In a geometric sequence, A1 = 0.3 and r=3.Find A12, to the nearest integer

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Polkas · Answer 1 · 2021-05-26T02:18:41+0000

Explanation:

We have,

First terms of geometric sequence, a = 0.3

Common ratio, r = 3

It is required to find the 12th term of a GP. The formula of the nth term is given by :

T_n=ar^(n-1)

Here, n =12

So,

$T_(12)=0.3* 3^(12-1)\\\\T_(12)=0.3* 3^(11)\\\\T_(12)=53144.1$

or

T_(12)=53144

So, the 12th term of the GP is 53144.

In a geometric sequence, A1 = 0.3 and r=3.Find A12, to the nearest integer

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