Percentage MCQ Quiz - Objective Question with Answer for Percentage - Download Free PDF

Given:

Price increase of honey = 15%

Formula Used:

Let the original price be P and the reduced consumption be C.

New price = P + 0.15P = 1.15P

To keep the expense the same: P × C = 1.15P × (1 - x)

where x is the percentage reduction in consumption.

Calculation:

P × C = 1.15P × (1 - x)

⇒ C = 1.15 × (1 - x)

Since expense is not increased, C = 1

⇒ 1 = 1.15 × (1 - x)

⇒ 1 = 1.15 - 1.15x

⇒ 1.15x = 1.15 - 1

⇒ 1.15x = 0.15

⇒ x = 0.15 / 1.15

⇒ x = 0.1304

⇒ x ≈ 13%

The correct answer is option 2.

Given:

Total students = 25

Percentage of good students = 72%

Formula used:

Number of good students = (Percentage of good students / 100) × Total students

Number of bad students = Total students - Number of good students

Calculations:

Number of good students = (72 / 100) × 25

⇒ Number of good students = 18

Number of bad students = 25 - 18

⇒ Number of bad students = 7

∴ The correct answer is option (4).

Let:

Total amount of money Ravi has = M

Price of 1 pen = P

Price of 1 notebook = N

From the problem:

Ravi can buy 40 pens or 20 notebooks with M.

M = 40P = 20N

N = 2P

Ravi saves 25% of his money for other expenses:

Savings = 0.25M

Remaining money = M - 0.25M = 0.75M

Price of 1 notebook = N = 2P

Cost of 4 notebooks = 4N = 4 × 2P = 8P

Remaining money after buying 4 notebooks:

Remaining money for pens = 0.75M - 8P

Substitute M = 40P:

Remaining money for pens = 0.75 × 40P - 8P = 30P - 8P = 22P

Price of 1 pen = P
Number of pens Ravi can buy = 22P / P = 22

Initial number of pens Ravi could buy = 40

Number of pens he can now buy = 22

Percentage of initial pens:

Percentage = 22 / 40 × 100 = 55%

Ravi can now purchase 55% of the initial number of pens he could have bought.

Given:

Aman purchased 320 shares

Face value of each share = Rs. 200

Purchase value of each share = Rs. 1000

Dividend = 30%

Concept used:

Return% = (Total dividend paid)/(Total amount paid on shares) × 100

Calculation:

Dividend on each share = 200 × 30/100 = 60

Total dividend = 320 × 60 = 19200

Total amount paid for share = 320 × 1000 = 320000

So,

Return = (19200/320000) × 100

⇒ 6%

∴ Aman's returns on the investment made is 6%

Compare A, B, and C.

\( A = B \left(1 + \frac{p}{100} \right) \)

\( B = C \left(1 - \frac{p-10}{100} \right) \)

\( C = B / \left(1 - \frac{p-10}{100} \right) \)

Since \( A > C \), we have:

\( B \left(1 + \frac{p}{100} \right) > B / \left(1 - \frac{p-10}{100} \right) \)

\( 1 + \frac{p}{100} > \frac{100}{100 - (p-10)} \)

\( \frac{100 + p}{100} > \frac{100}{110 - p} \)

Multiplying both sides:

\( (100 + p)(110 - p) > 100 \times 100 \)

\( 11000 + 110p - 100p - p^2 > 10000 \)

\( 1000 + 10p - p^2 > 0 \)

\( p^2 - 10p - 1000 < 0 \)

Completing the square:

\( p^2 - 10p + 25 < 1000 + 25 \)

\( (p - 5)^2 < 1025 \)

\( p - 5 < 32 \)

\( p < 37 \)

Thus, the possible range of \( p \) is from \( 10\% \) to \( 37\% \).

Hence, the answer is 10% to 37%.

Given:

Valid votes = 75% of total votes

Winning Candidate = 70% of Valid votes

He won by a majority of 3630 votes

Losing Candidate = 30% of Valid votes

Calculation:

Let 100x be the total number of votes polled

Valid votes = 75% of total votes

= 0.75 × 100x

= 75x

Majority of the Winning Candidate is 3630

Then, Difference between Winning and Losing Candidate = (70 % - 30 %) of valid votes

= 40% of the valid votes

Valid Votes = 75x

Then,

= 0.40 × 75x

= 30x

Hence, 30x is Majority of winning candidate

30x = 3630

x = 121

Total number of votes is 100x

= 100 × 121

= 12100

Answer is 12100.

GIVEN :

If the price of petrol has increased from Rs. 40 per litre to Rs. 60 per litre

CALCULATION :

Let the consumption be 100 litres.

When price is Rs. 40 per litres, then, the expenditure = 100 × 40

⇒ Rs. 4,000.

At Rs. 60 per litre, the 60 × consumption = 4000

Consumption = 4,000/60 = 66.67 litres.

∴ Required decreased % = 100 - 66.67 = 33.33%

Calculation:

Let the initial oranges with the fruit seller be x.

1st selling = 0.45x + 1

Remaining = x - (0.45x + 1) = 0.55x - 1

2nd selling = \(1\over 5\) × (0.55x - 1) = 0.11x - 0.2 + 2 = 0.11x + 1.8

Remaining after second selling = 0.55x - 1 - (0.11x + 1.8) = 0.55x - 0.11x - 1 - 1.8 = 0.44x - 2.8

3rd selling = 90% × (0.44x - 2.8)

Remaining after 3rd selling = 0.1 × (0.44x - 2.8) = 0.044x - 0.28

According to the question-

⇒ 0.044x - 0.28 = 5

⇒ 0.044x = 5.28

⇒ x = \(5.28\over 0.044\) = 120

∴ The number of oranges was 120. 

