Yes, all normalised numbers (other than the zeroes) have that bit set to one ^{(a)}, so they make it implicit to prevent wasting space storing it.

In other words, they save that bit totally, and reuse it so that it can be used to increase the precision of your numbers.

Keep in mind that this is the first bit of the fraction, *not* the first bit of the binary pattern. The first bit of the binary pattern is the sign, followed by a few bits of exponent, followed by the fraction itself.

For example, a single precision number is (sign, exponent, fraction):

```
<1> <--8---> <---------23----------> <- bit widths
s eeeeeeee fffffffffffffffffffffff
```

If you look at the way the number is calculated, it's:

`(-1)`^{sign} x 1.fraction x 2^{exponent-bias}

So the fractional part used for calculating that value is `1.fffff...fff`

(in binary).

^{(a)} There is actually a class of numbers (the denormalised ones and the zeroes) for which that property does *not* hold true. These numbers all have a biased exponent of zero but the vast majority of numbers follow the rule.