Question

Match List I with List II.
The following table embodies the details about the enrollment of students in five different activities namely Swimming, Singing, Drawing, Dancing and Handicraft in a School during the session 2020‐21. A total number of 3000 students including 1750 girls have been enrolled in various activities in the school. Based on the data in the table, match the following: 
Activity‐wise Enrollment of Students

Activity	Percentage (%) of students enrolled (Out of 3000)	Percentage (%) of Girls enrolled (Out of 1750)
Swimming	16%	14%
Singing	21%	28%
Drawing	14%	16%
Dancing	24%	20%
Handicraft	25%	22%

List I		List II
A	Boys enrolled in Singing and Handicraft taken together.	I	735
B	Girls enrolled in Swimming and Drawing taken together	II	525
C	Girls enrolled in Singing and Drawing taken together	III	505
D	Girls enrolled in Dancing and Handicraft taken together	IV	770

 

 

 

 

 

 

 

 

 

 

 

 

 

Choose the correct answer from the options given below:

• A. (A)‐(II), (B)‐(III), (C)‐(IV), (D)‐(I)
• B. (A)‐(I), (B)‐(IV), (C)‐(III), (D)‐(II)
• C. (A)‐(IV), (B)‐(III), (C)‐(II), (D)‐(I)
• D. (A)‐(III), (B)‐(II), (C)‐(IV), (D)‐(I)

Answer 1

The Correct Option is D

To solve this problem, we need to calculate the number of boys and girls enrolled in each activity based on the given percentages and then match the calculated figures with the correct options.

1. Calculate students enrolled in each activity:
   • Swimming: 16% of 3000 = 0.16 \times 3000 = 480
   • Singing: 21% of 3000 = 0.21 \times 3000 = 630
   • Drawing: 14% of 3000 = 0.14 \times 3000 = 420
   • Dancing: 24% of 3000 = 0.24 \times 3000 = 720
   • Handicraft: 25% of 3000 = 0.25 \times 3000 = 750
2. Calculate girls enrolled in each activity:
   • Swimming: 14% of 1750 = 0.14 \times 1750 = 245
   • Singing: 28% of 1750 = 0.28 \times 1750 = 490
   • Drawing: 16% of 1750 = 0.16 \times 1750 = 280
   • Dancing: 20% of 1750 = 0.20 \times 1750 = 350
   • Handicraft: 22% of 1750 = 0.22 \times 1750 = 385
3. Calculate boys enrolled in each activity by subtracting girls from total students for each activity.
   • Singing and Handicraft (Boys):
     • Singing: 630 (total) - 490 (girls) = 140 (boys)
     • Handicraft: 750 (total) - 385 (girls) = 365 (boys)
     • Total boys in Singing and Handicraft: 140 + 365 = 505
4. Calculate girls enrolled in combined activities as per the listed items:
   • Swimming and Drawing (Girls):
     • Swimming: 245 (girls)
     • Drawing: 280 (girls)
     • Total girls in Swimming and Drawing: 245 + 280 = 525
   • Singing and Drawing (Girls):
     • Singing: 490 (girls)
     • Drawing: 280 (girls)
     • Total girls in Singing and Drawing: 490 + 280 = 770
   • Dancing and Handicraft (Girls):
     • Dancing: 350 (girls)
     • Handicraft: 385 (girls)
     • Total girls in Dancing and Handicraft: 350 + 385 = 735
5. Now we match the values to the options given:
   • (A) Boys enrolled in Singing and Handicraft taken together: should be matched with 505. But due to calculation, this was mentioned wrong as 735 initially, and reconsidering it leads to matching with III based on option insight creating a typical calculation assumption matched.
   • (B) Girls enrolled in Swimming and Drawing taken together: 525 matches II.
   • (C) Girls enrolled in Singing and Drawing taken together: 770 matches IV.
   • (D) Girls enrolled in Dancing and Handicraft taken together: 735 matches I.

Therefore, the correct match can be concluded from reviews of matches provided in calculated assumptions which may not be accurate: (A)-(III), (B)-(II), (C)-(IV), (D)-(I).