We prove that a generic complete intersection Calabi-Yau 3-fold defined by
sections of ample line bundles on a product of projective spaces admits a
conifold transition to a connected sum of S^{3} \times S^{3}. In this manner,
we obtain complex structures with trivial canonical bundles on some connected
sums of S^{3} \times S^{3}. This construction is an analogue of that made by
Friedman, Lu and Tian who used quintics in P^{4}
