If all Bloops are Razzies and all Razzies are Lazzies, which of the following st
Practice Questions
Q1
If all Bloops are Razzies and all Razzies are Lazzies, which of the following statements is true? (2021)
All Bloops are Lazzies.
Some Lazzies are Bloops.
No Razzies are Bloops.
All Lazzies are Razzies.
Questions & Step-by-Step Solutions
If all Bloops are Razzies and all Razzies are Lazzies, which of the following statements is true? (2021)
Step 1: Understand the terms. We have three groups: Bloops, Razzies, and Lazzies.
Step 2: Note the relationships. The question states that all Bloops are Razzies. This means every Bloop belongs to the group of Razzies.
Step 3: Next, it states that all Razzies are Lazzies. This means every Razzie belongs to the group of Lazzies.
Step 4: Combine the information. Since all Bloops are Razzies, and all Razzies are Lazzies, we can conclude that all Bloops must also be Lazzies.
Step 5: Therefore, the true statement is that all Bloops are Lazzies.
Syllogism – The question tests the ability to understand and apply syllogistic reasoning, where relationships between categories are established.
Transitive Property – It assesses the understanding of the transitive property in logic, where if A is related to B and B is related to C, then A is related to C.
