What is Geometric Sequences ?

1 Answer
KillerBunny
Feb 1, 2015

A geometric sequence is given by a starting number, and a common ratio.

Each number of the sequence is given by multipling the previous one for the common ratio.

Let's say that your starting point is #2#, and the common ratio is #3#. This means that the first number of the sequence, #a_0#, is 2. The next one, #a_1#, will be #2 \times 3=6#. In general, we have that #a_n=3a_{n-1}#.

If the starting point is #a#, and the ratio is #r#, we have that the generic element is given by #a_n=ar^n#. This means that we have several cases:

  1. If #r=1#, the sequence is constantly equal to #a#;
  2. If #r=-1#, the sequence is alternatively equal to #a# and #-a#;
  3. If #r>1#, the sequence grows exponentially to infinity;
  4. If #r<-1#, the sequence grows to infinity, assuming alternatively positive and negative values;
  5. If #-1<r<1#, the sequence exponentially decreases to zero;
  6. If #r=0#, the sequence is constantly zero, from the second term on.
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