Wednesday, 13 July 2016

Quantative Aptitude (Simplification)

4. SIMPLIFICATION

IMPORTANT CONCEPTS

I. ’BODMAS’Rule: This rule depicts the correct sequence in which the operations are to be executed,so as to find out the value of a given expression.

Here, ‘B’ stands for ’bracket’ ,’O’for ‘of’ , ‘D’ for’  division’  and ‘M’ for ‘multiplication’, ‘A’ for ‘addition’ and ‘S’ for ‘subtraction’.
Thus, in simplifying an expression, first of all the brackets must be removed, strictly in the order(), {} and [].

After removing the brackets, we must use the following operations strictly in the order:
(1)of (2)division (3) multiplication (4)addition (5)subtraction.

 

II. 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.
III. Virnaculum (or bar): When an expression contains Virnaculum, before applying the ‘BODMAS’ rule, we simplify the expression under the Virnaculum.
  

SOLVED EXAMPLES


Ex. 1. Simplify: (i)5005-5000+10  (ii) 18800+470+20
 
Sol. (i)5005-5000+10=5005-(5000/10)=5005-500=4505.

        (ii)18800+470+20=(18800/470)+20=40/20=2.
 


Ex. 2. Simplify: b-[b-(a+b)-{b-(b-a-b)}+2a]


 Sol. Given expression=b-[b-(a+b)-{b-(b-a+b)}+2a] 
                                    =b-[b-a-b-{b-2b+a}+2a]
                                    =b-[-a-{b-2b+a+2a}]
                                    =b-[-a-{-b+3a}]=b-[-a+b-3a]
                                    =b-[-4a+b]=b+4a-b=4a.


Ex. 3. What value will replace the question mark in the following equation?


                        4 1+3 1+?+2 1=13 2.
                           2    6         3      5
        
Sol. Let 9/2+19/6+x+7/3=67/5
       Then x=(67/5)-(9/2+19/6+7/3)óx=(67/5)-((27+19+14)/6)=((67/5)-(60/6)
                                                                óx=((67/5)-10)=17/5=3 2
                                                                                               5
Hence, missing fractions =3 2
                                             5

Ex.4. 4/15 of 5/7 of a number is greater than 4/9 of 2/5 of the same number by 8.
What is half of that number?

Sol. Let the number be x. then 4/15 of 5/7 of x-4/9 of 2/5 of x=8ó4/21x-8/45x=8
       ó(4/21-8/45)x=8ó(60-56)/315x=8ó4/315x=8
       óx=(8*315)/4=630ó1/2x=315
Hence required number = 315.
 


Ex. 5. Simplify:    3 1¸{1 1-1/2(2 1-1/4-1/6)}]
                               4       4             2
Sol. Given exp. =[13/4¸{5/4-1/2(5/2-(3-2)/12)}]=[13/4¸{5/4-1/2(5/2-1/12)}]
                         =[13/4¸{5/4-1/2((30-1)/12)}]=[13/4¸{5/4-29/24}]
                         =[13/4¸{(30-39)/24}]=[13/4¸1/24]=[(13/4)*24]=78

Ex. 6. Simplify: 108¸36of 1+2*3 1
                                            4   5     4
 


Sol. Given exp.= 108¸9+2*13  =108 +13 =12+13   =133 = 13 3
                                        5   4       9      10          10      10        10


Ex.7 Simplify: (7/2)¸(5/2)*(3/2)       ¸ 5.25
                         (7/2)¸(5/2)of (3/2)

sol.
Given exp. (7/2)´(2/5)´(3/2)  ¸  5.25=(21/10)¸(525/100)=(21/10)´(15/14)
                          (7/2)¸(15/4)

Ex. 8. Simplify: (i) 12.05*5.4+0.6  (ii) 0.6*0.6+0.6*0.6 ( Bank P.O 2003)

Sol. (i) Given exp. = 12.05*(5.4/0.6) = (12.05*9) = 108.45
       (ii) Given exp. = 0.6*0.6+(0.6*6) = 0.36+0.1 = 0.46

Ex. 9. Find the value of x in each of the following equation:
(i)                 [(17.28/x) / (3.6*0.2)] = 2
(ii)               3648.24 + 364.824 + x – 36.4824 = 3794.1696
(iii)             8.5 – { 5 ½  – [7 ½  + 2.8]/x}*4.25/(0.2)2 = 306 (Hotel Management,1997)

