To find the 7th term of a geometric sequence where the first term (a1) is 4096 and the fourth term (a4) is 64, we can use the formula for the n-th term of a geometric sequence:
- an = a1 * r(n-1)
Here, a1 denotes the first term, r represents the common ratio, and n is the term number. We know:
- a1 = 4096
- a4 = 64
Using the formula for a4, we can write:
- a4 = a1 * r(4-1)
- 64 = 4096 * r3
Next, we can solve for r:
- r3 = 64 / 4096
- r3 = 1 / 64
- r3 = 64-1
- r = 64-1/3 = 1/4
Now that we have r, we can find the 7th term:
- a7 = a1 * r(7-1)
- a7 = 4096 * (1/4)6
- a7 = 4096 * (1/4096)
- a7 = 1
Therefore, the 7th term of the geometric sequence is 1.