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What is the nth term and and the 14th term of the sequence of numbers 2 8 14 and 20?
They are: nth term = 6n-4 and the 14th term is 80
What is the nth term for 20 14 8 2 -4?
It is: 26-6n
What is the nth term of 2 11 26 47 74 107?
To find the nth term of this sequence, we first need to determine the pattern or rule governing the sequence. By examining the differences between consecutive terms, we can see that the sequence is increasing by 9, 15, 21, 27, and so on. This indicates that the nth term is given by the formula n^2 + 1.
How do you write the Nth term in the sequence 2 4 8 16?
The Nth term in the series is [ 2N ] .
What is the nth term for 248163264?
If you mean: 2 4 8 16 32 64 it is 2^nth term and so the next number is 128
What is the nth term for -2 5 12 19 26?
It is: nth term = 7n-9
What is the nth term for 26 18 10 2 -6?
The nth term in this arithmetic sequence is an=26+(n-1)(-8).
What is the nth term and and the 14th term of the sequence of numbers 2 8 14 and 20?
They are: nth term = 6n-4 and the 14th term is 80
What is the nth term of 98,94,88,80?
the nth term of the sequence 98, 94, 88, 80 can be expressed as 98 - (n - 1) * 2.
What is the nth term for 20 14 8 2 -4?
It is: 26-6n
What is the nth term of 2 10 26 50 82?
t(n) = 4n2 - 4n + 2
What is the nth term for 10 6 2 -2?
It is: nth term = -4n+14
What is the nth term for the sequence 2 8 16 26 38?
2 + ((6 + 2 * (n - 1) * (n - 1))
What is the nth term of 2 6 10 14 18?
Well, isn't that just a lovely pattern we have here? Each term is increasing by 4, isn't that delightful? So, if we want to find the nth term, we can use the formula: nth term = first term + (n-1) * common difference. Just like painting a happy little tree, we can plug in the values and find the nth term with ease.
The pattern of 5 12 19 26?
Expressed in terms of n, the nth term is equal to 7n - 2.
What is the nth term of -10 -8 -6 -4 -2?
The nth term is (2n - 12).
What is the nth term to 2 8 14 20 26?
The given sequence is an arithmetic sequence with a common difference of 6, as each term increases by 6. To find the nth term of an arithmetic sequence, we use the formula: nth term = a + (n-1)d, where a is the first term, d is the common difference, and n is the term number. In this case, the first term a = 2, the common difference d = 6, and the term number n is not specified. Therefore, the nth term of the sequence 2, 8, 14, 20, 26 is 2 + (n-1)6.
