Question 1

What’s the 13th term i this sequence 32768,16384,8192...

Question 2

EXPLANATION

$\mathrm{A\: geometric\: sequence\: has\: a\: constant\: ratio\: }r\mathrm{\: and\: is\: defined\: by}\: a_n=a_0\cdot r^(n-1)$

Compute the ratios of all the adjacent terms: r=(a_n+1)/(a_n)

$(16384)/(32768)=(1)/(2),\: \quad (8192)/(16384)=(1)/(2)$
$\mathrm{The\: ratio\: of\: all\: the\: adjacent\: terms\: is\: the\: same\: and\: equal\: to}$
r=(1)/(2)

$\mathrm{The\: first\: element\: of\: the\: sequence\: is}$
a_1=32768

$a_n=a_1\cdot r^(n-1)$
$\mathrm{Therefore,\: the\: }n\mathrm{th\: term\: is\: computed\: by}\:$
$r=(1)/(2),\: a_n=32768\mleft((1)/(2)\mright)^(n-1)$

Hence, the 13th term would be:

$a_(13)=32768((1)/(2))^(13-1)=32768((1)/(2))^(12)=32768\cdot(1)/(4096)=8$

The answer is n_13=8

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