Let's solve this step by step:

1. First, let's understand the given statements:
• All bloops are razzies
• No razzies are lazzies

2. If all bloops are razzies, and no razzies are lazzies, then:
• Bloops cannot be lazzies

3. So the answer is: No, bloops cannot be lazzies.

This follows from the transitive property of set relationships - if bloops are a subset of razzies, and razzies have no overlap with lazzies, then bloops also cannot be lazzies.
