1 Answer

John Roca · Answer 1 · 2023-12-14T08:30:28+0000

Recall that y varies inversely with x if and only if exist a constant k such that:

$y=(k)/(x)\text{.}$

Since g(n) varies inversely with n, we can set the following equation:

$g(n)=(k)/(n)\text{.}$

Now, we know that g(n)=13 when n=2, then:

$13=(k)/(2)\text{.}$

Multiplying the above equation by 2 we get:

$\begin{gathered} 13*2=(k)/(2)*2, \\ 26=k\text{.} \end{gathered}$

Therefore:

$g(n)=(26)/(n)\text{.}$

Setting g(n)=4 we get:

$4=(26)/(n)\text{.}$

Multiplying the above equation by n we get:

$\begin{gathered} 4* n=(26)/(n)* n, \\ 4n=26. \end{gathered}$

Dividing the above equation by 4 we get:

$\begin{gathered} (4n)/(4)=(26)/(4), \\ n=6.5. \end{gathered}$

Answer: n=6.5.

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