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प्रश्न
Find Sn of the following arithmetico - geometric sequence:
3, 12, 36, 96, 240, …
उत्तर
3, 12, 36, 96, 240, …
i.e., 1 × 3, 2 × 6, 3 × 12, 4 × 24, 5 × 48, …
Here, 1, 2, 3, 4, 5, … are in A.P.
∴ nth term = n
3, 6, 12, 24, 48, … are in G.P.
∴ a = 3, r = 2
∴ nth term = arn–1 = 3.(2n–1)
∴ nth term of the arithmetico-geometric sequence is tn = n.3(2n–1)
∴ Sn = 1 × 3 + 2 × 6 + 3 × 12 + 4 × 24 + 5 × 48 + ... + n.3(2n–1) ...(i)
Multiplying throughout by 2, we get
2Sn = 1 × 6 + 2 × 12 + 3 × 24 + 4 × 48 + 5 × 96 + …+ n.3(2n) ...(ii)
Equation (i) – equation (ii), we get
Sn – 2Sn = [3 – 3n(2n)] + [6 + 12 + 24 + ... + 3(2n–1)]
∴ – Sn = `[3 - 3"n"(2^"n")] + (6(2^("n" - 1) - 1))/(2 - 1)`
= 3 – 3n(2n) + 6(2n– 1 – 1)
∴ Sn = 3n(2n) – 3 – 6(2n–1) + 6
= 3n(2n) – 3(2n) + 3
∴ Sn = (n – 1)3(2n) + 3 = 3[(n – 1)2n + 1]
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