Simplification
Simplification is one of the most important part of Quantitative Aptitude section of any competitive exam. Today I am sharing all the techniques to solve Simplification questions quickly.
Rules of Simplification
V → Vinculum
B → Remove Brackets – in the order ( ) , { }, [ ]
O → Of
D → Division
M → Multiplication
A → Addition
S → Subtraction
Classification
Types  Description 
Natural Numbers:  all counting numbers ( 1,2,3,4,5….∞) 
Whole Numbers:  natural number + zero( 0,1,2,3,4,5…∞) 
Integers:  All whole numbers including Negative number + Positive number(∞……4,3,2,1,0,1,2,3,4,5….∞) 
Even & Odd Numbers :  All whole number divisible by 2 is Even (0,2,4,6,8,10,12…..∞) and which does not divide by 2 are Odd (1,3,5,7,9,11,13,15,17,19….∞) 
Prime Numbers:  It can be positive or negative except 1, if the number is not divisible by any number except the number itself.(2,3,5,7,11,13,17,19,23,29,31,37,41,43,47,53,59,61….∞) 
Composite Numbers:  Natural numbers which are not prime 
CoPrime:  Two natural number a and b are said to be coprime if their HCF is 1. 
Divisibility
Division & Remainder Rules
Suppose we divide 45 by 6
hence ,represent it as:
dividend = ( divisor✘quotient ) + remainder
or
divisior= [(dividend)(remainder] / quotient
could be write it as
x = kq + r where (x = dividend,k = divisor,q = quotient,r = remainder)
Rules
 Modulus of a Real Number:
Modulus of a real number a is defined as
a =  a, if a > 0  
–a, if a < 0 
Thus, 5 = 5 and 5 = (5) = 5.
 Virnaculum (or Bar):
When an expression contains Virnaculum, before applying the ‘BODMAS’ rule, we simplify the expression under the Virnaculum.
Example:
On dividing a certain number by 342, we get 47 as remainder. If the same number is divided by 18, what will be the remainder ?
Number = 342k + 47
( 18 ✘19k ) + ( 18 ✘2 ) + 11
18 ✘( 19k + 2 ) +11.
Remainder = 11
Sum Rules
(1+2+3+………+n) = ^{1}/_{2 }n(n+1)
(1^{2}+2^{2}+3^{2}+………+n^{2}) = ^{1}/_{6 }n (n+1) (2n+1)
(1^{3}+2^{3}+3^{3}+………+n^{3}) = ^{1}/4_{ }n^{2} (n+1)^{2}
^{ }
Questions:
LevelI:
1.  A man has Rs. 480 in the denominations of onerupee notes, fiverupee notes and tenrupee notes. The number of notes of each denomination is equal. What is the total number of notes that he has ?  

2.  There are two examinations rooms A and B. If 10 students are sent from A to B, then the number of students in each room is the same. If 20 candidates are sent from B to A, then the number of students in A is double the number of students in B. The number of students in room A is:  

3. The price of 10 chairs is equal to that of 4 tables. The price of 15 chairs and 2 tables together is Rs. 4000. The total price of 12 chairs and 3 tables is:  

4. If a – b = 3 and a^{2} + b^{2} = 29, find the value of ab.  

5.  The price of 2 sarees and 4 shirts is Rs. 1600. With the same money one can buy 1 saree and 6 shirts. If one wants to buy 12 shirts, how much shall he have to pay ?  

6.  A sum of Rs. 1360 has been divided among A, B and C such that A gets of what B gets and B gets of what C gets. B’s share is:  

7.  Onethird of Rahul’s savings in National Savings Certificate is equal to onehalf of his savings in Public Provident Fund. If he has Rs. 1,50,000 as total savings, how much has he saved in Public Provident Fund ?  

8.  A fires 5 shots to B’s 3 but A kills only once in 3 shots while B kills once in 2 shots. When B has missed 27 times, A has killed:  

9.  Eight people are planning to share equally the cost of a rental car. If one person withdraws from the arrangement and the others share equally the entire cost of the car, then the share of each of the remaining persons increased by:  

10.  To fill a tank, 25 buckets of water is required. How many buckets of water will be required to fill the same tank if the capacity of the bucket is reduced to twofifth of its present ?  

