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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

Required average	= 67 x 2 + 35 x 2 + 6 x 3 2 + 2 + 3
	= 134 + 70 + 18 7
	= 222 7
	= 31  5 years. 7

Video Explanation: https://youtu.be/OXLnoItd0MA

1, 1 + 1² = 2, 2 + 2² = 6, 6 + 3² = 15, 15 + 4² = 31, 31 + 5² = 56, 56 + 6² = 92

Last number of given series must be 92 not 91.

Let the speed of two trains be 7x and 8x km/hr.

Then, 8x =		400		= 100
		4

x =		100		= 12.5
		8

Speed of first train = (7 x 12.5) km/hr = 87.5 km/hr.

.__________.______________________________________.
A     x    C            (100 - x)                 B       

Let AC = x km. Then, CB = (100 -x) km.

 I. AB = 125% of CB

100 =	125	x (100 - x)
	100

100 - x =	100 x 100	= 80
	125

x = 20 km.

AC = 20 km.

Thus, I alone gives the answer.

II. AC =	1	CB
	4

x =	1	(100 - x)
	4

5x = 100

x = 20.

AC = 20 km.

Thus, II alone gives the answer.

Correct answer is (C).

Greatest number of 4-digits is 9999.

L.C.M. of 15, 25, 40 and 75 is 600.

On dividing 9999 by 600, the remainder is 399.

Required number (9999 - 399) = 9600.

To be together between 9 and 10 o'clock, the minute hand has to gain 45 min. spaces.

55 min. spaces gained in 60 min.

45 min. spaces are gained in		60	x 45	min or 49	1	min.
		55			11

The hands are together at 49	1	min. past 9.
	11

In 12 hours, they are at right angles 22 times.

In 24 hours, they are at right angles 44 times.

Let the tens and units digit be x and y respectively. Then,

I. x + y = 8 and	x	=	1
	y		3

I gives, 4y = 24       y = 6.

So, x + 6 = 8       x = 2.

II. xy = 12 and	x	=	3
	y		1

II gives, x² = 36       x = 6.

So, 3y = 6       y = 2.

Therefore, Either I or II alone sufficient to answer.

  I. Let C.P. be Rs. x.

Then, M.P. = 130% of x = Rs.		13x	.
		10

III. S.P. = 90% of M.P.

Thus, I and III give, S.P. = Rs.		90	x	13x		= Rs.		117x
		100		10				100

Gain = Rs.		117x	- x		= Rs.	17x
		100				100

Thus, from I and III, gain % can be obtained.

Clearly, II is redundant.

Let Principal = Rs. P and Rate = R% p.a. Then,

Amount = Rs.		P		1 +	R		4
					100

C.I. =	P			1 +	R		4	- 1
					100

	P			1 +	R		4	- 1		= 1491.
					100

Clearly, it does not give the answer.

Correct answer is (D).

Originally, let the number of boys and girls in the college be 7x and 8x respectively.

Their increased number is (120% of 7x) and (110% of 8x).

		120	x 7x		and		110	x 8x
		100					100

	42x	and	44x
	5		5

The required ratio =		42x	:	44x		= 21 : 22.
		5		5

S.I. on Rs. 100 for double the time = Rs. 20.

T.D. on Rs. 120 = Rs. (120 - 100) = Rs. 20.

T.D. on Rs. 110 = Rs.		20	x 110		= Rs. 18.33
		120

Each even term of the series is obtained by multiplying the previous term by 2.

2^nd term = (1^st term) x 2 = 6 x 2 = 12

4^th term = (3^rd term) x 2 = 48 x 2 = 96.

6^th term = (5^th term) x 2 = 384 x 2 =768.

4^th term should be 96 instead of 100.

By the rule of alligation, we have:

Profit on 1st part Profit on 2nd part
8%	Mean Profit 14%	18%
4		6

Ration of 1^st and 2^nd parts = 4 : 6 = 2 : 3

Quantity of 2nd kind =		3	x 1000	kg	= 600 kg.
		5

Speed of train relative to jogger = (45 - 9) km/hr = 36 km/hr.

=		36 x	5	m/sec
			18

   = 10 m/sec.

Distance to be covered = (240 + 120) m = 360 m.

Time taken =		360	sec	= 36 sec.
		10

Whole work is done by A in		20 x	5		= 25 days.
			4

Now,		1 -	4		i.e.,	1	work is done by A and B in 3 days.
			5			5

Whole work will be done by A and B in (3 x 5) = 15 days.

A's 1 day's work =	1	, (A + B)'s 1 day's work =	1	.
	25		15

B's 1 day's work =		1	-	1		=	4	=	2	.
		15		25			150		75

So, B alone would do the work in	75	= 37	1	days.
	2		2

B's 10 day's work =		1	x 10		=	2	.
		15				3

Remaining work =		1 -	2		=	1	.
			3			3

Now,	1	work is done by A in 1 day.
	18

	1	work is done by A in		18 x	1		= 6 days.
	3				3