394 Introduction to functions (Chapter 19)The hyperbolic shape is also noticed in the home when a lamp is close to a wall.
The light and shadow form part of a hyperbola on the wall.There are many situations in which two quantities varyinversely.
They form a relationship which can be described using a reciprocal
function.
For example, the pressure and volume of a gas at room temperature
vary inversely according to the equation P=77 : 4
V
.
IfPis graphed againstV, the curve is one branch of a hyperbola.Discovery 2 The family of curves y=
k
x, k 6 =0
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In this discovery you should use agraphing packageorgraphics calculatorto drawcurves of the form y=k
xwhere k 6 =0.
What to do:
1 On the same set of axes, draw the graphs of y=1
x, y=4
xand y=8
x:
2 Describe the effect of the value ofkon the graph for k> 0.3 Repeat 1 for y=¡ 1
x, y=¡ 4
xand y=¡ 8
x:
4 Comment on the change in shape of the graph in 3.
5 Explain why there is no point on the graph whenx=0.
6 Explain why there is no point on the graph wheny=0.You should have noticed that functions of the form y=kx are
undefined when x=0.
On the graph we see that the function is defined for values ofx
getting closer and closer to x=0, but the function never reaches
the line x=0. We say that x=0is avertical asymptote.
Likewise, as the values ofxget larger, the values ofyget closer
to 0 , but never quite reach 0. We say that y=0is ahorizontal
asymptote.The graph of y=2
x¡ 1
alongside is undefined whenx¡1=0,
which is when x=1. It has the vertical asymptote x=1.
As the values ofxget larger, the values ofyapproach, but never
quite reach, 0.
The graph has the horizontal asymptote y=0.P¡()kPa5 10 15 20 25 V¡()m^325
20
15
10For1kgofO
at 25°C2OGRAPHING
PACKAGEyO xx
y=kyxO12- =
x
y
x¡=¡1y¡=¡0IGCSE01
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y:\HAESE\IGCSE01\IG01_19\394IGCSE01_19.CDR Wednesday, 8 October 2008 10:22:07 AM PETER