If the bounded open set G is the union of finite or denumerable family of pairwise disjoint open sets then \(\hspace{1.0cm}\).
\(m(G) = 0\)
—>> \(m(G) = \sum_{k} m(G_k )\)
\(m(G) < \sum_{k} m(G_k )\)
\(m(G) > \sum_{k} m(G_k )\)
Tutors, Past Questions and Projects.
If the bounded open set G is the union of finite or denumerable family of pairwise disjoint open sets then \(\hspace{1.0cm}\).
\(m(G) = 0\)
—>> \(m(G) = \sum_{k} m(G_k )\)
\(m(G) < \sum_{k} m(G_k )\)
\(m(G) > \sum_{k} m(G_k )\)
