Question

How do you find the explicit formula for the following sequence 1/2,3/4,5/8,7/16 ...?

Answer 1

`a_n = (2n-1)/2^n`

Explanation:

The numerators form an arithmetic sequence:

`1, 3, 5, 7`

with common difference `2`.

So a formula for the numerator could be written:

`p_n = 1+2(n-1) = 2n-1`

The denominators form a geometric sequence:

`2, 4, 8, 16`

with common ratio `2`.

So a formula for the denominator could be written:

`q_n = 2*2^(n-1) = 2^n`

Thus a formula for a general term of our example sequence can be written:

`a_n = p_n/q_n = (2n-1)/2^n`