I got lost in this problem. What is the pattern?

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Let a₁, a₂, 3, ... be the sequence defined recursively as follows. 3ak-1 + 2 for each integer k ≥ 1 Use iteration to guess an explicit formula for the sequence by filling in the blanks below. Simplify the result by using a formula from Section 5.2. 2₁ = 2 22 3a₁ + 2 = 3 1 23 = 35 332 +2 = 33. 2 = = 3 34 = 333 = 3 3 an = 3 = = 3 3 324 +2 = 3 ak a₁ = 2 = 3 = 2. = 2 + 2 = 3 = (3 n+1 v ??? ♥ 2 + 3 n+2 ✓ + 2 +2 3-1 +3 2 Based on this pattern, it is reasonable to guess that n+1 V n+2 ✓ n+3 by definition of a₁a₂a3--- +3. 1 +3. +3 n-1 V +3 +3 + 2 +2 2 + 3 + 2+3. . by definition of a ₁, ₂, 3 -- +3. +3' + ... + 3² + 3 + 1) + 2 + 2 by definition of a ₁, ₂, 3 --- + 2 + + 32.2 +3.2+2 +3. +2 + 2 by definition of a₁a₂a3--- [by Theorem 5.2.2 with r = 3] for every integer n ≥ 1.