Let's break this logical problem down step by step:

1. **All bloops are razzies**: This statement means every bloop is contained within the group of razzies. In other words, there is no bloop that is not a razzie.

2. **No razzies are lazzies**: This means that there is no overlap between the groups of razzies and lazzies—they are completely separate.

Now, combining the two statements:

- Since all bloops are razzies, every bloop is a member of the razzies group.
- Since no razzies are lazzies, it is impossible for any bloop (a type of razzie) to also be a lazzie.

### Conclusion:
No, **no bloops can be lazzies**.
