Let the length of the platform be x metres.

Then,		x + 300		=	50
		39			3

3(x + 300) = 1950

x = 350 m.

Subtract 20, 25, 30, 35, 40, 45 from successive numbers.

So, 0 is wrong.

Given Expression	= (243)(n/5) x 32n + 1 9n x 3n - 1
	= (35)(n/5) x 32n + 1 (32)n x 3n - 1
	= (35 x (n/5) x 32n + 1) (32n x 3n - 1)
	= 3n x 32n + 1 32n x 3n - 1
	= 3(n + 2n + 1) 3(2n + n - 1)
	= 33n + 1 33n - 1
	= 3(3n + 1 - 3n + 1)   = 32   = 9.

Given expression = (11.98)² + (0.02)² + 11.98 x x.

For the given expression to be a perfect square, we must have

11.98 x x = 2 x 11.98 x 0.02 or x   = 0.04

P.W. = Rs. (540 - 90) = Rs. 450.

S.I. on Rs. 450 = Rs. 90.

S.I. on Rs. 540 = Rs.		90	x 540		= Rs. 108.
		450

B.D. = Rs. 108.