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Jordi Cruzado · Answer 1 · 2023-11-16T00:46:12+0000

Recall:

$\begin{gathered} \text{ Direct Variation is y = }kx \\ \text{ Inverse Variation is y = }(k)/(x) \end{gathered}$

If z varies directly with x, that will be z = kx

If z varies inversely with y, that will be z = k/y

Combining the two equations, we get:

$\text{ z = }\frac{\text{ kx}}{\text{ y}}$

We will be using the first set of values to solve for the constant of variation k.

At x = 2, y = 5 and z = 10,

We get,

$\text{ z = }\frac{\text{ kx}}{\text{ y}}$
$\text{ 10 = }(2k)/(5)$
$\text{ }\frac{\text{10 x 5}}{2}\text{ = }k$
$\text{ 25 = k}$

Now apply the constant k with the second values to solve for z.

At x = 3 and y = 15,

We get,

$\text{ z = }\frac{\text{ kx}}{\text{ y}}$
$\text{ z = }\frac{\text{ 25x}}{\text{ y}}$
$\text{ z = }\frac{\text{ 25 x 3}}{\text{ 1}5}$
$\text{ z = }\frac{\text{ 7}5}{\text{ 1}5}$
$\text{ z = 5}$

Therefore, z = 5

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