I know about weird stuff with precision errors, but I can't fathom,
Why is (long)9223372036854665200d
giving me 9223372036854665216
?
I know about weird stuff with precision errors, but I can't fathom, Why is 


The nearest If we decrease the mantissa one notch to The original number is between Finally, if you think that this truncation of the mantissa ought to result in a number that ends in a bunch of zeros, you're right. Only it happens in binary, not in decimal: 


Because doubles don't have that much precision. Why are you doing such a strange thing? Change the d to l. 


Your number is 19 digits long, whereas a double can only store roughly 16 digits of (decimal) integer data. Thus the final number ends up being rounded. Reference: Double  Wikipedia 


Because doubles have limited precision. Your constant has more significant digits than a double can keep track of, so it loses them. 


You are assuming that limited precision means that it is represented in decimal so is limited to 15 or 16 digits. Actually it is represented in binary and limited to 53 bits of precision.
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