Here's how to break down this logic puzzle:

1. **"All bloops are razzies."** This means the set of bloops is entirely contained within the set of razzies.
2. **"No razzies are lazzies."** This means the set of razzies and the set of lazzies are completely separate; they have no overlap.

Since all bloops are inside the set of razzies, and the set of razzies has no overlap with the set of lazzies, it's impossible for any bloops to also be lazzies.

**Answer:** No, no bloops can be lazzies.
