Answer:
1) The function that models the inverse variation is: y=664/x
2) When x=4, y = 166
Step-by-step explanation:
If x and y vary inversely, then:
y=k/x
where k is a constant. We know that y=83 when x=8, then, replacing in the equation above:
83=k/8
Solving for k: Multiplying both sides of the equation by 8:
8(83)=8(k/8)
664=k
k=664
Then, the function that models the inverse variation is:
y=664/x
2) when x=4:
y=664/x
y=664/4
y=166
Answer:
y = 664/x
y = 166 when x =4.
Step-by-step explanation:
Suppose that x and y vary inversely
y ∝ 1/x
y = k/x eq(1)
where k is constant.
Since we have given that
y = 83 when x = 8
Using above values we have to find the value of constant.
83 =k/8
Multiplying above equation by 8,we get
83(8) = (k/8)8
664 = k
Putting the value of constant in eq(1),we get
y = 664/x is equation that models the inverse variation.
We have to find y when x = 4.
y = 664/4
y = 166 when x =4.