Alternate Method

At last, he sells 90% of the remaining oranges after selling the oranges to a second customer, then he has 10% of the remaining oranges.

10% of the remaining oranges after selling the oranges to the second customer = 5

So remaining oranges after selling the oranges to the second customer = 100% of the remaining oranges after selling the oranges to the second customer = 50 oranges

He gave 2 extra oranges to the second customer, so the remaining oranges = 50 + 2

He sells 20% of the remaining oranges to the second customer, so he has 80% of the remaining oranges = 52

100% of remaining oranges after selling the oranges to the first customer = (52/4) * 5 = 65 oranges

He gave 1 extra orange to the first customer, so the total oranges after selling 45% of the oranges = 65 + 1 = 66 oranges

(100% - 45% = 55%) of total oranges = 66

so

100% of oranges = (66/55) * 100 = 120 oranges

GIVEN :

The price of wheat is reduced by 4%.

ASSUMPTION :

Let the price of wheat be Rs.100/kg.

CALCULATION :

The price of 48 kg wheat  = 4800

As price is reduce by 4% it means that it became 96% of initial 100% hence,

After price decrease = 4800/96 = 50 kg

Hence, the required quantity of wheat = (50 – 48) = 2 kg more.

Given:

2% of voters did not cast their votes

Invalid votes = 500

The winner got 200 votes more than his opponent and he secured 43%

Calculation:

Let the total number of voters in the voting list be x

Total votes = (100 - 2)x/100 = 98x/100 = 0.98x

Total valid votes = 0.98x - 500

Number of votes loser got = 0.43x - 200

Total valid votes are:

⇒ 0.43x + 0.43x - 200 = 0.98x - 500

⇒ 0.86x - 200 = 0.98x - 500

⇒ 0.98x - 0.86x = 300

⇒ x = 2500

∴ The number of total casted votes = 2500 × (100 - 2)%

⇒ 2450

The number of total casted votes is 2450.

Given:

Initial population of a town is 5500

Final population of a town is 6000

Male population increased by 5%

Female population increased by 10%

Calculation:

Let the number of males = x 

Number of females = (5500 - x)

According to the question,

⇒ Total Final population = Males + Females

⇒ 6000 = (x × 105) /100 + (5500 - x) × 110 /100

⇒ 6,00,000 = 105x  + ( 5500 × 110 - 110x )

⇒ 6,00,000 = 105x +  6,05,000 - 110x

⇒ 6,00,000 = 6,05,000 - 5x

⇒ -5x = - 5000 

⇒ x = 1000

∴ The number of men in the town is 1000.

Shortcut Trick 

Calculation:

The price of an umbrella decreased by 20%. [20% can be written as 1/5]

Let the initial price be = 5x.

After 20% decrease = 4x

Sales is increase by 40% [40% can be written as 2/5]

Let the initial sale be = 5x

After 40% increase = 7x

The ratio of the cost price and selling price = 25x:28x = 25:28

The net effect on revenue [net profit%] = \(\frac{{\left( {28 - 25} \right)}}{{25}} \times 100\)

⇒ 12% increase.

Hence, the correct answer is 12% increase.

Given:

Average is 280.

Formula used:

Average = sum of the observation/number of the observation     

Calculation:

Let the number be x

According to the question,

⇒ (x + 50% of x + 25% of x) / 3 = 280

⇒ (x + x/2 + x/4)/3 = 280

⇒ 7x/12 = 280

⇒ x =  480

∴ The number is 480.

Given:

There were two candidates in an election, 10% of voters did not vote and 48 votes were found invalid. The winning candidate got 53% of the total votes and won by 304 votes.

Concept used:

Percentage

Calculation:

Let the total number of voters be 100x

10% of voters did not vote 

Number of voters who vote = 100x - 10x = 90x

48 votes were found invalid

Valid votes = 90x - 48

Votes gained by the winning candidate = \(\frac{{53}}{{100}} \times 100x = 53x\)

Votes gained by the loosing candidate = 90x - 48 - 53x

⇒ 37x - 48

As per the question,

⇒ 53x - (37x - 48) = 304

⇒ 16x = 304 - 48

⇒ 16x = 256

⇒ x = 16

∴ Total number of voters = 100x = 1600

Alternate Method 

Let total number of votes be 100 units,

10% voters did not cast their vote

⇒ Votes polled = 90 units

The winning candidate got 53% of all the voters in the list and won by 304 votes,

⇒ Winning candidate got = 53 units votes

⇒ Other candidate got = 37 units votes

⇒ Difference in votes = 53 units votes - 37 units votes = 304 - 48 = 256 votes

⇒ 16 units = 256

∴ 100 units votes = 256/16 × 100 = 1600 votes

∴ Total number of voters = 1600.

Calculation:

Quantity of sugar in solution = 800 × (40/100) = 320 gm

Let the quantity of sugar added be x gm.

According to the question

⇒ (320 + x)/(800 + x) = 60/100

⇒ (320 + x)/(800 + x) = 3/5

⇒ (320 + x) × 5 = 3 × (800 + x)

⇒ 1600 + 5x = 2400 + 3x

⇒ 5x – 3x = 2400 – 1600

⇒ x = 400 gm

Shortcut Trick 

40%        100%

        60%

    40 : 20

      2 : 1

2 unit = 800 g

1 unit = 400 g