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what term is formed by multiplying a term in a sequence by a fixed number to find the next term
It is the sequence of first differences. If these are all the same (but not 0), then the original sequence is a linear arithmetic sequence. That is, a sequence whose nth term is of the form t(n) = an + b
A sequence where a particular number is added to or subtracted from any term of the sequence to obtain the next term in the sequence. It is often call arithmetic progression, and therefore often written as A.P. An example would be: 2, 4, 6, 8, 10, ... In this sequence 2 is added to each term to obtain the next term.
If the first two numbers are 0, 1 or -1 (not both zero) then you get an alternating Fibonacci sequence.
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From what I know, it is just called "next term in sequence" For a unknown term, just call it the "nth term".
what term is formed by multiplying a term in a sequence by a fixed number to find the next term
It is the sequence of first differences. If these are all the same (but not 0), then the original sequence is a linear arithmetic sequence. That is, a sequence whose nth term is of the form t(n) = an + b
an equation that shows how to calculate the value of the next term in a sequence from the value of the current term
what is the next term i n this sequence ll iV Vl X Xll XlV? XVl
Fibonacci sequence
A sequence where a particular number is added to or subtracted from any term of the sequence to obtain the next term in the sequence. It is often call arithmetic progression, and therefore often written as A.P. An example would be: 2, 4, 6, 8, 10, ... In this sequence 2 is added to each term to obtain the next term.
If the first two numbers are 0, 1 or -1 (not both zero) then you get an alternating Fibonacci sequence.
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1240
Since each term appears to be half of the previous term, the next two in this sequence would appear to be: 6, 3.
The sequence you provided is a "look-and-say" sequence. Each term describes the previous term by counting consecutive digits. The last term, 111221, can be described as "three 1s, two 2s, and one 1," which translates to the next term: 312211.