Answer:
[tex]b_n=-2\cdot 8^{n-1}[/tex]
Step-by-step explanation:
Denote first four terms of the geometrc sequence as
[tex]b_1=-2,\\ \\b_2=-16,\\ \\b_3=-128,\\ \\b_4=-1024.[/tex]
Note that
[tex]b_2=b_1\cdot q\Rightarrow -16=-2\cdot 8;\\ \\b_3=b_2\cdot q\Rightarrow -128=-16\cdot 8;\\ \\b_4=b_3\cdot q\Rightarrow -1024=-128\cdot 8.[/tex]
Then the common ratio is
[tex]q=8.[/tex]
Therefore, the recursive formula for the geometric sequence is
[tex]b_n=b_1\cdot q^{n-1}\Roghtarrow b_n=-2\cdot 8^{n-1}.[/tex]
