� 4 � 3 � 2 � 1 1 2 3 4� 4� 3� 2� 112340h(x) =^1
xxh(x)Forx= 0the functionhis undefined. This is called a discontinuity atx= 0.
y=h(x) =
1
xtherefore we can write thatxy= 1. Since the product of two positive numbersandtheproduct of two negative numbers can be equal to 1, the graph lies in the first and third quadrants.
Step 3: Determine the asymptotes
As the value ofxgets larger, the value ofh(x)gets closer to, but does not equal 0. This is a horizontal asymptote,
the liney= 0. The same happens in the third quadrant; asxgets smallerh(x)also approaches the negative
x-axis asymptotically.
We also notice that there is a vertical asymptote, the linex= 0; asxgets closer to 0,h(x)approaches the
y-axis asymptotically.
Step 4: Determine the range
Domain:fx:x 2 R; x̸= 0g
From the graph, we see thatyis defined for all values except 0.
Range:fy:y 2 R; y̸= 0g
Step 5: Determine the lines of symmetry
The graph ofh(x)has two axes of symmetry: the linesy=xandy=�x. About these two lines, one half of
the hyperbola is a mirror image of the other half.
Functions of the formy=
a
x+q EMA4R
Investigation: The effects ofaandqon a hyperbola.On the same set of axes, plot the following graphs:
1.y 1 =1
x� 2
2.y 2 =1
x� 1
Chapter 6. Functions 169