Sol. (i) (17.28/x) = 2*3.6*0.2 ó x = (17.28/1.44) = (1728/14) = 12.
       (ii) (364.824/x) = (3794.1696 + 36.4824) – 3648.24 = 3830.652 – 3648.24 = 182.412.
                        ó x = (364.824/182.412) =2.
(iii)             8.5-{5.5-(7.5+(2.8/x))}*(4.25/0.04) = 306
        ó 8.5-{5.5-{(7.5x+2.8)/x)}*(425/4) = 306
            ó 8.5-{(5.5x-7.5x-2.8)/x}*(425/4) = 306
            ó 8.5-{(-2x-2.8)/x}*106.25  = 306
            ó 8.5-{(-212.5x-297.5)/x} = 306
            ó (306-221)x = 297.5 ó x =(297.5/85) = 3.5.

Ex. 10. If (x/y)=(6/5), find the value (x2+y2)/(x2-y2)

Sol.  (x2+y2)/(x2-y2) = ( x2 /y2+ 1)/ ( x2 /y2-1) = [(6/5)2+1] / [(6/5)2-1]
                                    =  [(36/25)+1] / [(36/25)-1] = (61*25)/(25*11) = 61/11

 Ex. 11. Find the value of 4 -  _____5_________ 
                                                     1 + ___1___  __
                                                             3 + __1___    
                                                                    2 + _1_   
                                                                             4
Sol.    Given exp. =    4 -  _____5_______   =  4 -  ____5________  = 4 - ____5_____ 
                                         1 + ___1__                       1 + _____1____           1 + ___1__ 
                                                 3 + __1___                         3 + __4__                    (31/9)
                                                        2 + _1_                                   9
                                                                 4
                            
                              =  4 - __5____   =  4 - __5___  =  4 – (5*31)/ 40 = 4 – (31/8) = 1/8
                                         1 + _9­_              (40/31)
                                                 31                  

Ex. 12. If  _____2x______   = 1 ., then find the value of x .
                 1 + ___1___  __
                         1+ __x__       
                                1 -  x

Sol. We have : _____2x______ _  = 1  ó  _____2x_____   = 1 ó  __2x____    = 1
                 1 + ___1_____                  1 + ___1____                1+ (1 – x)
                                   _(1 – x) – x                         [1/(1- x)]
                           1 - x 
             ó 2x = 2-x ó 3x = 2 ó x = (2/3).  

Ex.13.(i)If a/b=3/4 and 8a+5b=22,then find the value of a.
(ii)if x/4-x-3/6=1,then find the value of x.

Sol. (i) (a/b)=3/4 Þb=(4/3) a.
\ 8a+5b=22 Þ 8a+5*(4/3) a=22 Þ 8a+(20/3) a=22
               Þ44a = 66 Þ a=(66/44)=3/2
(ii) (x /4)-((x-3)/6)=1Û (3x-2(x-3) )/12 = 1 Û 3x-2x+6=12 Û x=6.

Ex.14.If 2x+3y=34 and ((x + y)/y)=13/8,then find the value of 5y+7x.

Sol. The given equations are:
2x+3y=34 …(i) and, ((x + y) /y)=13/8 Þ 8x+8y=13y Þ 8x-5y=0 …(ii)
Multiplying (i) by 5,(ii) by 3 and adding, we get : 34x=170 or x=5.
Putting x=5 in (i), we get: y=8.
\ 5y+7x=((5*8)+(7*5))=40+35=75

Ex.15.If 2x+3y+z=55,x-y=4 and y - x + z=12,then what are the values of x , y and z?
  
Sol. The given equations are:
2x+3y+z=55 …(i); x + z - y=4 …(ii); y -x + z =12 …(iii)
Subtracting (ii) from (i), we get: x+4y=51  …(iv)
Subtracting (iii) from (i), we get: 3x+2y=43  …(v)
 Multiplying (v) by 2 and subtracting (iv) from it, we get: 5x=35 or x=7.
Putting x=7 in (iv), we get: 4y=44 or y=11.
Putting x=7,y=11 in (i), we get: z=8.

