Consider a sequence A1, A2, ..., an, ... defined recursively as follows - 1/2 (20² +2²2) an+1 an First Principle a1 = a2

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Consider A Sequence A1 A2 An Defined Recursively As Follows 1 2 20 2 2 An 1 An First Principle A1 A2 1 (60.14 KiB) Viewed 42 times

Consider a sequence A1, A2, ..., an, ... defined recursively as follows - 1/2 (20² +2²2) an+1 an First Principle a1 = a2 1, an+2 Suppose we wanted to prove that 1 ≤ an ≤ 2, for every $n \geq 1$. Which principle of mathematical induction would we use? Strong Principle Second Principle -