(Term)n = 59 - 2n
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53. The sequence starts with one and lists every fourth prime.
53 sides Interior angels always add up to (number of sides -2)*180 so reverse the process: 9180/180=number of sides -2. 51=sides -2. Sides = 53
47+47+53+53=200 feet
12 inches make a foot. 53 inches in feet= 53/12= 4.42 feet (4 feet 5 inches)
The supplementary angle of 53 degrees is 127 degrees
To find the term number when the term value is 53 in a sequence, you need to know the pattern or formula of the sequence. If it is an arithmetic sequence with a common difference of d, you can use the formula for the nth term of an arithmetic sequence: ( a_n = a_1 + (n-1)d ), where ( a_n ) is the nth term, ( a_1 ) is the first term, and d is the common difference. By plugging in the values, you can solve for the term number.
t(n) = 12*n + 5
tn = 2x2 + 3 where x = 1, 2, 3, ...
To find the nth term of a sequence, we need to identify the pattern between the numbers. Looking at the differences between consecutive terms, we see that the differences are increasing by 9, 15, 21, and so on. This indicates that the sequence is following a pattern of adding consecutive odd numbers (1, 3, 5, 7, ...). Therefore, the nth term of this sequence can be expressed as n^2 + 7.
Well, isn't that just a happy little sequence we have here! To find the pattern, we can see that the differences between the terms are increasing by 2 each time. So, the nth term can be found by the formula n^2 + 4. Just like painting a beautiful landscape, sometimes all we need is a little patience and observation to uncover the hidden beauty within numbers.
51 out of 53 is 96.23%
This is an arithmetic sequence with t1 = 1 and the common difference d = -18.The nth term of an arithmetic sequence is given by the formula:tn = t1 + (n - 1)d (substitute 10 for n, 1 for t1, and -18 for d)t10 = 1 + (10 - 1)(-18) = 1 + 9(-18) = 1 - 162 = -161Thus the 10th number of the sequence is -161.
Arithmetic- the number increases by 10 every term.
The GCF is 1.
53 - 2 = 51
51 is.
Each term in the sequence is three times the previous term plus two, so the next term is 485.1 (3 x 1 + 2) 5 (3 x 5 + 2) 17 (3 x 17 + 2) 53 (3 x 53 = 2) 161 (3 x 161 + 2) 485