1 Answer

Lenden · Answer 1 · 2023-04-07T18:46:20+0000

A geometric sequence is a sequence in which each term is found by multiplying the preceding term by the same value. Its general term is

The value r is called the common ratio.

On the sequence of our problem, we know the second and fifth term. If we substitute those values on the general term presented, we have

$\begin{gathered} a_2=a_1r^(2-1)=a_1r=-4 \\ a_5=a_1r^(5-1)=a_1r^4=-(27)/(2) \end{gathered}$

If we divide the fifth term by the second term, we're going to have

$(a_5)/(a_2)=(a_1r^4)/(a_1r)=r^3\operatorname{\implies}r^3=((-27\/2))/((-4))$

Solving for r, we have

$\begin{gathered} r^3=((-27\/2))/((-4)) \\ r^3=(27)/(8) \\ r=\sqrt[3]{(27)/(8)} \\ r=(3)/(2) \end{gathered}$

The common ratio is 3/2.

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