There are a few numerical methods to see if you're going to lose precision, but the bottom line is that you need to understand the definition of precision better.

-4939600281397002.2812

and

-4939600281397002.2812000000000000

are NOT the same number.

When you add

-2234.6016114467412141

and

-4939600281397002.2812

together, the *correct* output will only have 20 digits of precision, because the additional 12 digits in the smaller number are meaningless given that the 12 similarly sized digits in the larger number are *unknown*. You can imply that they are zero, but if that's the case then you must explicitly declare them to be as such, and use a numbering system that can handle it - the computer is not good at understanding implicit intentions.

As far as detecting when you are going to have this problem, all you need to do is find out if they have the same exponent (assuming a normalized mantissa +/- 1 or similar binary equivalent). If they aren't normalized, then you'll need to normalize them to compare, or use a slightly more complex comparison with the exponent.

Precision and accuracy are not the same thing...