Give an example of a geometric sequence whose first three terms are very close to 1 but whose terms are eventually very close to 0. Use a calculator to check that your sequence has the desired property.
Choose a sequence that matches all the requirements.
A. 1.01, 1.0201, 1.030301, ...
B. 0.97, 0.9409, 0.912673, ...
C. 0.01, 0.0001, 0.000001, ...
D. - 1.061208, 1.0404, - 1.02, ...
To demonstrate that this sequence gets closer and closer to 0, find the 100th and 200th terms.
$$a_{100} \approx$$ and $$a_{200} \approx$$
(Round to four decimal places as needed.)
