What is the explicit rule for this geometric sequence?

29,23,2,6,...

an=29⋅3n

an=3(29)n−1

an=3(29)n

an=29⋅3n−1

What is the explicit rule for this geometric sequence?

29,23,2,6,...

For n=0 we have
an=29⋅3n=0≠29
an=3(29)n−1= -1≠29
an=3(29)n=0≠29
an=29⋅3n−1=-1≠29

And
For n=1 we have
an=29⋅3n=78≠29
an=3(29)n−1=77≠29
an=3(29)n=78≠29
an=29⋅3n−1=-77≠29

All four formulas are non-correct

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flightbath flightbath · Answer 2 · 2018-12-02T08:43:12+01:00

flightbath flightbath

02-12-2018

Answer:

None of the four options are discarded.

Step-by-step explanation:

We have been given a sequence 29,23,2,6......

Which is neither an arithmetic progression nor a geometric progression.

So, we can not get the explicit formula for such sequences since, there is no pattern followed.

Hence, All four options are discarded.

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What is the explicit rule for this geometric sequence? 29,23,2,6,... an=29⋅3n an=3(29)n−1 an=3(29)n an=29⋅3n−1

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What is the explicit rule for this geometric sequence?

29,23,2,6,...

an=29⋅3n

an=3(29)n−1

an=3(29)n

an=29⋅3n−1