Question

If all Bloops are Razzies and all Razzies are Lazzies, which of the following is true?

• A. All Bloops are Lazzies
• B. Some Lazzies are Bloops
• C. No Razzies are Bloops
• D. Some Bloops are not Lazzies

Hint:

In categorical logic, use transitivity to link statements: if all A are B and all B are C, then all A are C. Visualize using set diagrams where A is a subset of B, and B is a subset of C.

Answer 1

The Correct Option is A

To identify the correct statement from the provided premises, we will examine the logical connections:

• Premise 1: All Bloops belong to the category of Razzies.
• Premise 2: All Razzies belong to the category of Lazzies.

Based on these premises, the following deduction is made: Given that every Bloop is a Razzie, and every Razzie is a Lazzie, it is a logical consequence that every Bloop is also a Lazzie. This illustrates a transitive property: if set A is contained within set B, and set B is contained within set C, then set A is contained within set C.

Consequently, the valid statement derived is: All Bloops are Lazzies.