From what I know, it is just called "next term in sequence" For a unknown term, just call it the "nth term".
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
a + 99d where 'a' is the first term of the sequence and 'd' is the common difference.
The 90th term of the arithmetic sequence is 461
what term is formed by multiplying a term in a sequence by a fixed number to find the next term
add up the 2 previous ones.
From what I know, it is just called "next term in sequence" For a unknown term, just call it the "nth term".
67
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
a + 99d where 'a' is the first term of the sequence and 'd' is the common difference.
The 90th term of the arithmetic sequence is 461
Fibonacci sequence
Well, by definition a "random number sequence" is random; i.e. you cannot find out the next term.However if you're just trying to find the formula for a "number sequence" (not random):1) look at what you have to do to get from one number in the sequence to the next - example the initial difference between the numbers may give a sequence such as "+4, +6, +8, +10", this then gives a sequence of "+2, +2, +2 etc." - this does help to to find out the formula for the sequence.2) write down the "term numbers" (call this "t") above or below the sequance, (i.e. 1st term, 2nd term etc.) and see what you have to do to get from the term number to the sequence number. i.e "3t-1", "t squared minus 3" etc.
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.