Online Aptitude Test - Aptitude Test - Random

Number of shares =		4455		= 540.
		8.25

Face value = Rs. (540 x 10) = Rs. 5400.

Annual income = Rs.		12	x 5400		= Rs. 648.
		100

Capacity = r²h.

I gives, r² = 61600. This gives r.

II gives, h = 1.5 r.

Thus, I and II give the answer.

Again, III gives 2r = 880. This gives r.

So, II and III also give the answer.

Correct answer is (E).

Let the number of 25 p, 10 p and 5 p coins be x, 2x, 3x respectively.

Then, sum of their values = Rs.		25x	+	10 x 2x	+	5 x 3x		= Rs.	60x
		100		100		100			100

	60x	= 30	x =	30 x 100	= 50.
	100			60

Hence, the number of 5 p coins = (3 x 50) = 150.

Terms at odd places are 5, 6, 7, 8 etc. and each term at even place is 16.

So, 9 is wrong.

The numbers are squares of odd natural numbers, starting from 5 up to 15.

So, 36 is wrong.

N = H.C.F. of (4665 - 1305), (6905 - 4665) and (6905 - 1305)

  = H.C.F. of 3360, 2240 and 5600 = 1120.

Sum of digits in N = ( 1 + 1 + 2 + 0 ) = 4

B's 1 day's work =	1
	20

(A+ B)'s 1 day's work =	1
	7

I. (A + B)'s 5 day's work =	5
	7

Remaining work =		1 -	5		=	2	.
			7			7

	2	work was carried by A.
	7

II. is irrelevant.

Correct answer is (A).

At 4 o'clock, the hands of the watch are 20 min. spaces apart.

To be in opposite directions, they must be 30 min. spaces apart.

Minute hand will have to gain 50 min. spaces.

55 min. spaces are gained in 60 min.

50 min. spaces are gained in		60	x 50	min. or 54	6	min.
		55			11

Required time = 54	6	min. past 4.
	11

Let the quantity of the wine in the cask originally be x litres.

Then, quantity of wine left in cask after 4 operations =		x		1 -	8		4	litres.
					x

		x(1 - (8/x))4		=	16
		x			81

		1 -	8		4	=		2		4
			x					3

		x - 8		=	2
		x			3

3x - 24 = 2x

x = 24.

By the rule of alligation:

Cost of 1 kg of 1st kind Cost of 1 kg of 2nd kind
720 p	Mean Price 630 p	570 p
60		90

Required ratio = 60 : 90 = 2 : 3.

Suppose, number of articles bought = L.C.M. of 6 and 5 = 30.

C.P. of 30 articles = Rs.		5	x 30		= Rs. 25.
		6

S.P. of 30 articles = Rs.		6	x 30		= Rs. 36.
		5

Gain % =		11	x 100	% = 44%.
		25

Each number is double the preceding one plus 1.

So, the next number is (255 x 2) + 1 = 511.

Let the numbers be a, b and c.

Then, a² + b² + c² = 138 and (ab + bc + ca) = 131.

(a + b + c)² = a² + b² + c² + 2(ab + bc + ca) = 138 + 2 x 131 = 400.

(a + b + c) = 400 = 20.

Let S be the sample space.

Then, n(S) = 52C2 =	(52 x 51)	= 1326.
	(2 x 1)

Let E = event of getting 1 spade and 1 heart.

n(E)	= number of ways of choosing 1 spade out of 13 and 1 heart out of 13
	= (13C1 x 13C1)
	= (13 x 13)
	= 169.

P(E) =	n(E)	=	169	=	13	.
	n(S)		1326		102

Speed downstream = (13 + 4) km/hr = 17 km/hr.

Time taken to travel 68 km downstream =		68	hrs = 4 hrs.
		17

Total distance covered	= 7 + 1 miles 2 4
	= 15 miles. 4

Time taken	= 15 hrs 4 x 75
	= 1 hrs 20
	= 1 x 60 min. 20
	= 3 min.

Let original length = x and original breadth = y.

Original area = xy.

New length =	x	.
	2

New breadth = 3y.

New area =		x	x 3y		=	3	xy.
		2				2

Increase % =		1	xy x	1	x 100	%	= 50%.
		2		xy

C.I.	= Rs. 4000 x 1 + 10 2 - 4000 100
	= Rs. 4000 x 11 x 11 - 4000 10 10
	= Rs. 840.

Sum = Rs.		420 x 100		= Rs. 1750.
		3 x 8