I do not recognize your output samples as encodings of floating-point numbers or other common representations of .1 and .058. I suspect these numbers are addresses where the assembler or compiler has stored the floating-point encoding.
In other words, you wrote some text that including a floating-point literal, and the assembler or compiler converted that literal to a floating-point encoding, stored it at some address, and then put the address into an instruction that loads the floating-point encoding from memory.
This hypothesis is consistent with the fact that the two numbers differ by eight. Since double-precision floating-point is commonly eight bytes, the second address (0x415748) was eight bytes beyond the first address (0x415740).
The process for encoding a number in floating-point is roughly this:
Let x be the number to be encoded.
Set s (a sign bit) to 0 if x is positive and to 1 if x is negative. Set x to the absolute value of x.
Set e (an exponent) to 0. Repeat whichever of the following is appropriate:
- If x is 2 or greater, add 1 to e and divide x by 2. Repeat until x is less than 2.
- If x is less than 1, add -1 to e and multiply x by 2. Repeat until x is at least 1.
When you are done with the above, x is at least 1 and is less than 2. Also, the original number equals (-1)s·2e·x. That is, we have represented the number with a sign bit (s), and exponent of two (e), and a significand (x) that is in [1, 2) (includes 1, excludes 2).
Set f = (x-1)·252. Round f to the nearest integer (if it is a tie between two integers, round to the even integer). If f is now 252, set f to 0 and add 1 to e. (This step finds the 52 bits of x that are immediately after the “decimal point“ when x is represented as a binary numeral, with rounding after the 52nd digit, and it adjusts the exponent if rounding at that position rounds x up to 2, which is out of interval where we want it.)
Add 1023 to e. This has no numerical significance with regard to x; it is simply part of the floating-point encoding. When decoding, 1023 gets subtracted.
Now, convert s, e, and f to binary numerals, using exactly one digit for s, 11 digits for e, and 52 digits for f. If necessary, including leading zeroes so that e is represented with exactly 11 binary digits and f is represented with exactly 52 binary digits. Concatenate those digits, and you have 64 bits. That is the common IEEE 754 encoding for a double-precision floating-point number.
There are some special cases: If the original number is zero, use zero for s, e, and f. (s can also be 1, to represent a special “negative zero“. If, before adding 1023, e is less than -1022, then some adjustments have to be made to get a “denormal“ result or zero, which I do not describe further at the moment. If, before adding 1023, e is more than 1023, then the magnitude of the number is too large to be represented in floating point. It can be encoded as infinity instead, by setting e (after adding 1023) to 2047 and f to zero.