To solve this problem, we start with the concept of joint variation. The relationship can be expressed with the formula:
x = k imes y imes z
where k is the constant of variation.
Step 1: Find the constant of variation (k)
We know from the question that when x = 8, y = 4, and z = 9. We can substitute these values into the joint variation equation to find k.
So, we have:
8 = k imes 4 imes 9
This simplifies to:
8 = 36k
Now, to isolate k, we divide both sides by 36:
k = 8 / 36
Reducing the fraction gives us:
k = 2 / 9
Step 2: Use k to find z when x = 16 and y = 6
Now that we have the value of k, we can find z when x = 16 and y = 6.
We substitute the known values into the joint variation equation:
16 = (2/9) imes 6 imes z
First, compute (2/9) imes 6:
(2/9) imes 6 = 12 / 9 = 4 / 3
Now, we rewrite the equation:
16 = (4/3) imes z
To find z, multiply both sides of the equation by the reciprocal of (4/3), which is (3/4):
z = 16 imes (3/4)
Calculating this gives:
z = 16 imes 0.75 = 12
Conclusion
The value of z when x = 16 and y = 6 is 12.