Ex.16.Find the value of (1-(1/3))(1-(1/4))(1-(1/5))….(1-(1/100)). 

Sol. Given expression = (2/3)*(3/4)*(4/5) *…….* (99/100) = 2/100 = 1/50.

Ex.17. Find the value of (1/(2*3))+(1/(3*4))+(1/(4*5))+(1/(5*6))+…..+ ((1/(9*10)).

Sol. Given expression=((1/2)-(1/3))+((1/3)-(1/4))+((1/4)-(1/5))+
((1/5)-(1/6))+….+ ((1/9)-(1/10))
=((1/2)-(1/10))=4/10 = 2/5.

Ex.18.Simplify: 9948/49  * 245.

Sol. Given expression = (100-1/49) * 245=(4899/49) * 245 = 4899 * 5=24495.

Ex.19.A board 7ft. 9 inches long is divided into 3 equal parts . What is the length of each part?

Sol. Length of board=7ft. 9 inches=(7*12+9)inches=93 inches.
\Length of each part = (93/3) inches = 31 inches = 2ft. 7 inches

                
20.A man divides Rs. Among 5 sons,4daughters and 2 nephews .If each daughter receives four times as much as each nephews and each son receives five times as much as each nephews ,how much does each  daughter receive?
Let the share of each nephews be Rs.x.
Then,share of each daughter=rs4x;share of each son=Rs.5x;
So,5*5x+4*4x+2*x=8600
25x+16x+2x=8600
=43x=8600
x=200;

21.A man spends 2/5 of his salary on house rent,3/10 of his salary on food and 1/8 of his salary on conveyence.if he has Rs.1400 left with him,find his expenditure on food and conveyence.
Part of salary left=1-(2/5+3/10+1/8)
Let the monthly salary be Rs.x
Then, 7/40 of x=1400
X=(1400*40/7)
=8600
Expenditure on food=Rs.(3/10*800)=Rs.2400
Expenditure on conveyence=Rs.(1/8*8000)=Rs.1000

22.A third of Arun’s marks in mathematics exeeds a half of his marks in english by 80.if he got 240 marks In two subjects together how many marks did he got inh english?
Let Arun’s marks in mathematics and english be x and y
Then 1/3x-1/2y=30
2x-3y=180……>(1)
x+y=240…….>(2)
solving (1) and (2)
x=180
and y=60

23.A tin of oil was 4/5full.when 6 bottles of oil were taken out and four bottles of oil were poured into it, it was ¾ full. how many bottles of oil can the tin contain?
Suppose x bottles can fill the tin completely
Then4/5x-3/4x=6-4
X/20=2
X=40
Therefore required no of bottles =40

24.if 1/8 of a pencil is black ½ of the remaining is white and the remaining 3 ½  is blue find the total length of the pencil?
 Let the total length be xm
Then black part =x/8cm
The remaining part=(x-x/8)cm=7x/8cm
White part=(1/2 *7x/8)=7x/16 cm
Remaining part=(7x/8-7x/16)=7x/16cm
7x/16=7/2
x=8cm

25.in a certain office 1/3 of the workers are women ½ of the women are married and 1/3 of the married women have children if ¾ of the men are married and 2/3 of the married men have children what part of workers are without children?
 Let the total no of workers be x
No of women =x/3
No of men =x-(x/3)=2x/3
No of women having  children =1/3 of ½ ofx/3=x/18
No of men having children=2/3 of ¾ of2x/3=x/3
No of workers having children = x/8 +x/3=7x/18
Workers having no children=x-7x/18=11x/18=11/18 of all wprkers


26.a crate of mangoes contains one bruised mango for every thirty mango in the crate. If three out of every four bruised mango are considerably unsaleble and there are 12 unsaleable mangoes in the crate then how msny mango are there in the crate?

