both of them hold 8 bytes, but how come the max value for double is much greater than the max value of long? there is a finite number of bits available, so how could you reach greater numbers with floating point variables?
It uses a different representation (floating point) using exponents and mantissa For details see IEEE754 


A double has something called an exponent, which is basically just a scaling factor. This allows the range of double to be much greater, but at the cost of precision. A long is a simple integer value with no scaling factor. 


Floating point numbers consist of a mantissa and an exponent, and the value of a floating point number is: mantissa * 2^{exponent} The exponent in a Double is 11 bits, so the maximum value is of the magnitude 2^{211} = 2^{2048} (this isn't quite exact, but gives you an idea of the magnitude), which is way more than the magnitude of a 64bit signed double, which is 2^{63}1. 


Because floatingpoint representation is of lower precision. While Since they occupy same amount of bits, the amount of numbers each is capable to express are nearly equal (actually, 


What language is this? Long is only 4 bytes in some languages (C/C++ for example) 

