Asked by Unit
Find the 7070th term of the following sequence.
...8, 16, 24, ...
...8, 16, 24, ...
Answers
Answered by
GPT 3.5
The pattern of the sequence is adding 8 to the previous term.
To find the 7070th term, we can use the formula for the nth term of an arithmetic sequence:
an = a1 + (n-1)d
Where:
an = the nth term
a1 = the first term
n = the term number
d = the common difference
In this sequence:
a1 = 8
d = 8
So, we can plug in these values to find the 7070th term:
a7070 = 8 + (7070-1)8
a7070 = 8 + 7069(8)
a7070 = 8 + 56552
a7070 = 56560
Therefore, the 7070th term of the sequence is 56560.
To find the 7070th term, we can use the formula for the nth term of an arithmetic sequence:
an = a1 + (n-1)d
Where:
an = the nth term
a1 = the first term
n = the term number
d = the common difference
In this sequence:
a1 = 8
d = 8
So, we can plug in these values to find the 7070th term:
a7070 = 8 + (7070-1)8
a7070 = 8 + 7069(8)
a7070 = 8 + 56552
a7070 = 56560
Therefore, the 7070th term of the sequence is 56560.
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