1. Graphing Inverse Variations

2. A relationship that can be written in the form
, where k is a nonzero constant and x ≠ 0, is an inverse variation.
The constant k is the constant of variation.
Inverse variation implies that one quantity will increase while the other quantity will decrease (the inverse, or opposite, of increase).

3. The graphs of inverse variations have two parts. Ex
The graphs of inverse variations have two parts. Ex. f(x) = Each part is called a branch.

4. The domain is all real numbers except zero. Why?
Since x is in the denominator, the only restriction we would have is any numbers we can’t divide by. The only number we cannot divide by is zero.

5. The range is all real numbers except zero.
Why?
Since k is a nonzero number, and x is a nonzero number, there is NO WAY y will ever be zero!

6. Since both the domain and range have restrictions at zero, the graph can never touch the x and y axis.
This creates asymptotes at the axis.

7. y=
When k is positive, the branches are in Quadrants I and III.
When k is negative, the branches are in Quadrants II and IV.

8. Translations of Inverse Variations:
The graph of y =
is a translation of y = k/x, b units horizontally and c units vertically.
The vertical asymptote is x = b.
The horizontal asymptote is y =c.

9. = the distance from the asymptote
Translations of Inverse Variations:
The graph of y =
k tells us how far the branches have been stretched from the asymptotes.
We can use it to help us find out corner points to start our branches.
= the distance from the asymptote

10. Vertical Asymptote:
Horizontal Asymptote:
Branch Quadrants:
Distance:

11. Vertical Asymptote:
Horizontal Asymptote:
Branch Quadrants:
Distance:

12. We can also write the equation just given the parent function and the asymptotes.
Write the equation of y = -1/x that has asymptotes x = -4 and y = 5.

13. Write the equation of y = 1/x that has asymptotes x = 3 and y = -2.