Let the total no of mangoes in the crate be x
Then the no of bruised mango = 1/30 x
Let the no of unsalable mangoes =3/4 (1/30 x)
1/40 x =12
x=480

27. a train starts full of passengers at the first station it drops 1/3 of the passengers and takes 280more at the second station it drops one half the new total and takes twelve more .on arriving at the third station it is found to have 248 passengers. Find the no of passengers in the beginning?
Let no of passengers in the beginning be x
After first station no passengers=(x-x/3)+280=2x/3 +280
After second station no passengers =1/2(2x/3+280)+12
½(2x/3+280)+12=248
2x/3+280=2*236
2x/3=192
x=288

28.if a2+b2=177and ab=54 then find the value of a+b/a-b?
(a+b)2=a2+b2+2ab=117+2*24=225
a+b=15
(a-b)2=a2+b2-2ab=117-2*54
a-b=3
a+b/a-b=15/3=5

29.find the value of (75983*75983- 45983*45983/30000)
Given expression=(75983)2-(45983)2/(75983-45983)
=(a-b)2/(a-b)
=(a+b)(a-b)/(a-b)
=(a+b)
=75983+45983
=121966

30.find the value of 343*343*343-113*113*113
                                343*343+343*113+113*113
    
Given expression= (a3-b3)
                               a2+ab+b2
                            =(a-b)
=(343-113)
.=230

31.Village X has a population of 68000,which is decreasing at the rate of 1200 per year.VillagyY has a population  of 42000,which is increasing
at the rate of 800 per year .in how many years will the population of the two villages be equal?

Let the population of two villages be equal after  p years
Then,68000-1200p=42000+800p
2000p=26000
p=13

32.From a group of boys and girls,15 girls leave.There are then left 2 boys for each girl.After this,45 boys leave.There are then 5 girls for each boy.Find
the number of girls in the beginning?
Let at present there be x boys.
Then,no of girls at present=5x
Before the boys had left:no of boys=x+45
And no of girls=5x
X+45=2*5x
9x=45
x=5
no of girls in the beginning=25+15=40

33.An employer pays Rs.20 for each day a worker works and for feits Rs.3 for each day is ideal at the end of sixty days a worker gets Rs.280 . for how many days did the worker remain ideal?
Suppose a worker remained ideal for x days then he worked for 60-x days
20*(60-x)-3x=280
1200-23x=280
23x=920
x=40

Ex 34.kiran had 85 currency notes in all , some of which were of Rs.100 denaomination and the remaining of Rs.50 denomination the total amount of all these currency note was Rs.5000.how much amount did she have in the denomination of Rs.50?
Let  the no of fifty rupee notes be x
Then,no of 100 rupee notes =(85-x)
50x+100(85-x)=5000
x+2(85-x)=100
x=70
so,,required amount=Rs.(50*70)= Rs.3500


Ex. 35. When an amount was distributed among 14 boys, each of them got rs 80 more than the amount received by each boy when the same amount is distributed equally among 18 boys. What was the amount?
         Sol. Let the total amount be Rs. X the,
                           x   -   x          = 80 ó 2 x  = 80 ó x =63 x 80 = 5040.
                         14     18                        126              63
         Hence the total amount is 5040.

Ex. 36. Mr. Bhaskar is on tour and he has Rs. 360 for his expenses. If he exceeds his tour by 4 days, he must cut down his daily expenses by Rs. 3. for how many days is Mr. Bhaskar on tour?

         Sol. Suppose Mr. Bhaskar is on tour for x days. Then,
       360  - 360  = 3 ó  1   -    1    =    1     ó  x(x+4)  =4 x 120 =480
         x       x+4              x           x+4      120
     
        ó x2 +4x –480 = 0 ó (x+24) (x-20) = 0  ó x =20.
         Hence Mr. Bhaskar is on tour for 20 days.


Ex. 37. Two pens and three pencils cost Rs 86. four Pens and a pencil cost Rs. 112. find the cost of a pen and that of a pencil.

Sol. Let the cost of a pen ands a pencil be Rs. X and Rs. Y respectively.
                Then, 2x  + 3y = 86 ….(i) and 4x + y =112.
         Solving (i) and (ii), we get: x = 25 and y = 12.
         Cost of a pen =Rs. 25 and the cost of a pencil =Rs. 12.


Ex. 38. Arjun and Sajal are friends . each has some money. If Arun gives Rs. 30 to Sajal, the Sajal will have twice the money left with Arjun. But, if Sajal gives Rs. 10 to Arjun, the Arjun will have thrice as much as is left with Sajal. How much money does each have?
         Sol. Suppose Arun has Rs. X and Sjal has Rs. Y. then,
                2(x-30)= y+30  => 2x-y =90  …(i)
                          and  x +10 =3(y-10) => x-3y = - 40       …(ii)
                          Solving (i) and (ii), we get x =62 and y =34.
                          Arun has Rs. 62 and Sajal has Rs. 34.




