issb intelligence MCQ #7

If all Bloops are Razzies and all Razzies are Lazzies, then all Bloops are definitely:

issb intelligence MCQ #7

  1. Question 1

    Q1. If all Bloops are Razzies and all Razzies are Lazzies, then all Bloops are definitely:

    • A) Lazzies
    • B) Not Lazzies
    • C) Razzies only
    • D) None of these

    Answer: Lazzies

    Explanation: Syllogism: Bloops ⊂ Razzies ⊂ Lazzies → Bloops ⊂ Lazzies. Transitive property — common in logical reasoning sections.