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The image you uploaded appears to contain a handwritten mathematical expression, potentially part of a proof using **mathematical induction** ("raisonnement par récurrence" in French). Induction is a proof technique often used to establish a property for all natural numbers.

However, the writing seems slightly rotated, and it appears incomplete or hard to read clearly due to the orientation.

If you're working on a recurrence relation or a problem with induction, please let me know more details about the problem statement or correct any potential visibility issues. Alternatively, I can guide you through a standard process of mathematical induction if that's the subject you're focusing on.

Would you like to upload a clearer version, or shall I help you based on assumptions about the problem?

Here are five potential relevant questions that could expand on the topic of mathematical induction:
1. How does mathematical induction work for proving statements about natural numbers?
2. What are the base and inductive steps in the process of induction?
3. How do you handle induction in recurrence relations for sequences or sums?
4. What types of problems can be efficiently solved using induction?
5. How does strong induction differ from regular mathematical induction?

**Tip**: When proving statements using induction, ensure the base case is clearly established before attempting the inductive step.

Explore mathematical induction and how it applies to recurrence relations with step-by-step guidance. This advanced topic delves into proving statements for natural numbers using the base and inductive steps of induction. Perfect for advanced high school or university students.

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