The $4^{t h}$ term of a G.P. is square of its second term, and the first term is $- 3$ . Determine its $7^{t h}$ term.

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Solution

Let $a$ be the first term and $r$ be the common ratio of the given G.P.
$∴ a = - 3$
It is known that, $a^{n} = {a r}^{n - 1}$
$∴ a_{4} = a r^{3} = (- 3) r^{3}$ and $a_{2} = a r^{1} = (- 3) r$
Now according to the given condition,
$(- 3) r^{3} = {[(- 3) r]}^{2} \Rightarrow - 3 r^{3} = 9 r^{2} \Rightarrow r = - 3 ∴ a_{7} = a r^{7 - 1} = a r^{6} = (- 3) {(- 3)}^{6} = - {(3)}^{7} = - 2187$
Thus the seventh term of the G.P. is $- 2187.$

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