10.15.8
Answer these two questions about the Koch Snowflake. Include mathematical evidence for each answer. As an example, this evidence can be a table showing the changing area or perimeter or it could be referring to the actual snowflake you made in class. You can show more iterations on that snowflake as a part of your evidence also.
These questions should be answered neatly on graph paper (or typed)
1. As the number of iterations approaches infinity, what is happening to the snowflake’s area? Will the snowflake ever grow off the page? When?
2. As the number of iterations approaches infinity, what is happening to the snowflake’s perimeter? Be specific.