Geometric Progression, Series & Sums
Introduction
A geometric sequence is a sequence such that any element after the first is obtained by multiplying the preceding element by a constant called the common ratio which is denoted by r. The common ratio (r) is obtained by dividing any term by the preceding term, i.e.,
| where | r | common ratio |
| a1 | first term | |
| a2 | second term | |
| a3 | third term | |
| an-1 | the term before the n th term | |
| an | the n th term |
For example, the sequence 1, 3, 9, 27, 81 is a geometric sequence. Note that after the first term, the next term is obtained by multiplying the preceding element by 3.
The geometric sequence has its sequence formation:
To find the nth term of a geometric sequence we use the formula:
| where | r | common ratio |
| a1 | first term | |
| an-1 | the term before the n th term | |
| n | number of terms |
Nice~ Thank you for the explanation.. :)
ReplyDeleteNice~ Thank you for the explanation.. :)
ReplyDeletesimple and understandable, thanks! ^_^
ReplyDelete