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Test: Ratio and Proportion- 2 - CLAT MCQ


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20 Questions MCQ Test Quantitative Techniques for CLAT - Test: Ratio and Proportion- 2

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Test: Ratio and Proportion- 2 - Question 1

An amount of money is to be divided between P, Q and R in the ratio of 3:7:12.If the difference between the shares of P and Q is Rs.X, and the difference between Q and R’s share is Rs.3000. Find the total amount of money?

Detailed Solution for Test: Ratio and Proportion- 2 - Question 1

To find the total amount of money divided between P, Q, and R in the ratio of 3:7:12:
Given:

  • Let k be the common multiplier.
  • P's share = 3k
  • Q's share = 7k
  • R's share = 12k

Equations:

  1. Difference between Q and P:
    7k - 3k = 4k = X
  2. Difference between Q and R:
    12k - 7k = 5k = 3000

Solve for k:
k = 3000 / 5 = 600

Calculate Shares:

  • P's share = 3k = 1800
  • Q's share = 7k = 4200
  • R's share = 12k = 7200

Total Amount:
Total = 1800 + 4200 + 7200 = 13200

Test: Ratio and Proportion- 2 - Question 2

If a certain amount X is divided among A, B, C in such a way that A gets 2/3 of what B gets and B gets 1/3 of what C gets, which of the following is true

Detailed Solution for Test: Ratio and Proportion- 2 - Question 2
  • A= (2/3) x B; B= (1/3) x C;
  • Therefore , A/B = 2/3 and B/C = 1/3
  • A:B = 2:3 ; B:C = 1:3;
  • A:B:C = 2:3:9
  • C = 9/14 x 1638 = 1053
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Test: Ratio and Proportion- 2 - Question 3

Seats for Mathematics, Science and arts in a school are in the ratio 5:7:8. There is a proposal to increase these seats by X%, Y% and Z% respectively. And the ratio of increased seats is 2:3:4, which of the following is true?

Detailed Solution for Test: Ratio and Proportion- 2 - Question 3
  • Ans– C 
  • For solving this question we need to use a hit and trial method 
  • As we approached option c, X = 40; Z = 75
  •  Number of increased seats are (140% of 5x), (150% of 7x) and (175% of 8x)
  • i.e., (140/100 * 5x), (150/100 * 7x) and (175/100 * 8x)
  • i.e., 7x, 21x/2 and 14x
  • Required ratio = 7x : 21x/2 : 14x
  • = 14x : 21x : 28x
  • = 2 : 3 : 4
Test: Ratio and Proportion- 2 - Question 4

A company manufactures three products: A, B, and C. The production ratio of A, B, and C is 3:5:7. The total production of these three products together in a month is 30,000 units. How many units of each product were produced?

Detailed Solution for Test: Ratio and Proportion- 2 - Question 4


The given ratio is:
A : B : C = 3 : 5 : 7
Let the common factor be x. Thus, the production units will be:
A = 3x
B = 5x
C = 7x
We are also given that the total production is 30,000 units. So:
3x + 5x + 7x = 30,000
15x = 30,000
x = 2,000
Now, substitute x = 2,000 into the expressions for each product:
A's production = 3 × 2,000 = 6,000 units
B's production = 5 × 2,000 = 10,000 units
C's production = 7 × 2,000 = 14,000 units
So, the production for A, B, and C is:
A = 6,000 units
B = 10,000 units
C = 14,000 units

Final Answer:
Initial production:
A = 6,000 units, B = 10,000 units, C = 14,000 units

 

Test: Ratio and Proportion- 2 - Question 5

Two candles of the same height are lighted at the same time. The first is consumed in 4 hours and the second in 3 hours. Assuming that each candle burns at a constant rate, in how many hours after being lighted was the first candle twice the height of the second?

Detailed Solution for Test: Ratio and Proportion- 2 - Question 5

Test: Ratio and Proportion- 2 - Question 6

If A and B together have a certain amount X and if 4/15 of A’s amount is equal to 2/5 of B’s amount, which of the following is true?