Ex. 39. In a caravan, in addition to 50 hens there are 45 goats and 8 camels with some keepers. If the total number of feet be 224 more than the number of heads, find the number of keepers.
Sol. Let the number of keepers be x then,
         Total number of heads =(50 + 45 + 8 + x)= (103 + x).
         Total number of feet = (45 + 8) x 4 + (50 + x) x 2 =(312 +2x).
                          (312 + 2x)-(103 + x) =224ó x =15.
         Hence, number of keepers =15.




Quantative Aptitude (Decimal Fraction)

3. DECIMAL FRACTIONS

IMPORTANT FACTS AND FORMULAE


I.    Decimal Fractions : Fractions in which denominators are powers of 10 are known as decimal  fractions.  
                   Thus ,1/10=1 tenth=.1;1/100=1 hundredth =.01;
                    99/100=99 hundreths=.99;7/1000=7 thousandths=.007,etc
II.  Conversion of a Decimal Into Vulgar Fraction : Put 1 in the denominator under the decimal point and annex with it as many zeros as is the number of digits after the decimal point. Now, remove the decimal point and reduce the fraction to its lowest terms.

Thus, 0.25=25/100=1/4;2.008=2008/1000=251/125.
  
III.  1.  Annexing zeros to the extreme right of a decimal fraction does not change its value
            Thus, 0.8 = 0.80 = 0.800, etc.

2.  If numerator and denominator of a fraction contain the same number of decimal
     places, then we remove the decimal sign.
         Thus,   1.84/2.99 = 184/299 = 8/13;    0.365/0.584 = 365/584=5

IV.  Operations on Decimal Fractions :

1.  Addition and Subtraction of Decimal Fractions : The given numbers are so
placed under each other that the decimal points lie in one column. The numbers
so arranged can now be added or subtracted in the usual way.

2.  Multiplication of a Decimal Fraction By a Power of 10 : Shift the decimal
point to the right by as many places as is the power of 10.
Thus, 5.9632 x 100 = 596,32; 0.073 x 10000 = 0.0730 x 10000 = 730.

3.Multiplication of Decimal Fractions : Multiply the given numbers considering
them without the decimal point. Now, in the product, the decimal point is marked
off to obtain as many places of decimal as is the sum of the number of decimal
places in the given numbers.
Suppose we have to find the product (.2 x .02 x .002). Now, 2x2x2 = 8. Sum of decimal places = (1 + 2 + 3) = 6. .2 x .02 x .002 = .000008.

4.Dividing a Decimal Fraction By a Counting Number : Divide the given
number without considering the decimal point, by the given counting number.
Now, in the quotient, put the decimal point to give as many places of decimal as
there are in the dividend.
Suppose we have to find the quotient (0.0204 + 17). Now, 204 ^ 17 = 12. Dividend contains 4 places of decimal. So, 0.0204 + 17 = 0.0012.


5. Dividing a Decimal Fraction By a Decimal Fraction : Multiply both the dividend and the divisor by a suitable power of 10 to make divisor a whole number. Now, proceed as above.
Thus, 0.00066/0.11 = (0.00066*100)/(0.11*100) = (0.066/11) = 0.006V

V.  Comparison of Fractions : Suppose some fractions are to be arranged in ascending or descending order of magnitude. Then, convert each one of the given fractions in the decimal form, and arrange them accordingly.

Suppose, we have to arrange the fractions  3/5, 6/7 and 7/9  in descending order.

            now, 3/5=0.6,6/7 = 0.857,7/9 = 0.777....

            since  0.857>0.777...>0.6, so 6/7>7/9>3/5

VI. Recurring Decimal : If in a decimal fraction, a figure or a set of figures is repeated continuously, then such a number is called a recurring decimal.
In a recurring decimal, if a single figure is repeated, then it is expressed by putting a dot on it. If a set of figures is repeated, it is expressed by putting a bar on the set
                                                                                                 ______    
Thus 1/3 = 0.3333….= 0.3;  22 /7 = 3.142857142857.....= 3.142857
Pure Recurring Decimal: A decimal fraction in which all the figures after the decimal point are repeated, is called a pure recurring decimal.

