I am looking for suggestions on how to find the sizes (in bits) and range of floating point numbers in an architecture independent manner. The code could be built on various platforms (AIX, Linux, HPUX, VMS, maybe Windoze) using different flags  so results should vary. The sign, I've only seen as one bit, but how to measure the size of the exponent and mantissa?
Since you're looking at building for a number of systems, I think you may be looking at using GCC for compilation. Some good info on floating point  this is what almost all modern architectures use: http://en.wikipedia.org/wiki/IEEE_754 This details some of the differences that can come up http://www.networktheory.co.uk/docs/gccintro/gccintro_70.html 


Have a look at the values defined in 


As you follow the links suggested in previous comments, you'll probably see references to What Every Computer Scientist Should Know About Floating Point Arithmetic. By all means, take the time to read this paper. It pops up everywhere when floating point is discussed. 


Its relatively easy to find out: Decimal or binary;
Reason: All binary systems can represent 2.0, but any binary system will have an error term for representing 0.1. By accumulating you can be sure that this error term will not vanish like in rounding: e.g. 1.0 == 3.0*(1.0/3.0) even in binary systems Mantissa length:
You are adding decreasing terms until you reach the capacity of the mantissa. It gives back 24 bits for float and 53 bits for double which is correct (The mantissa itself contains only 23/52 bits, but as the first bit is always one on normalized values, you have a hidden extra bit). Exponent length:
You are shifting 1.0 to the left or to the right until you hit the top or the bottom.
Normally the exp range is If 


The number of bits used to store each field in a floating point number doesn't change.
EDIT: As Jonathan pointed out in the comments, I left out the long double type. I'll leave its bit decomposition as an exercise for the reader. :) 

