Answer:
The given sequence, 16, 7, 2, appears to be decreasing by 9 each time. To find the 64th term, you can use the formula for an arithmetic sequence:
a_n = a_1 + (n - 1) * d
Where:
a_n is the nth term,
a_1 is the first term,
n is the term number you want to find, and
d is the common difference.
In this case, a_1 is 16, the common difference (d) is -9 (since the sequence is decreasing by 9 each time), and n is 64.
a_64 = 16 + (64 - 1) * (-9)
a_64 = 16 + 63 * (-9)
a_64 = 16 - 567
a_64 = -551
So, the 64th term of the sequence is -551.
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Answers & Comments
Answer:
The given sequence, 16, 7, 2, appears to be decreasing by 9 each time. To find the 64th term, you can use the formula for an arithmetic sequence:
a_n = a_1 + (n - 1) * d
Where:
a_n is the nth term,
a_1 is the first term,
n is the term number you want to find, and
d is the common difference.
In this case, a_1 is 16, the common difference (d) is -9 (since the sequence is decreasing by 9 each time), and n is 64.
a_64 = 16 + (64 - 1) * (-9)
a_64 = 16 + 63 * (-9)
a_64 = 16 - 567
a_64 = -551
So, the 64th term of the sequence is -551.