# machine numbers in IEEE single precision

Is the following numbers machines numbers on the IEEE single precision system?

$10^{304}$

$2^4+2^{27}.$

What do I have to do to know whether they are machine numbers on IEEE single precision?

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I'd say that the correct statement of the question is rather: Are the following numbers representable in the IEEE single-precision format? – leonbloy Dec 9 '12 at 0:38

A number $x$ is representable in IEEE single-precision format if it can be written in the form $$x = S\cdot 2^{e}$$ for an integer $S$ between $-(2^{24}-1)$ and $+(2^{24}-1)$ and an integer $e$ between -126 and +127.
In particular, $10^{304}$ can't, because it is much too big, but $2^4+2^{27}$ can: we can factor out $2^4$ from both terms to get:
$$2^4+2^{27} = (2^{23}+1)\cdot2^4$$
Where here $S = 2^{23}+1$ and $e=+4$.
The tricky thing about the second number is that the significand ($S$ value) of an IEEE single-precision number must fit into 23 bits, and here $S = 2^{23}+1$ = 1000,00000,00000,00000,00001, which would seem to require 24 bits. But in IEEE format, the initial 1 is not stored, and is always implicit. So we can squeeze in that extra bit.