Looking at Figure 2.2 we see that the graph looks like the topography of a mountain range. On maps the topography is usually represented by lines of equal altitude. We can do this as well in our case. We specify a “level” \(c\) and look at the set of all \((x,y)\in D\) such that \(f(x,y)=c\text{.}\) Such a line is called a contour line. Drawing several such lines for equally spaced levels we get what we will call a contour map. The contour map of the function from Figure 2.2 is depicted in Figure 2.3. The numbers on the contour lines indicate their levels.
Figure2.3.Contour map of \(f(x,y):=5y(1-y^2)(1/2-x^2)-x\text{.}\)
Here are some examples on how to find contour lines.
Example2.4.
Find the contour lines \(f(x,y)=x^2+y^2=c\) for \(c=0,\pm 1\text{.}\)
Solution.
The contour “line” for \(c=0\) just consists of one point, namely \((0,0)\text{.}\) As \(x^2+y^2\geq 0\) for all \((x,y)\) the contour line for \(c=-1\) is empty. For \(c=1\) the contour line is a circle about the origin with radius one.
For general \(c\gt 0\) the contour line is a circle of radius \(\sqrt{c}\) as shown in Figure 2.5.
(a)Contour map
(b)Graph
Figure2.5.Contour map and graph of \(f(x,y)=x^2+y^2\text{.}\)
Example2.6.
Sketch the contour map of the function \(f(x,y)=x^2-y^2\text{.}\)
Solution.
We have to solve the equations \(c=x^2-y^2\text{.}\) For \(c=0\) we have the lines \(y=\pm x\text{.}\) If \(c\gt 0\) then we have \(x=\pm\sqrt{y^2+c}\text{,}\) so we get a pair of hyperbolas. Similarly, if \(c\lt 0\) we have \(y=\pm\sqrt{x^2-c}\) which is defined everywhere since \(-c\gt 0\text{.}\) Hence we have another pair of hyperbolas, but turned by \(90^\circ\) as shown in Figure 2.7.
(a)Contour map
(b)Graph
Figure2.7.Contour map and graph of \(f(x,y):=x^2-y^2\text{.}\)
