Proof by Induction Using a Proof by Induction prove the following statement P(n) holds true for all integers n ≥ 1: 1 1 1 P(n): 1+ + + + ≤2√n √2 √3 √n

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QUESTION 12. Proof by Induction Using a Proof by Induction prove the following statement P(n) holds true for all integers n ≥ 1: 1 1 1 P(n): 1 + + + + √2 √3 √n ≤2√n Important: Include all relevant details in your proof. If variables appear in your proof, clearly indicate what they represent. Clearly indicate your Induction Hypothesis and indicate exactly when it is used in the proof of your Induction Step. (hint, you maybe use a² + b² 22ab)

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Important: In all proofs, for each step, you must clearly indicate whether you are assuming something, or whether what you wrote is something that follows from a definition or a previous step of your proof. If any variables appear in your proof, make sure you clearly indicate what they represent.