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Question
Find the sum to infinity of the following arithmetico - geometric sequence:
`1, 2/4, 3/16, 4/64, ...`
Solution
Let S = `1 + 2/4 + 3/16 + 4/64 + ...`
i.e., S = `1 + 2/4 + 3/4^2 + 4/4^3 + ...` ...(1)
∴ `1/4"S" = 1/4 + 2/4^2 + 3/4^3 + 4/4^4 + ...` ...(2)
Subtracting (2) from (1), we get,
`3/4"S" = 1 + (1/4 + 1/4^2 + 1/4^3 + ......)` ...(3)
The series in the bracket, i.e., `1/4 + 1/4^2 + 1/4^3 + ...` is a geometric series with a = `1/4`, r = `1/4`.
Since |r| = `|1/4| = 1/4 < 1`, the sum to infinity of this G.P. exists and
`1/4 + 1/4^2 + 1/4^3 + ...`
= `"a"/(1 - "r")`
= `((1/4))/(1 - (1/4))`
= `1/3`
∴ from (3), `3/4"S" = 1 + 1/3 = 4/3`
∴ S = `16/9`.
Alternative Method :
The given sequence can be written as:
` 1 xx 1, 2 xx 1/4, 3 xx 1/4^2, 4 xx 1/4^3 ...`
This is arithmetico-geometric progression with
a = 1, d = 1, r = `1/4`, where |r| = `1/4 < 1`
∴ sum to infinity of this A.G.P. is given by
S = `"a"/(1 - "r") + "dr"/(1 - "r")^2`
= `1/(1 - (1/4)) + (1. 1/4)/(1 - 1/4)^2`
= `4/3 + 1/4 xx 16/9`
= `4/3 + 4/9 = 16/9`
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