The 24th bit is implicit due to normalization.
The significand is shifted left (and one subtracted from the exponent for each bit shift) until the leading bit of the significand is a 1.
Then, since the leading bit is a 1, only the other 23 bits are actually stored.
There is also the possibility of a denormal number. The exponent is stored as a "bias" format signed number, meaning that it's an unsigned number where the middle of the range is defined to mean
01. So, with 8 bits, it's stored as a number from 0..255, but 0 is interpreted to mean -128, 128 is interpreted to mean 0, and 255 is interpreted as 127 (I may have a fencepost error there, but you get the idea).
If, in the process of normalization, this is decremented to 0 (meaning an actual exponent value of -128), then normalization stops, and the significand is stored as-is. In this case, the implicit bit from normalization it taken to be a 0 instead of a 1.
Most floating point hardware is designed to basically assume numbers will be normalized, so they assume that implicit bit is a 1. During the computation, they check for the possibility of a denormal number, and in that case they do roughly the equivalent of throwing an exception, and re-start the calculation with that taken into account. This is why computation with denormals often gets drastically slower than otherwise.
- In case you wonder why it uses this strange format: IEEE floating point (like many others) is designed to ensure that if you treat its bit pattern as an integer of the same size, you can compare them as signed, 2's complement integers and they'll still sort into the correct order as floating point numbers. Since the sign of the number is in the most significant bit (where it is for a 2's complement integer) that's treated as the sign bit. The bits of the exponent are stored as the next most significant bits -- but if we used 2's complement for them, an exponent less than 0 would set the second most significant bit of the number, which would result in what looked like a big number as an integer. By using bias format, a smaller exponent leaves that bit clear, and a larger exponent sets it, so the order as an integer reflects the order as a floating point.