Question

How do you find the common ratio for `64,-32,16,-8,4,...`?

Answer 1

Common ratio is `-1/2`

Explanation:

In a Geometric series, common ratio is the ratio of a term with respect to its preceding term.

Here we have the series `{64,-32,16,-8,4,.................}`

and hence common ratio is `-32/64=16/(-32)=-8/16=4/(-8)=-1/2`

Answer 2

Common ratio: `color(green)(-1/2)`

Explanation:

Let the ratio between successive terms `a_n` and `a_(n+1)` be `r_n=(a_(n+1))/(a_n)`

Then for the given terms: `64,-32,16,-8,4, ...`
`color(white)("XX")r_1=(-32)/64 = -1/2`

`color(white)("XX")r_2=16/(-32) = -1/2`

`color(white)("XX")r_3=(-8)/16= -1/2`

`color(white)("XX")r_4=4/(-8) = -1/2`

assuming this pattern holds for subsequent (unspecified) terms,
we can see that there is a common ration of `(-1/2)`