Abstract A projective plane $\Cal P_m$ is a Ber's subplane of a finite
projective plane $\Cal P_n$ if every point and line of $\Cal P_n\setminus\Cal
P_m$ is incident to some line and some point, respectively, of $\Cal P_n$. It
is known that the order of the plane $\Cal P_n$ and its Ber's subplane $\Cal
P_m$ satisfy the equation $n=m^2$. In this article we prove some properties of
finite projective planes $\Cal P_n$ having disjoint Ber's subplanes covering it.
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