Curl
-
Upload
kushagra-ganeriwal -
Category
Engineering
-
view
296 -
download
0
Transcript of Curl
CURL and its applicationsPREPARED BY:
KUSHAGRA GANERIWAL (130010111009)
GUIDED BY:PROF. SHAILESH KHANT (EC DEPT.)
kyP
xQj
xR
zPi
zQ
yRcurlF )()()(
vector
RQPzyx
kji
FFcurl
Cross product of the del operator and the vector F
0) ( ffgradcurl
0)() ( FFcurldiv
WHY Vector Fields
The motion of a wind or fluid can be described by a vector field.
The concept of a force field plays an important role in mechanics, electricity, and magnetism.
Physical InterpretationsCurl was introduced by Maxwell
James Clerk Maxwell (1831-1879) Scottish Physicist [b. Edinburgh, Scotland, June 13, 1831, d. Cambridge, England, November 5, 1879] He published his first scientific paper at age 14, entered the University of Edinburgh at 16, and graduated from Cambridge University.
Physical Interpretations Curl is easily understood in connection with the flow of fluids. If a
paddle device, such as shown in fig, is inserted in a flowing fluid, the the curl of the velocity field F is a measure of the tendency of the fluid to turn the device about its vertical axis w.
If curl F = 0 then flow of the fluid is said to be irrotational. Which means that it is free of vortices or whirlpools that would cause the paddle to rotate.
Note: “irrotational” does not mean that the fluid does not rotate.
Physical Interpretations
The volume of the fluid flowing through an element of surface area per unit time that is , the flux of the vector field F through the area.
The divergence of a velocity field F near a point p(x,y,z) is the flux per unit volume.
If div F(p) > 0 then p is said to be a source for F. since there is a net outward flow of fluid near p
If div F(p) < 0 then p is said to be a sink for F. since there is a net inward flow of fluid near p
If div F(p) = 0 then there are no sources or sinks near p.
The divergence of a vector field can also be interpreted as a measure of the rate of change of the density of the fluid at a point.
If div F = 0 the fluid is said to be incompressible
zR
yQ
xPdivF