The given sequence exhibits a pattern where each term is derived from division by quantities that are multiples of the first term, 1/4. This makes it an example of a harmonic progression.
From this observation, we can say that the nth term of this sequence is 1 divided by (4n).
Now, we want to find the 8th term of this sequence.
By substituting 8 as the value of n in our formula, we get:
Term8 = 1 / (4 * 8)
So, the 8th term in the sequence is 0.03125.