L7 Level Curves and Surfaces

Download Report

Transcript L7 Level Curves and Surfaces

LEVEL CURVES AND
LEVEL SURFACES
MATH23
MULTIVARIABLE CALCULUS
GENERAL OBJECTIVE
At the end of the lesson the students are expected to:
• Determine graphs of the level curves of a given function
• Sketch and identify the level surfaces of a function
Definition
If the surface z = f(x,y) is cut by the horizontal
plane z = k, then at all points on the
intersection we have f(x,y) = k.
The projection of this intersection onto the
xy-plane is called the level curve of height k.
A set of level curves for z = f(x,y) is called
a contour plot or contour map of f.
Level Curve
Level Curves
Example
Example
Example
Example
Example
Example
Example
Level Surfaces
• Given w = f(x,y,z) then a level surface is obtained by
considering w = c = f(x,y,z). The interpretation being
that on a level surface f has the same value at every
point.
• For example f could represent the temperature at
each pt in 3-space. Then on a level surface the
temperature is the same at every point on that
surface
• f(x,y,z) = x2 +y2 +z2. Here the Level surfaces are
concentric spheres centered at the origin.
• As we move away from the origin the temperature increases
and the spheres become closer. The temperature increases at
an increasing rate. Here the surfaces corresponds to f =
4,8,12,and 16
• Example 2
• f(x,y,z) = x2 +z2 ,
the level Surfaces are the
concentric cylinders
x2 +z2 = c
with the main axis along the y- axis.
With some adjustments of constants
these level surfaces could represent the
electric field of a line of charge along the y axis.
Here we have f = 2,4,8,12, and 16.
f(x.y,z) = x2 +y2 +z .
The level surfaces are the parabaloids
z = c – x2 –y
The level surface of
• F(x,y,z)=cos(z) e-x2+y2
Example
Example