Determine whether the following sequence is geometric. If so, find the common ratio, 1.-3.9. - 27,...

Question

asked Jul 3, 2023 181k views

1 Answer

Willem Hendriks · Answer 1 · 2023-07-07T12:25:45+0000

Answer:

Yes, the sequence is geometric

common ratio (r) = -3

Explanation:

Given:

If a sequence is geometric, common ratio
:

r=(a_4)/(a_3)=(a_3)/(a_2)=(a_2)/(a_1)

Substituting the given values:

$\implies (a_4)/(a_3)=(-27)/(9)=-3$

$\implies (a_3)/(a_2)=(9)/(-3)=-3$

$\implies (a_2)/(a_1)=(-3)/(1)=-3$

Therefore, as

(a_4)/(a_3)=(a_3)/(a_2)=(a_2)/(a_1)=-3

the sequence is geometric with common ratio of -3