• Suppose P(n0) is true. If for any integer k > nO, P(n0), P(n0 + 1), P(n0 + 2), . . . , P(k) are true imply that P(k + 1) is true, then P(n) is true for all n ≥ no. Prove by the Second Principle of Mathematical Induction that any postage charges of greater than or equal to 8 cents can be made using only 3- and 5-cent stamps. In order to receive any credit for this problem, you must write complete sentences, include all details, be clear in your reasoning, and use the correct format and syntax for an induction proof

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• Suppose P(nO) is true. If for any integer k ≥ n0, P(n0), P(n0 + 1), P(n0 + 2), . . ., P(k) are true imply that P(k + 1) is true, then P(n) is true for all n ≥ n0. Prove by the Second Principle of Mathematical Induction that any postage charges of greater than or equal to 8 cents can be made using only 3- and 5-cent stamps. In order to receive any credit for this problem, you must write complete sentences, include all details, be clear in your reasoning, and use the correct format and syntax for an induction proof