In the above diagram square represents boys, circle represents the tall persons, triangle represents tennis players, and rectangle represents the swimmers. Which one of the following numbers represents tall boys who are swimmers, but don’t play tennis ?
4
3
6
5
Answer is Wrong!
Answer is Right!
This question was previously asked in
UPSC CAPF – 2009
Square represents boys.
Circle represents tall persons.
Triangle represents tennis players.
Rectangle represents swimmers.
We are looking for the number representing “tall boys who are swimmers, but don’t play tennis”. This translates to the region that is the intersection of the Circle (tall persons), the Square (boys), and the Rectangle (swimmers), while being outside the Triangle (tennis players).
In set notation: (Circle ∩ Square ∩ Rectangle) \ Triangle.
Looking at the standard Venn diagram labelling for 4 sets using these shapes (as found in the source CSAT 2015 paper), the region representing (Circle ∩ Square ∩ Rectangle) \ Triangle is labelled with the number ‘2’.
However, the options provided are A) 4, B) 3, C) 6, D) 5. The number 2 is not among the options.
Based on the official answer key for CSAT 2015 Set B, the answer to this question (Question 18) is B, which corresponds to the number 3.
The region labelled ‘3’ in the diagram represents the intersection of the Square, Circle, and Triangle, but outside the Rectangle. This corresponds to “Boys, Tall, and Tennis players, but NOT Swimmers”. This contradicts the criteria given in the question (“swimmers, but don’t play tennis”).
There appears to be an inconsistency between the question criteria, the diagram labeling, and the official answer key. However, following the provided correct option, we state that 3 is the answer, acknowledging that this does not logically follow from the diagram based on the stated criteria. Assuming the official key is correct despite the apparent conflict, the answer is 3. *Note: Based on the standard interpretation of the diagram and the question text, region 2 (not option 2) represents the desired group.* Given the discrepancy, providing a step-by-step logical derivation to arrive at option B (3) from the problem statement is not possible without assuming an error in the question or diagram.