•   Let the total number of votes = V.

•   As per the condition given in question,

•   Number of votes that were casted = 80 × V / 100 = 0.8 × V

•   Numbers of votes received by X = 56 × 0.8 × V / 100.

•   Percentage of the votes candidate Y got = 100- 56 = 44%   

•   Given that, X votes – Y votes = 1440

•   Thus, 80V/100 (56-44)/100 = 1440

•   0.8 × 0.12 × V = 1440

•   V = 12,000/0.8

•   Total votes V =15,000.

•   Let total number of students in the class be 100.

•   Indian students = 60% of 100 = 60.

•   So, foreign students = 100 – 60 = 40 students.

•   Total number of girls students = 50% of 100 = 50.

•   Total number of Indian girl students = 30% of 60 = 18 students.

•   So, foreign girl students = 50 – 18 = 32.

•   As total foreign students = 40.

•   So, foreign boy students = 40 – 32 = 8.

•   So, percentage of boys among foreign students = (8/40) × 100 = 20%.

•   Hence, option (d) is the correct answer.

•   Let total marks in each subject be 100.

•   Therefore, total marks for all 6 subjects = 600

•   Overall marks scored = 60% of 600 = 360

•   Given Ratio of marks= 5:6:7:8:9:10.

•   Now 5x+6x+7x+8x+9x+10x= 360.

•   Then x= 360/45= 8

•   Now marks in different subjects are- 40; 48; 56; 64; 72; 80.

•   Hence, in 3 subjects the student has scored less than 60% marks.

•   Given: 50 percent villagers have their own houses.

•   20 percent of the villagers cultivate paddy.

•   33.33 percent of the villagers are literate.

•   80 percent of the villagers are below twenty-five.

•   If we take literate villagers on one side, then there will be at least 13.33 of the villagers who must be below twenty-five as there are 80% villagers are below twenty-five.

•   Hence, at least 13.33 percent literate villagers must be below twenty-five.

•   P scored 40 marks more than Q.

•   If we take marks of Q as ‘q’ then marks of P= q + 40.

•   Q scored 10% less marks than P i.e., q = 90% of P.

•   Then, q= (90/100)* (q - 40).

•   Or 10q = 9q + 360

•   So, q = 360.

•   So, Q scored 360 marks.

•  Let CP be Rs. x

SP of car = Rs 3,00,000; Loss percent = 20%

∴  80% of x = 300000

Or  x = 300000 × (100/80) 

Or  x = Rs. 3,75,000

Number of married men and women must be equal.

So, 40% of men = 30% of women

Let there be 300 men and 400 women in the city. Hence, there are a total of 700 adults.

Number of married men = 40% of 300 = 120

Number of married women = 30% of 400 = 120

So, Number of married adults = 120 + 120 = 240

Percentage of married adults in the population = (240 / 700) × 100 = 34 2/7 %

•  Let the weight of A be 100 kg.

•  So, the combined weight of A + B will 160 kg. Out of this 160 kg, 60 kg is reduced now.

•  60 of 160 gives 60×100/160 = 37.5%.

•  In this question Rs. 9000 is 75% of the cost of mobile phone.

•  So total cost of mobile phone is Rs. 12000 ( = 9000 / 0.75).

•  Now, as he borrows Rs. 2000, he will be still short of Rs.1000 to buy the phone.

Those who went for either or both 100%-10%(those who took rest)= 90%

Who went for sightseeing and shopping both 80%+50%-90%= 40%

Members who went only for shopping = 80% - 40% = 40%

40% members went for shopping as well as sightseeing. Thus statement 1 is correct.

•  We check with options directly.

•  Start with (a). If B is 360, A will be 380. Now, 5% of 380 = 19. So B will become 380 – 19 = 361. Hence this option is wrong (B is 360, not 361).

•  If B is 380, A will be 400. Now, 5% of 400 = 20. So B will be 400 – 20 = 380. Hence (b) is correct.

•   Let maximum marks in the examination be x.

