Q65.Marks: +2.0UGC NET Paper 2: Computer Science and Application 26th June 2025 Shift 1
Match List I with List II
List I
List II
A. If the Indian team wins, then it is raining
I. Inverse
B. If the Indian team does not win, then it is not raining
II. Converse
C. If it is raining, then the Indian team wins
III. Contrapositive
D. If it is not raining, then the Indian team does not win
IV. Conditional
Choose the correct answer from the options given below:
1.A-II, B-I, C-IV, D-III
2.A-III, B-I, C-II, D-IV
3.A-II, B-III, C-IV, D-I✓ Correct
4.A-III, B-II, C-IV, D-I
Solution
The Correct Answer is Option 3: A-II, B-III, C-IV, D-I
Explanation:
Option A: If the Indian team wins, then it is raining (Converse)
The converse of a conditional statement reverses the hypothesis and the conclusion.
Here, the original conditional statement is "If it is raining, then the Indian team wins."
The converse would be "If the Indian team wins, then it is raining."
Thus, Option A matches with II (Converse).
Option B: If the Indian team does not win, then it is not raining (Contrapositive)
The contrapositive of a conditional statement negates both the hypothesis and the conclusion and swaps them.
For the original statement "If it is raining, then the Indian team wins," the contrapositive is "If the Indian team does not win, then it is not raining."
Thus, Option B matches with III (Contrapositive).
Option C: If it is raining, then the Indian team wins (Conditional)
The conditional statement is the original form of the statement, where "If P, then Q" is retained.
Here, "If it is raining, then the Indian team wins" is the original conditional statement.
Thus, Option C matches with IV (Conditional).
Option D: If it is not raining, then the Indian team does not win (Inverse)
The inverse of a conditional statement negates both the hypothesis and the conclusion.
For the original statement "If it is raining, then the Indian team wins," the inverse is "If it is not raining, then the Indian team does not win."