1. The problem states that Preety is a student in Year 12 and that Preety does not study French, i.e., Preety \notin F. 2. Given the sets: - $\xi$ = Students in Year 12 - $G$ = Students who study German - $F$ = Students who study French - $M$ = Students who study Maths 3. Since Preety is in Year 12, we have $\text{Preety} \in \xi$. 4. Since Preety does not study French, we write $\text{Preety} \notin F$. 5. Therefore, the statement about Preety is: $$\text{Preety} \in \xi \quad \text{and} \quad \text{Preety} \notin F.$$