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Consider the sequence shown. 436, 218, 109, 54.5, 27.25,... Select the correct explicit formula for the sequence. a g_n=0.5·436^{(n-1)} b g_n=436·2^{(n-1)} c g_n=436·0.5^{(n-1)}…

Consider the sequence shown. 436, 218, 109, 54.5, 27.25,... Select the correct explicit formula for the sequence. a g_n=0.5·436^{(n-1)} b g_n=436·2^{(n-1)} c g_n=436·0.5^{(n-1)}…
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12 votes
Consider the sequence shown.

436, 218, 109, 54.5, 27.25,...



Select the correct explicit formula for the sequence.

a
g_n=0.5·436^{(n-1)}

b
g_n=436·2^{(n-1)}

c
g_n=436·0.5^{(n-1)}

d
g_n=2·436^{(n-1)}

User Chanaka Weerasinghe
by
8.1k points

1 Answer

8 votes

Given:

The sequence is

436, 218, 109, 54.5, 27.25,...

To find:

The explicit formula for the given sequence.

Solution:

We have,

436, 218, 109, 54.5, 27.25,...

It is a GP because the two consecutive terms have common ratio.

Here,

First term : a=436

Common ratio : d =
(218)/(436)

=
(1)/(2)

=
0.5

Now, the explicit formula for a GP is


g_n=ar^((n-1))

Where, a is the first term and r is the common ratio.

Putting a=436 and r=0.5, we get


g_n=436(0.5)^((n-1))

Therefore, the correct option is c.

User Fgasparini
by
8.1k points
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