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I'm attempting Mathematica programming, and thought I'd try a calculation that I did by hand manually (a magnetic field phasor calculation from an E&M class), using spherical polar coordinates. I've created a variable and tried to take it's curl:

SetAttributes[ k, Constant ]
eE := {0, 0, (Sin[Ttheta]/Rr) ( 1 - I/(k Rr)) e^{I k Rr}}
Curl[ eE ]

This doesn't actually evaluate the derivatives like I thought it would, giving only:

                I k Rr
               e       (-I + k Rr) Sin[Ttheta]
\[Curl]{0, 0, {-------------------------------}}
                  k Rr

Basically, it is just spitting my input back out to me as output. Simplify and FullSimplify don't change the result.

One guess that I had was that this was because I hadn't specified k as a constant so I added that (as above), but this didn't make a difference.

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2 Answers 2

up vote 3 down vote accepted

change e^{I k Rr} to E^(I k Rr).

  1. {} means a vector, and Mathematica accepts vectors for all its functions, but outputs a vector, which is not what you want. For example, e^{1,2,3} becomes {e^1, e^2, e^3}. Thus the way you written the expression you have a one element list in position three of the first list, which throw Mathematica off.

  2. The constant e is E in Mathematica.

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Thanks. I had naively assumed the input syntax was latex like. –  Peeter Joot Mar 12 '11 at 3:19
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Two problems:

First, in Mathematica the symbol E, not e, is the exponential constant e.

Second, you're raising E to the power of a list ({...}, aka List[...]), where I think you instead meant to use parens:

In[17]:= eE:={0,0,(Sin[Ttheta]/Rr) (1-I/(k Rr)) E^(I k Rr)}
In[18]:= Curl[eE]

Out[18]= {(2 E^(I k Rr) (1-I/(k Rr)) Cos[Ttheta])/Rr^2, (Csc[Ttheta]
  (-I E^(I k Rr) k (1-I/(k Rr)) Sin[Ttheta]^2-(I E^(I k Rr) 
  Sin[Ttheta]^2)/(k Rr^2)))/Rr,0}


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What is the easiest way to plot this field? –  belisarius Mar 11 '11 at 12:12
I think VectorPlot3D and a change-of-coordinates is one option: k = 10; VectorPlot3D[curl /. Thread[{Rr, Ttheta, Pphi} -> CoordinatesFromCartesian[{x, y, z}]], {x, -1, 1}, {y, -1, 1}, {z, -1, 1}] –  Michael Pilat Mar 12 '11 at 4:53
Works like a charm. Never used Coordinates...[ ] like that. Seems very useful. Thanks. –  belisarius Mar 12 '11 at 5:28
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