Well, darling, if the 20th term in a sequence is 50, then you can bet your bottom dollar that the 21st term will also be 50. In a sequence, each term is determined by a pattern or rule, so if the 20th term is 50, the next term will follow suit. It's as simple as that, sweetie.
Oh, what a happy little question! If the 20th term in a sequence is 50, that means we're adding the same amount each time. To find the 21st term, we just need to keep adding that same amount. So, if the 20th term is 50, the 21st term would be 50 plus that special amount. Just keep on adding and you'll find your answer, like painting a beautiful little tree in the sunset.
the sequence is Un=2n2
you must find the pattern of the sequence in order to find the next 50 terms using that pattern and the first part of the sequence given
This is a geometric sequence of the form a, ar, ar^2, ar^3, ... where a is the first term and r is the common ratio.In our case, the first term a = 2, and the common ratio r = 5.The nth term of such a sequence isan = a r^(n -1).
100, 50, 0, -50, -100
what number is next in the sequence: 10,20,30,20,(? 30
50 Each term in the sequence is 5 times the previous term.
the sequence is Un=2n2
The sequence goes up by 5 each time; the first term is two. So the nth term is 2 + 5n. n=50 => 2+50*5 = 252.
you must find the pattern of the sequence in order to find the next 50 terms using that pattern and the first part of the sequence given
The nth term is 2n2. (One way to find that is to notice at all the numbers are even, then divide them by 2. The sequence becomes 1, 4, 9, 16, 25, which are the square numbers in order.)
The nth term in the sequence is defined by t(n) = -1 + 4n where n = 1, 2, 3, ... So t(50) = -1 + 4*50 = -1 + 200 = 199
This is a geometric sequence of the form a, ar, ar^2, ar^3, ... where a is the first term and r is the common ratio.In our case, the first term a = 2, and the common ratio r = 5.The nth term of such a sequence isan = a r^(n -1).
Alternating adding and subtracting 100
No.
To find the nth term in a quadratic sequence, we first need to determine the pattern. In this case, the difference between consecutive terms is increasing by 3, 5, 7, 9, and so on. This indicates a quadratic sequence. To find the 9th term, we need to use the formula for the nth term of a quadratic sequence, which is given by: Tn = an^2 + bn + c. By plugging in n=9 and solving for the 9th term, we can find that the 9th term in this quadratic sequence is 74.
50th term means n = 50 So the term is 100-50 = 50
50 grams is 1/20th (or 0.05) of a kilogram.