Given two terms from a geometric sequence, identify the first term and the common ratio: a10 = 1 and a12=1/25

asked Apr 14, 2023 48.9k views

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4 votes

Given:

a denotes first term and r denotes the common ratio.

$a_(10)=1\colon a_(12)=(1)/(25)$
a_n=ar^(n-1)

$1=ar^9\ldots.\text{ (1) }$
a_(12)=ar^(12-1)

$(1)/(25)=ar^(11)\ldots.(2)$

Divide the equation (2) by (1)

$r=\pm(1)/(5)$
$\text{If r=}(1)/(5)$
1=a((1)/(5))^9

$\text{If r=-}(1)/(5)$
1=a(-(1)/(5))^9

$a=-1953125\text{ ; r = -}(1)/(5)$
$a=1953125\text{ ; r = }(1)/(5)$

Melton answered Apr 20, 2023

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