To find the nth term of a sequence, we first need to determine the pattern or rule governing the sequence. In this case, the sequence appears to be increasing by 7 each time. Therefore, the nth term can be represented by the formula Tn = 6 + 7(n-1), where n is the position of the term in the sequence.
Willies
Oh, dude, chill. The nth term for this sequence is -7n + 27. But like, who really needs to know that? Just enjoy the numbers, man.
The nth term of the sequence is (n + 1)2 + 2.
5n+2
n3
Willies
Oh, dude, chill. The nth term for this sequence is -7n + 27. But like, who really needs to know that? Just enjoy the numbers, man.
The nth term of the sequence is (n + 1)2 + 2.
To find the nth term of the sequence 4, 13, 28, 49, 76, we first identify the differences between consecutive terms: 9, 15, 21, 27. The second differences, which are constant at 6 (6, 6, 6), suggest that the sequence is quadratic. The nth term can be expressed as ( an^2 + bn + c ). By solving the equations based on the first few terms, we find the nth term is ( n^2 + 3n ).
2n +29
5n+2
n3
The 38th term
the anser is that you are stupid
3^n These are powers of 3
There is no pattern
9 3 1