Converting a Pure Recurring Decimal Into Vulgar Fraction : Write the repeated figures only once in the numerator and take as many nines in the denominator as is the number of repeating figures.

thus ,0.5 = 5/9;  0.53 = 53/59  ;0.067 = 67/999;etc...


Mixed Recurring Decimal: A decimal fraction in which some figures do not repeat and some of them are repeated, is called a mixed recurring decimal.
e.g., 0.17333 = 0.173.

Converting a Mixed Recurring Decimal Into Vulgar Fraction : In the numerator, take the difference between the number formed by all the digits after decimal point (taking repeated digits only once) and that formed by the digits which are not repeated, In the denominator, take the number formed by as many nines as there are repeating digits followed by as many zeros as is the number of non-repeating digits.

Thus 0.16 = (16-1) / 90 =  15/19 =  1/6;
                   ____
                0.2273 =  (2273 – 22)/9900 = 2251/9900


VII.  Some Basic Formulae :

1.   (a + b)(a- b) = (a2 - b2).
2.   (a + b)2 = (a2 + b2 + 2ab).
3.    (a - b)2 = (a2 + b2 - 2ab).
4.    (a + b+c)2 = a2 + b2 + c2+2(ab+bc+ca)
5.    (a3 + b3) = (a + b) (a2 - ab + b2)
6.    (a3 - b3) = (a - b) (a2 + ab + b2).
7.    (a3 + b3 + c3 - 3abc) = (a + b + c) (a2 + b2 + c2-ab-bc-ca)
8.    When   a + b + c = 0, then a3 + b3+ c3 = 3abc

SOLVED EXAMPLES

Ex. 1. Convert the following into vulgar fraction:
            (i) 0.75             (ii) 3.004          (iii)  0.0056

Sol. (i). 0.75 = 75/100 = 3/4    (ii) 3.004 = 3004/1000 = 751/250    (iii) 0.0056 = 56/10000 = 7/1250

Ex. 2. Arrange the fractions 5/8, 7/12, 13/16, 16/29 and 3/4 in ascending order of magnitude.

Sol. Converting each of the given fractions into decimal form, we get :
        5/8 = 0.624, 7/12 = 0.8125, 16/29 = 0.5517, and 3/4 = 0.75
        Now, 0.5517<0.5833<0.625<0.75<0.8125
        \ 16/29 < 7/12 < 5/8 < 3/4 < 13/16

Ex. 3. arrange the fractions 3/5, 4/7, 8/9, and 9/11 in their descending order.

Sol. Clearly, 3/5 = 0.6, 4/7 = 0.571, 8/9 = 0.88, 9/111 = 0.818.
        Now, 0.88 > 0.818 > 0.6 > 0.571
        \ 8/9 > 9/11 > 3/4 > 13/ 16

Ex. 4. Evaluate : (i) 6202.5 + 620.25 + 62.025 + 6.2025 + 0.62025

                             (ii) 5.064 + 3.98 + 0.7036 + 7.6 + 0.3 + 2

Sol.  (i)  6202.5                                                    (ii)  5.064
                620.25                                                         3.98
                  62.025                                                       0.7036
                    6.2025                                                     7.6
           + __  0.62025                                                   0.3
              6891.59775                                                 _2.0___
                                                                                  19.6476

Ex. 5. Evaluate : (i) 31.004 – 17.2368                       (ii) 13 – 5.1967

Sol.  (i)    31.0040                                                       (ii)   31.0000
             – 17.2386                                                            – _5.1967  
13.7654                                                                                                                                  7.8033  

Ex. 6. What value will replace the question mark in the following equations ?

(i)                 5172.49 + 378.352 + ? = 9318.678
(ii)               ? – 7328.96 + 5169.38

Sol.  (i) Let       5172.49 + 378.352 + x = 9318.678
                        Then , x = 9318.678 – (5172.49 + 378.352) = 9318.678 – 5550.842 = 3767.836
        (ii) Let      x – 7328.96 = 5169.38. Then, x = 5169.38 + 7328.96 = 12498.34.

