To determine the type of sequence represented by the numbers 9, 4, -1, -6, we need to examine the differences or ratios between consecutive terms.
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Arithmetic Sequence: In an arithmetic sequence, the difference between consecutive terms is constant.
- The difference between 9 and 4 is \(4 - 9 = -5\).
- The difference between 4 and -1 is \(-1 - 4 = -5\).
- The difference between -1 and -6 is \(-6 - (-1) = -5\).
Since the difference is constant (-5), this qualifies as an arithmetic sequence.
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Geometric Sequence: In a geometric sequence, the ratio of consecutive terms is constant.
- The ratio between 9 and 4 is \(4/9\).
- The ratio between 4 and -1 is \(-1/4\).
- The ratio between -1 and -6 is \(-6/(-1) = 6\).
The ratios are not constant, so this is not a geometric sequence.
Based on this analysis, the correct classification for the sequence 9, 4, -1, -6 is:
arithmetic sequence.
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