•   Pass marks = 40% of x

•   After getting 30 marks, the student fails by 30 marks. So, passing marks are 60.

•   40% of x = 60

•   x = 150

•   According to the question, P = (40% of A) + (65% of B) and

Q = (50% of A) + (50% of B), where A > B

•   Now, P – Q = (40% of A) + (65% of B) - (50% of A) - (50% of B) = (15% of B) - (10% of A)

•   As the numerical values of A and B will diverge, the answers will start to change from initial assumptions.

•   Hence, nothing can be said about the relation between P and Q.

According to the question:

•   Total households are 100%, then if 12% are below Rs.30000, X % are between 30,000 and 1,00,000, and 22% are above 1,00,000.

•   So, we get : 12 + X + 22 = 100 => X = 66%. This 66% is given to us as 990 households.

•   So the total population = (990 x 100) / 66 = 1500 households.

•   Now 22% of 1500 are above Rs.1,00,000.

•   But 6% are above Rs.2,00,000.

•   So households between Rs.1,00,000 and Rs.2,00,000 are 16% of 1500 ( = 22% - 6%), which is 240.

•   Let every question carry 1 mark. So total number of marks is 70.

•   Therefore passing marks = 60% of 70 = 42 marks.

•   Anita answered 70% of Arithmetic (10 Q) = 7

•   40% of Algebra (30 Q) = 12

•   60% of Geometry (30 Q) = 18

•   So, Anita's total marks = 7 + 12 +18 = 37 marks which is 5 short of 42.

•   So 5 more marks are required to pass the exam.

•   Let third number Z be 100.

•   Therefore X will be 80 & Y will be 72.

•   Hence Y is 10% less than X. Hence, answer is (b)

Let marks of each question be 10 Then, total marks got by the students = 8 x 5 = 40 marks

40% = 40 ; 100% = 100

⸫ Total number of questions = 100 / 10 =10

Ans: (c) According to the venn diagram,

Given, d + g = 30%, e + g = 15%, f + g = 25%, g =10%

On solving, we get d = 20%, e = 5% and f = 15%

⸫   a = A - (d + f + g) = 0%

b = B - (d + e + g) = 20%

and  c = C - (e + f + g) = 10%

⸫  Percentage of those who do not read any magazine (n)

= Total percentage - (a + b + c + d + e + f + g) 

= 100 - (0 + 20 + 10 + 20 + 5 + 15 + 10) = 20%

Let there are 100 persons in which 60 are men and 40 are women.

⸫ Number of men who cleared the qualifying test = 70 x 60 / 100 = 42

Number of women who cleared the qualifying test = 40 x 3 / 4 = 30

Number of men who get success in final test = 42 x 4 / 5 = 33.6

Number of women who get success in final test = 30 x 70 / 100 = 21

Hence, more men cleared the examination than women.

Let the fair of bus for two passengers be Rs. x.

Now, A has Rs. 10, i.e. 80% of total fair.

⸫  80% of x = 10

]  =

⸫  = Rs.12 5

Now, B has given Rs.3

Now, total amount A has = 10 + 3 = Rs.13

Money left after purchasing 2 tickets = 13 - 12.5 = Rs.0.5 = 50 paise

⸫  After buying the two tickets, A will be left with 50 paise. Hence, option (c) is correct.

In this question, the loan is refunded with equal instalment and without interest.

Initially the man had to pay x instalments.

Now, after paying 18 instalments 60% of loan is refunded.

⸫  60% of x = 18

]   = 18

⸫ 

⸫  There were 30 instalments in the agreement. Hence, option (c) is correct

If 60% play cricket, and 30% play football then total percentage that plays both = 60 + 30 = 90% But out of these, 10% that play both need to be subtracted as they are counted twice. So, 80% play both. Those who play neither will be 100-80 = 20%.

70% males, so 30% females. If 2/7th of males are married, this means 2/7 (70 %) = 20% males are married. So, 10% females are married (out of 30% total married). So, single females will be 20% out of total 30% females. The fraction is 2/3.