Well, honey, the seventh term of a sequence is simply the value that appears in the seventh position when the terms are listed in order. If you want a specific answer, you gotta give me the sequence first. I may be sassy, but I ain't no mind reader, darling.
To find the seventh term in the sequence -6, -11, -16, -21, -26, we first identify the pattern: each term decreases by 5. Therefore, the next term would be -26 - 5 = -31. Continuing this pattern, the seventh term would be -31 - 5 = -36.
Find the generating equation for the sequence and then substitute the values 5, 6 and 7 (respectively) for the counter - which is usually n.
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Each number in the sequence is the previous number divided by 4. Therefore the 7th term starting from 1024 is 0.25. The first 8 terms are: 1024, 256, 64, 16, 4, 1, 0.25 and 0.0625.
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To find the seventh term of a sequence, you need to identify the pattern or formula governing the sequence. If it's an arithmetic sequence, you can use the formula ( a_n = a_1 + (n-1)d ), where ( a_1 ) is the first term, ( d ) is the common difference, and ( n ) is the term number. For a geometric sequence, use ( a_n = a_1 \cdot r^{(n-1)} ), where ( r ) is the common ratio. Substitute ( n = 7 ) into the appropriate formula to find the seventh term.
To find the seventh term in the sequence -6, -11, -16, -21, -26, we first identify the pattern: each term decreases by 5. Therefore, the next term would be -26 - 5 = -31. Continuing this pattern, the seventh term would be -31 - 5 = -36.
If the first term is 12 and the seventh term is 36, then we have gone up 36-12 in the space of 6 term changes. This is 24 per 6 changes, which can be written as the division 24/6. This works out as 4. Thus the common difference in the sequence is 4.
In a geometric sequence, the ratio between consecutive terms is constant. Given that the sixth term is 18 and the eighth term is 32, we can find the common ratio ( r ) by dividing the eighth term by the sixth term: ( r = \frac{32}{18} = \frac{16}{9} ). To find the seventh term, we can multiply the sixth term by the common ratio: ( 18 \times \frac{16}{9} = 32 ). Therefore, the seventh term is 32.
1 - 2 - 4 - 8 - 16 - 32 - 64 the sequence doubles
Find the generating equation for the sequence and then substitute the values 5, 6 and 7 (respectively) for the counter - which is usually n.
every next term is 4 smaller than previous so 7th term = -23
91
Each number in the sequence is the previous number divided by 4. Therefore the 7th term starting from 1024 is 0.25. The first 8 terms are: 1024, 256, 64, 16, 4, 1, 0.25 and 0.0625.
To determine which letter follows the seventh "e" in a sequence, you would need to provide the full sequence of letters. Without that specific context, it's impossible to identify the letter that comes after the seventh "e." Please provide the sequence for an accurate answer.
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