Let \((\widetilde M,\widetilde g)\) be a normal \((2n+1)\)-dimensional almost contact manifold with the fundamental tensor fields \((\phi,\eta,\xi)\). Moreover, assume that \(M\) is a contact Cauchy-Riemann submanifold in \(\widetilde M\). The authors study the conditions under which the distributions \(D\), \(D^\perp\), \(D\oplus D^\perp\) are involutive, where \(D\), \(D^\perp\) are the distributions obtained from the condition for \(M\) to be a Cauchy-Riemann submanifold. Some examples are given, too.