Given that, the variable z is directly proportional to x, and inversely proportional to y.
So, we can set up an equation as following:
[tex] z= k \frac{x}{y} [/tex] Where k = constant of variation.
Another information given in the problem is, when x is 9 and y is 6, z has the value 19.5.
So, x = 9, y = 6 and z = 19.5.
Let's plug in these values in the above equation. So,
[tex] 19.5= k \frac{9}{6} [/tex]
19.5 = k* 1.5
[tex] \frac{19.5}{1.5} =k [/tex] Divided each sides by 1.5 to isolate k.
So, k = 13.
Hence, the equation will be [tex] z= 13 \frac{x}{y} [/tex].
Now we need to find the value of z when x= 14, and y= 11 . Therefore,
[tex] z= 13*\frac{14}{11} [/tex]
[tex] z= \frac{182}{11} [/tex]
So, z= 16.5 (Rounded to tenth).
Hope this helps you!