LevelII:
1.  In a regular week, there are 5 working days and for each day, the working hours are 8. A man gets Rs. 2.40 per hour for regular work and Rs. 3.20 per hours for overtime. If he earns Rs. 432 in 4 weeks, then how many hours does he work for ?  

12.  Free notebooks were distributed equally among children of a class. The number of notebooks each child got was oneeighth of the number of children. Had the number of children been half, each child would have got 16 notebooks. Total how many notebooks were distributed ?  

13.  A man has some hens and cows. If the number of heads be 48 and the number of feet equals 140, then the number of hens will be:  

14. 
 

15.  David gets on the elevator at the 11^{th} floor of a building and rides up at the rate of 57 floors per minute. At the same time, Albert gets on an elevator at the 51st floor of the same building and rides down at the rate of 63 floors per minute. If they continue travelling at these rates, then at which floor will their paths cross ?  

 Find the value of 1/(3+1/(3+1/(31/3)))
A.) 3/10  B.) 10/3 
C.) 27/89  D.) 89/27 
Find the value of
A.) 3½ 99;  B.) 34/99 
C.) 2.131313  D.) 3.141414 
18.Find the value of
((0.1)^{3} + (0.6)^{3} + (0.7)^{3} − (0.3)(0.6)(0.7))/((0.1)^{2} + (0.6)^{2} + (0.7)^{2} − 0.006 − 0.42 − 0.07)
A.) 14/10  B.) 1.35 
C.) 13/10  D.) 0 
 Solve(0.76 × 0.76 × 0.76 − 0.008)/(0.76 × 0.76 + 0.76 × 0.2 + 0.04)
A.) 0.56  B.) 0.65 
C.) 0.54  D.) 0.45 
 Find the value of
A.) 1.5  B.) 1.5 
C.) 1  D.) 0 
Answers:
LevelI
Answer:1 Option D
Explanation:
Let number of notes of each denomination be x.
Then x + 5x + 10x = 480
16x = 480
x = 30.
Hence, total number of notes = 3x = 90.
Answer:2 Option C
Explanation:
Let the number of students in rooms A and B be x and y respectively.
Then, x – 10 = y + 10 x – y = 20 …. (i)
and x + 20 = 2(y – 20) x – 2y = 60 …. (ii)
Solving (i) and (ii) we get: x = 100 , y = 80.
The required answer A = 100.
Answer:3 Option D
Explanation:
Let the cost of a chair and that of a table be Rs. x and Rs. y respectively.
Then, 10x = 4y or y =  5  x. 
2 
15x + 2y = 4000
15x + 2 x  5  x = 4000 
2 
20x = 4000
x = 200.
So, y =  5  x 200  = 500.  
2 
Hence, the cost of 12 chairs and 3 tables = 12x + 3y
= Rs. (2400 + 1500)
= Rs. 3900.
Answer:4 Option A
Explanation:
2ab = (a^{2} + b^{2}) – (a – b)^{2}
= 29 – 9 = 20
ab = 10.
Answer:5 Option B
Explanation:
Let the price of a saree and a shirt be Rs. x and Rs. y respectively.
Then, 2x + 4y = 1600 …. (i)
and x + 6y = 1600 …. (ii)
Divide equation (i) by 2, we get the below equation.
=> x + 2y = 800. — (iii)
Now subtract (iii) from (ii)
x + 6y = 1600 ()
x + 2y = 800
—————
4y = 800
—————
Therefore, y = 200.
Now apply value of y in (iii)
=> x + 2 x 200 = 800
=> x + 400 = 800
Therefore x = 400
Solving (i) and (ii) we get x = 400, y = 200.
Cost of 12 shirts = Rs. (12 x 200) = Rs. 2400.