Detailed Solution for Test: Ratio and Proportion- 2 - Question 6

Answer – C.A = 1767; X = 2945
Explanation : 4/15 * A = 2/5 * B
A= 3/2 B;
A:B = 3:2;
check which option have 3:5 with X
A = 3/5 X
A = 3/5 x 2945
A = 1767
 

Test: Ratio and Proportion- 2 - Question 7

A sum of Rs.4880 was divided among boys and girls in such a way that each boy gets Rs.44.50 and each girl get Rs. 55.25. If the total number of girls and boys is 100, find the number of girls?

Detailed Solution for Test: Ratio and Proportion- 2 - Question 7

Answer – C.40
Explanation : x+y=100 ————– (i)
44.50x + 55.25y = 4880 ————– (ii)
Solving (i) and (ii) Y = 40

Test: Ratio and Proportion- 2 - Question 8

The income of Vinay and Prakash are in the ratio of 4:5 and their expenditure is in the ratio of 2:3. If each of them saves 5000, then find their income.

Detailed Solution for Test: Ratio and Proportion- 2 - Question 8

4x – 2y = 5000 and 5x – 3y = 5000.
X = 2500, so income = 10000 and 12500.

Test: Ratio and Proportion- 2 - Question 9

If the ratio of the first to second is 2:3 and that of the second to the third is 5: 8, then which of the following is true,

Detailed Solution for Test: Ratio and Proportion- 2 - Question 9

Answer – D.Sum = 98; B = 30 Explanation : A:B:C = 10:15:24
If sum = 98, B = 15/49 * 98 = 30

Test: Ratio and Proportion- 2 - Question 10

The ratio of boys to girls in a class is 3:2. If 10 more girls join the class, the ratio becomes 34. How many boys are there in the class?

Detailed Solution for Test: Ratio and Proportion- 2 - Question 10
  • Let the number of boys = 3x and the number of girls = 2x.
  • After adding 10 girls, the new ratio becomes:
  • 3x/(2x + 10) = 3/4
  • Cross-multiply:
  • 4 × 3x = 3 × (2x + 10)
  • 12x - 6x = 30
  • 6x = 30
  • x = 5
  • No of boys = 5x = 5 * 5 = 25 boys
Test: Ratio and Proportion- 2 - Question 11

 In a school the number of boys and girls are in the ratio of 4:7. If the number of boys are increased by 25% and the number of girls are increased by 15%. What will be the new ratio of number of boys to that of girls?

Detailed Solution for Test: Ratio and Proportion- 2 - Question 11

Answer – c) 100:161
Explanation : Boys = 4x and girls = 7x
Ratio = 4x*125/100 : 7x*115/100
= 100:161

Test: Ratio and Proportion- 2 - Question 12

When 40% percent of a number is added to another number the second number increases to its 20%. What is the ratio between the first and second number?

Detailed Solution for Test: Ratio and Proportion- 2 - Question 12

Answer – b) 1:2
Explanation :
(40/100)*a + b = (120/100)*b
a:b = 1:2

Test: Ratio and Proportion- 2 - Question 13

Two alloys contain zinc and copper in the ratio 5:3 and 7:9, respectively. In what ratio should these two alloys be mixed to form a new alloy with zinc and copper in the ratio 3:2 ?

Detailed Solution for Test: Ratio and Proportion- 2 - Question 13
  • We use the allegation method here.
  • Zinc content in the first alloy: 5/8
  • Zinc content in the second alloy: 7/16
  • Desired ratio of zinc to copper: 3/5
  • Using the allegation method:
  • 5/8 − 3/5 : 3/5 − 7/16
  • Simplify:
  • (25 − 24)/40 = 1/40
  • (48 − 35)/80 = 13/80
  • Therefore, the required ratio is:
  • 2:13
Test: Ratio and Proportion- 2 - Question 14

Two candles of same height are lighted at the same time. The first is consumed in 6 hours and second in 4 hours. Assuming that each candles burns at a constant rate, in how many hours after being lighted, the ratio between the first and second candles becomes 2:1?

