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What else can I help you with?
What is the term-to-term rule for this sequence - 2 4 8 16 32?
What is the value of the 8th term of the sequence 4, 8, 16, 32,?what is the answers?1,024,512,128or2,048.
What is the 8th term of the sequence 1 4 9 16 25?
Well, darling, the sequence you've got there is just the perfect squares of numbers. The 8th term would be the square of the 8th number, which is 64. So, the 8th term of the sequence 1, 4, 9, 16, 25 is 64. Keep those brain cells sharp, honey!
If the nth term of a sequence is 12n - 6 what is the 8th term?
90
What is the 8th term in the Fibonacci sequence?
It is: 1 1 2 3 5 8 13 and 21 which is the 8th term
What is the value of the 8th term of the sequence 4 8 16 32?
The eighth term of the series 4, 8,16,32 is 512. Each term is twice the previous term.
What is the term-to-term rule for this sequence - 2 4 8 16 32?
What is the value of the 8th term of the sequence 4, 8, 16, 32,?what is the answers?1,024,512,128or2,048.
What is the 8th term of the sequence 1 4 9 16 25?
Well, darling, the sequence you've got there is just the perfect squares of numbers. The 8th term would be the square of the 8th number, which is 64. So, the 8th term of the sequence 1, 4, 9, 16, 25 is 64. Keep those brain cells sharp, honey!
If the nth term of a sequence is 12n - 6 what is the 8th term?
90
What is the value of the 8th term of the sequence 6?
48
If the nth term of a sequence is 12n-6 what is the 8th term?
90
What is the 8th term in the Fibonacci sequence?
It is: 1 1 2 3 5 8 13 and 21 which is the 8th term
What is the 8th term of this geometric sequence 13927?
To find the 8th term of a geometric sequence, we need the first term and the common ratio. However, you've only provided a single term (13927) without context. If 13927 is the first term, the 8th term would be calculated as ( a_8 = a_1 \cdot r^{(n-1)} ) where ( r ) is the common ratio and ( n ) is the term number. Without knowing the common ratio, the 8th term cannot be determined. Please provide the common ratio for a complete answer.
What is the value of the 8th term of the sequence 4 8 16 32?
The eighth term of the series 4, 8,16,32 is 512. Each term is twice the previous term.
What is the 8th term in the addition pattern with formula 9n plus 5?
77
What is the 8th term 15 24 42 78 150?
To find the 8th term in the sequence 15, 24, 42, 78, 150, we first identify a pattern in the differences between consecutive terms. The differences are 9, 18, 36, and 72, which suggest that the differences themselves are doubling (approximately). Continuing this pattern, the next differences would be 144 and 288. Thus, the 6th term would be 150 + 144 = 294, the 7th term would be 294 + 288 = 582, and the 8th term would be 582 + 576 = 1158. Therefore, the 8th term is 1158.
What is the first term in a geometric sequence if the 8th term is 8748 and the common ratio is 3?
Tn = a*r(n-1) r = 3 T8 = 8748 = a*37 So a = 8748/37 = 4 = T1
How do you find the nth term in a fraction sequence?
work it out it's one more than the 8th and one less than the 10th * * * * * The above answer seems to make no sense here. It is not clear what you mean by a fraction sequence. It is not possible to go through the process for finding the nth term in an arithmetic, geometric or power sequence here. For school mathematics, sequences of fractions are, in fact composed of two simple sequences. One sequence defines the numerators and the other defines the denominators. In such cases, the nth term of the fraction sequence is the fraction given by the nth term of the numerator sequence divided by the nth term of the denominator sequence. For example: 1/1, 3/4, 5/9, 7/16, 9/25, ... The numerators are the odd number, with t(n) = 2n-1 The denominators are the squares of natural numbers with u(n) = n2 So, the nth term of the fraction sequence is (2n-1)/n2.
