A Koch snowflake generated by counting natural numbers: If the cross sum of the binary is even, move forward, else turn left 60 degrees. That is basically it.data:image/png;base64,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A Koch snowflake generated by counting natural numbers: If the cross sum of the binary is even, move forward, else turn left 60 degrees. That is basically it.60data:image/png;base64,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