Answer:6 Option C
Explanation:
Let C’s share = Rs. x
Then, B’s share = Rs.  x  , A’s share = Rs.  2  x  x  = Rs.  x  
4  3  4  6 
x  +  x  + x = 1360  
6  4 
17x  = 1360  
12 
x =  1360 x 12  = Rs. 960 
17 
Hence, B’s share = Rs.  960  = Rs. 240.  
Answer:7 Option C
Explanation:
Let savings in N.S.C and P.P.F. be Rs. x and Rs. (150000 – x) respectively. Then,
1  x =  1  (150000 – x) 
3  2 
x  +  x  = 75000  
3  2 
5x  = 75000  
6 
x =  75000 x 6  = 90000 
5 
Savings in Public Provident Fund = Rs. (150000 – 90000) = Rs. 60000
Answer:8 Option A
Explanation:
Let the total number of shots be x. Then,
Shots fired by A =  5  x 
8 
Shots fired by B =  3  x 
8 
Killing shots by A =  1  of  5  x  =  5  x 
3  8  24 
Shots missed by B =  1  of  3  x  =  3  x 
2  8  16 
3x  = 27 or x =  27 x 16  = 144.  
16  3 
Birds killed by A =  5x  =  5  x 144  = 30.  
24  24 
Answer:9 Option A
Explanation:
Original share of 1 person =  1 
8 
New share of 1 person =  1 
7 
Increase =  1  –  1  =  1  
7  8  56 
Required fraction =  (1/56)  =  1  x  8  =  1  
(1/8)  56  1  7 
Answer:10 Option C
Explanation:
Let the capacity of 1 bucket = x.
Then, the capacity of tank = 25x.
New capacity of bucket =  2  x 
5 
Required number of buckets =  25x 
(2x/5) 
=  25x  x  5  
2x 
=  125 
2 
= 62.5
LevelII:
Answer:11 Option B
Explanation:
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.
Answer:12 Option C
Explanation:
Let total number of children be x.
Then, x x  1  x =  x  x 16 x = 64. 
8  2 
Number of notebooks =  1  x^{2} =  1  x 64 x 64  = 512  
Answer:13 Option D
Explanation:
Let the number of hens be x and the number of cows be y.
Then, x + y = 48 …. (i)
and 2x + 4y = 140 x + 2y = 70 …. (ii)
Solving (i) and (ii) we get: x = 26, y = 22.
The required answer = 26.
Answer:14 Option B
Explanation:
Given exp. =  (a + b)^{2} – (a – b)^{2} 
ab 
=  4ab 
ab 
= 4 (where a = 469, b = 174.)
Answer:15 Option C
Explanation:
Suppose their paths cross after x minutes.
Then, 11 + 57x = 51 – 63x 120x = 40
x =  1 
3 
Number of floors covered by David in (1/3) min. =  1  x 57  = 19.  
3 
So, their paths cross at (11 +19) i.e., 30^{th} floor.
Answer:16 Option ‘C’
Explanation:
1/[3 + (1/(3+1/(3 – 1/3)))]
=> 1/[3 + 1/(3 + 1/(8/3))]
=> 1/[3 + 1/(3 + 3/8)]
=> 1/[3 + 8/27]
=> 1/(89/27)
=> 27/89
Answer:17 Option ‘D’
Explanation:
6/9 + 7/9 + 9/9 + 69/99
2/3 + 7/9 + 1 + 69/99
(66 + 77 + 99 + 69)/99
311/99 => 3.141414
Answer:18 Option ‘A’
Explanation:
((0.1)^{3} + (0.6)^{3} + (0.7)^{3} − (0.3)(0.6)(0.7))/((0.1)^{2} + (0.6)^{2} + (0.7)^{2} − 0.006 − 0.42 − 0.07)
=> (0.1 + 0.6 + 0.7)^{3}/(0.1 + 0.6 + 0.7)^{2}
=> 0.1 + 0.6 + 0.7 => 1.4 = 14/10
Answer:19 Option ‘A’
Answer:20 Option ‘D’
11/30 − [1/6 + 1/5 + [7/12 − 7/12]]
11/30 − [1/6 + 1/5 + [0]]
11/30 − [(5 + 6)/30]
11/30 − 11/30 = 0.
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