Ex. 7. Find the products: (i) 6.3204 * 100               (ii) 0.069 * 10000


Sol.  (i) 6.3204 * 1000 = 632.04                     (ii) 0.069  * 10000 = 0.0690 * 10000 = 690

Ex. 8. Find the product:
            (i) 2.61 * 1.3                (ii) 2.1693 * 1.4           (iii) 0.4 * 0.04 * 0.004 * 40

Sol.  (i) 261 8 13 = 3393. Sum of decimal places of given numbers = (2+1) = 3.
             2.61 * 1.3 = 3.393.
        (ii) 21693 * 14 = 303702. Sum of decimal places = (4+1) = 5
              2.1693 * 1.4 = 3.03702.
       (iii) 4 * 4 * 4 * 40 = 2560. Sum of decimal places = (1 + 2+ 3) = 6
              0.4 * 0.04 * 0.004 * 40 = 0.002560.

Ex. 9. Given that 268 * 74 = 19832, find the values of 2.68 * 0.74.

Sol.  Sum of decimal places = (2 + 2) = 4
         2.68 * 0.74 = 1.9832.

Ex. 10. Find the quotient:
            (i) 0.63 / 9                    (ii) 0.0204 / 17                         (iii) 3.1603 / 13           

Sol.  (i) 63 / 9 = 7. Dividend contains 2 places decimal.
             0.63 / 9 = 0.7.
        (ii) 204 / 17 = 12. Dividend contains 4 places of decimal.
              0.2040 / 17  = 0.0012.
        (iii) 31603 / 13 = 2431. Dividend contains 4 places of decimal.
               3.1603 / 13 = 0.2431.

Ex. 11. Evaluate :
            (i) 35 + 0.07                            (ii) 2.5 + 0.0005
(iii)             136.09 + 43.9

Sol. (i) 35/0.07 = ( 35*100) / (0.07*100) = (3500 / 7) = 500
      (ii) 25/0.0005 = (25*10000) / (0.0005*10000) = 25000 / 5 = 5000
     (iii) 136.09/43.9 = (136.09*10) / (43.9*10) = 1360.9 / 439 = 3.1

Ex. 12. What value will come in place of question mark in the following equation?

            (i) 0.006 +? = 0.6                    (ii) ? + 0.025 = 80

Sol.  (i) Let 0.006 / x = 0.6, Then, x = (0.006 / 0.6) = (0.006*10) / (0.6*10) = 0.06/6 = 0.01
        (ii) Let x / 0.025 = 80, Then, x = 80 * 0.025 = 2           

Ex. 13. If (1 / 3.718) = 0.2689, Then find the value of (1 / 0.0003718).

Sol.  (1 / 0.0003718 ) = ( 10000 / 3.718 ) =  10000 * (1 / 3.718) = 10000 * 0.2689 = 2689.

                                                                                       ___                ______                  

Ex. 14. Express as vulgar fractions : (i) 0.37    (ii) 0.053     (iii)  3.142857

                __                                                  ___
Sol. (i)  0.37 = 37 / 99 .                       (ii)  0.053 = 53 / 999
                  ______             ______ 
        (iii) 3.142857 = 3 + 0.142857 = 3 + (142857 / 999999) = 3 (142857/999999)
                                                                        _                       __                      _

Ex. 15. Express as vulgar fractions : (i) 0.17           (ii) 0.1254        (iii)  2.536

                _
Sol. (i) 0.17 = (17 – 1)/90 = 16 / 90 =  8/ 45
                    __
       (ii) 0.1254 = (1254 – 12 )/ 9900 = 1242 / 9900 = 69 / 550

      (iii)  2.536 = 2 + 0.536 = 2 + (536 – 53)/900 = 2 + (483/900) = 2 + (161/300) = 2 (161/300)

Ex. 16. Simplify:  0.05 * 0.05 * 0.05 + 0.04 * 0.04 * 0.04
                               0.05 * 0.05 – 0.05 * 0.04 + 0.04 * 0.04

Sol. Given expression  = (a3 + b3) / (a2 – ab + b2), where a = 0.05 , b = 0.04

                                     = (a +b ) = (0.05 +0.04 ) =0.09