what is the 8th term of the fibonacci sequence
The 8th term of the Fibonacci sequence is 21.
📝 How that term is found
The Fibonacci sequence starts from
0,\1,\1,\2,\3,\5,\8,\13,\21,\\dots
where each term is the sum of the two previous terms:
F_n=F_{n-1}+F_{n-2}.
Counting from the first term as F_1=1 (or sometimes F_0=0), the 8th term lands at 21 , regardless of which starting index convention you follow.
📋 Quick index view
Position in sequence| Value
---|---
1st| 1
2nd| 1
3rd| 2
4th| 3
5th| 5
6th| 8
7th| 13
8th| 21
So, the answer to “what is the 8th term of the Fibonacci sequence” is simply 21.