TODO LIST
  ---------
  
  POW{cond}<S|D|E>{P,M,Z} Fd, Fn, <Fm,#value> - power
  RPW{cond}<S|D|E>{P,M,Z} Fd, Fn, <Fm,#value> - reverse power
  POL{cond}<S|D|E>{P,M,Z} Fd, Fn, <Fm,#value> - polar angle (arctan2)
  
  LOG{cond}<S|D|E>{P,M,Z} Fd, <Fm,#value> - logarithm to base 10
  LGN{cond}<S|D|E>{P,M,Z} Fd, <Fm,#value> - logarithm to base e 
  EXP{cond}<S|D|E>{P,M,Z} Fd, <Fm,#value> - exponent
  SIN{cond}<S|D|E>{P,M,Z} Fd, <Fm,#value> - sine
  COS{cond}<S|D|E>{P,M,Z} Fd, <Fm,#value> - cosine
  TAN{cond}<S|D|E>{P,M,Z} Fd, <Fm,#value> - tangent
  ASN{cond}<S|D|E>{P,M,Z} Fd, <Fm,#value> - arcsine
  ACS{cond}<S|D|E>{P,M,Z} Fd, <Fm,#value> - arccosine
  ATN{cond}<S|D|E>{P,M,Z} Fd, <Fm,#value> - arctangent
  
  These are not implemented.  They are not currently issued by the compiler,
  and are handled by routines in libc.  These are not implemented by the FPA11
  hardware, but are handled by the floating point support code.  They should 
  be implemented in future versions.
  
  There are a couple of ways to approach the implementation of these.  One
  method would be to use accurate table methods for these routines.  I have 
  a couple of papers by S. Gal from IBM's research labs in Haifa, Israel that
  seem to promise extreme accuracy (in the order of 99.8%) and reasonable speed.
  These methods are used in GLIBC for some of the transcendental functions.
  
  Another approach, which I know little about is CORDIC.  This stands for
  Coordinate Rotation Digital Computer, and is a method of computing 
  transcendental functions using mostly shifts and adds and a few
  multiplications and divisions.  The ARM excels at shifts and adds,
  so such a method could be promising, but requires more research to 
  determine if it is feasible.
  
  Rounding Methods
  
  The IEEE standard defines 4 rounding modes.  Round to nearest is the
  default, but rounding to + or - infinity or round to zero are also allowed.
  Many architectures allow the rounding mode to be specified by modifying bits
  in a control register.  Not so with the ARM FPA11 architecture.  To change
  the rounding mode one must specify it with each instruction.
  
  This has made porting some benchmarks difficult.  It is possible to
  introduce such a capability into the emulator.  The FPCR contains 
  bits describing the rounding mode.  The emulator could be altered to 
  examine a flag, which if set forced it to ignore the rounding mode in
  the instruction, and use the mode specified in the bits in the FPCR.
  
  This would require a method of getting/setting the flag, and the bits
  in the FPCR.  This requires a kernel call in ArmLinux, as WFC/RFC are
  supervisor only instructions.  If anyone has any ideas or comments I
  would like to hear them.
  
  [NOTE: pulled out from some docs on ARM floating point, specifically
   for the Acorn FPE, but not limited to it:
  
   The floating point control register (FPCR) may only be present in some
   implementations: it is there to control the hardware in an implementation-
   specific manner, for example to disable the floating point system.  The user
   mode of the ARM is not permitted to use this register (since the right is
   reserved to alter it between implementations) and the WFC and RFC
   instructions will trap if tried in user mode.
  
   Hence, the answer is yes, you could do this, but then you will run a high
   risk of becoming isolated if and when hardware FP emulation comes out
  		-- Russell].