In [8], we showed that any ideal of $mathbb{Z}_4[X]/(X^{2^n}-1)$ is generated by at most two polynomials of the standard forms. The purpose of this paper is to find a description of the cyclic codes of even length over $mathbb{Z}_4$ namely the ideals of $mathbb{Z}_4[X]/(X^l;-;1)$, where $l$ is an even integer.