Online Aptitude Test - Aptitude Test - Random

		15000 x		1 +	R		2	- 15000		-		15000 x R x 2		= 96
					100							100

15000			1 +	R		2	- 1 -	2R		= 96
				100				100

15000		(100 + R)2 - 10000 - (200 x R)		= 96
		10000

R2 =		96 x 2		= 64
		3

R = 8.

Rate = 8%.

	4	A	=	2	B
	15			5

A =		2	x	15	B
		5		4

A =	3	B
	2

	A	=	3
	B		2

A : B = 3 : 2.

B's share = Rs.		1210 x	2		= Rs. 484.
			5

I. A = 20 x B	1	x B x H = 20 x B         H = 40.
	2

I alone gives the answer.

II gives, perimeter of the triangle = 40 cm.

This does not give the height of the triangle.

Correct answer is (A).

Given: Area of rectangle = Area of a right-angles triangle.

l x b =	1	x B x H
	2

I gives, B = 40 cm.

II gives, H = 50 cm.

Thus, to find l, we need b also, which is not given.

Given data is not sufficient to give the answer.

Correct answer is (D).

Let the ten's digit be x and unit's digit be y.

Then, number = 10x + y.

Number obtained by interchanging the digits = 10y + x.

(10x + y) + (10y + x) = 11(x + y), which is divisible by 11.

Video Explanation: https://youtu.be/lytJE8GqRvM

Given : S.I. = Rs. 50.

I gives, R = 10% p.a.

II gives, T = 10 years.

Sum =		100 x S.I.		= Rs.		100 x 50		= Rs. 50.
		T x R				10 x 10

Thus, I and II together give the answer.

Correct answer is (E).

Let the required number of days be x.

Less men, More days (Indirect Proportion)

27 : 36 :: 18 : x       27 x x = 36 x 18

x =	36 x 18
	27

x = 24.

I gives, h = 28 m and r = 14.

Capacity = r²h, which can be obtained.

Thus, I alone gives the answer.

II gives, r² = 616 m² and h = 28 m.

Capacity = (r² x h) = (616 x 28) m³.

Thus, II alone gives the answer.

Correct answer is (C).

Let the present ages of son and father be x and (60 -x) years respectively.

Then, (60 - x) - 6 = 5(x - 6)

54 - x = 5x - 30

6x = 84

x = 14.

Son's age after 6 years = (x+ 6) = 20 years..

C.P. of 1 orange = Rs.		350		= Rs. 3.50
		100

S.P. of 1 orange = Rs.		48		= Rs. 4
		12

Gain% =		0.50	x 100	%	=	100	% = 14	2	%
		3.50				7		7

Speed =		45 x	5	m/sec	=		25	m/sec.
			18				2

Time = 30 sec.

Let the length of bridge be x metres.

Then,	130 + x	=	25
	30		2

2(130 + x) = 750

x = 245 m.

Video Explanation: https://youtu.be/M_d8WufJWKc

Relative speed =	= (45 + 30) km/hr
	= 75 x 5 m/sec 18
	= 125 m/sec. 6

We have to find the time taken by the slower train to pass the DRIVER of the faster train and not the complete train.

So, distance covered = Length of the slower train.

Therefore, Distance covered = 500 m.

Required time =		500 x	6		= 24 sec.
			125

99 = 1 x 3 x 3 x 11

101 = 1 x 101

176 = 1 x 2 x 2 x 2 x 2 x 11

182 = 1 x 2 x 7 x 13

So, divisors of 99 are 1, 3, 9, 11, 33, .99

Divisors of 101 are 1 and 101

Divisors of 176 are 1, 2, 4, 8, 11, 16, 22, 44, 88 and 176

Divisors of 182 are 1, 2, 7, 13, 14, 26, 91 and 182.

Hence, 176 has the most number of divisors.

P.W. = Rs. (1760 -160) = Rs. 1600.

S.I. on Rs. 1600 at 12% is Rs. 160.

Time =		100 x 160		=	5	years =		5	x 12	months = 10 months.
		1600 x 12			6			6

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

Clearly, l = (48 - 16)m = 32 m,

b = (36 -16)m = 20 m,

h = 8 m.

Volume of the box = (32 x 20 x 8) m³ = 5120 m³.

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

(10)150 ÷ (10)146 =	10150
	10146

   = 10^{150 - 146}

   = 10⁴

   = 10000.

The year 2006 is an ordinary year. So, it has 1 odd day.

So, the day on 8^th Dec, 2007 will be 1 day beyond the day on 8^th Dec, 2006.

But, 8^th Dec, 2007 is Saturday.

8^th Dec, 2006 is Friday.