In each of the questions, below two/three statements are given followed by conclusions/groups of conclusions numbered I and II. You assume all the statements to be true even if they seem to be at variance from the commonly known facts and then decide which of the given two conclusions logically follows from the information given in the statements.
Give answer A if only conclusion I follows
Give answer B if only conclusion II follows
Give answer C if either I or II follows
Give answer D if neither I nor II follows
Give answer E if both I and II follows
Statements: Some squares are circle.
No circle is a triangle.
No line is square .
Conclusions: I. All squares can never be triangles.
II. Some lines are circles.
The Venn diagram for the given syllogism is as follows:
It is given that no circle is a triangle. So, the area that's shaded can never be a triangle. So, all squares can never be triangles.
In the given diagram, no line is a circle. So, to assume that at least some lines are circles in "every" case is unfounded. So, the correct answer is (a)
Create a FREE account and get:
- Banking Quant Shortcuts PDF
- Free Banking Study Material - (15000 Questions)
- 135+ Banking previous papers with solutions PDF
- 100+ Online Tests for Free