Detailed Solution for Test: Ratio and Proportion- 2 - Question 14
  • Let height of both candles is ‘h’
  • let after t times ratio between the height be h – t*(h/6) : h – t*(h/4) = 2:1
  • On solvoong we get
  • t = 3 hour
Test: Ratio and Proportion- 2 - Question 15

An employer reduces the number of his employees in the ratio of 7:4 and increases their wages in the ratio 3:5. State whether his bill of total wages increases or decreases and in what ratio.

Detailed Solution for Test: Ratio and Proportion- 2 - Question 15
  • Answer – b) decreases 21:20
  • Explanation :
  • Let initial employees be 7x and then 4x
  • similarly initial wages be 3y and then 5y
  • so total wage = 21xy initially and then 20xy
  • so wages decreases and ratio = 21:20
Test: Ratio and Proportion- 2 - Question 16

A vessel contains milk and water in the ratio of 4:3. If 14 litres of the mixture is drawn and filled with water, the ratio changes to 3:4.  How much milk was there in the vessel initially?

Detailed Solution for Test: Ratio and Proportion- 2 - Question 16
  • Answer – b) 32
  • Explanation :
  • milk = 4x and water = 3x
  • milk = 4x – 14*4/7 and water = 3x – 14*3/7 + 14
  • 4x – 8: 3x + 8 = 3:4
  • X = 8,
  • so milk = 8*4 = 32 litres
Test: Ratio and Proportion- 2 - Question 17

The ratio of two numbers is 3:4. If 3 is subtracted from both the numbers, the ratio becomes 1:2. Find the sum of the two numbers?

Detailed Solution for Test: Ratio and Proportion- 2 - Question 17
  • Answer – b) 10.5
  • Explanation :
  • (3x – 3)/(4x – 3) = 1/2
  • x = 1.5
  • sum of the numbers = 3x + 4x = 7x = 7 * 1.5 = 10.5
Test: Ratio and Proportion- 2 - Question 18

The sum of three numbers is 210. If the ratio between the first and second number be 2:3 and that between the second and third be 4:5, then the difference between the first and third number?

Detailed Solution for Test: Ratio and Proportion- 2 - Question 18

Answer – c) 42
Explanation :

  • a: b = 2:3 and b:c = 4:5
  • a:b:c = 8:12:15
  • Difference between first and third number  = (7/35)*210 = 42
Test: Ratio and Proportion- 2 - Question 19

A bag contains 25 paise and 50 paise coins. If the total number of coins is 70 and the total sum amounts to Rs.30, find the number of coins of 25 paise.

Detailed Solution for Test: Ratio and Proportion- 2 - Question 19
  • The correct option is B 20
  • Let number of 25 paise coins be x and 50 paise be y.
  • x + y = 70…(i)
    25x + 50y = 3000…(ii)
  • On multiplying (i) by 25 and (ii) by 1, we get
  • 25x + 25y = 1750
    25x + 50y = 3000
    (i) - (ii) ⇒
  • − 25y = − 1250
  • or y=125025=50
  • On substituting value of y in (i)
  • x + 50 = 70
  • or x = 70 – 50 = 20

    ∴ Number of 25 paise coins is 20 and 50 paise coins is 50.

Test: Ratio and Proportion- 2 - Question 20

The income of Neha and Hitesh are in the ratio of 4:5 and their expenditure is in the ratio of 2:3. If each of them saves 2000, then find their income.

Detailed Solution for Test: Ratio and Proportion- 2 - Question 20

Answer – b) 4000, 5000
Explanation :

  • 4x – 2y = 2000 and 5x – 3y = 2000.
  • On solving both the equations, we get
  • x = 1000,
  • so income =4x and 5x =  4000 and 5000
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