The Federer theorem deals with the “massiveness” of the set of critical values for a
t
t
-smooth map acting from
R
m
\mathbb R^m
to
R
n
\mathbb R^n
: it claims that the Hausdorff
p
p
-measure of this set is zero for certain
p
p
. If
n
≥
m
n\ge m
, it has long been known that the assumption of that theorem relating the parameters
m
,
n
,
t
,
p
m,n,t,p
is sharp. Here it is shown by an example that this assumption is also sharp for
n
>
m
n>m
.