This study was based on the results of research conducted by the Korea Science Foundation Creative Research for Gifted Science (R&E). We wondered what would be the trace of a point where the product of the distances between the two focal points was constant. As a result of this investigation, we found that the multiplication of the distance between the two focal points was defined as the Cassini ovoid line and that the study was conducted. As we studied n-ellipse with n focus by extending a two-point ellipse, this study defines a n-focus Lemniscate curve as a n-Lemniscate curve by extending a two-focus Cassini ovoid line and a Lemniscate curve, and explores the nature of a n-Lemniscate curve, and the composition of a n-Lemniscate curve. In the course of research so far, the following results were obtained. First, the properties of the n-Lemniscate curve were found. The polar equation of the 4-Lemniscate curve was induced in anticipation of a simple diet if the pairs were operated in a complex plane. By extending this we were able to induce polar equation of n-Lemniscate curve. The curvature of the n-Lemniscate curve could also be generalized. Second, the composition method of the n-Lemniscate curve was found for any natural number n. The relationship between the 2^(n-1)-Lemniscate curve and the 2^n-Lemniscate curve was discovered and proved, and the composition method of the 2^n-Lemniscate curve was found and demonstrated using the 2^(n-1)-Lemniscate curve. Third, when it is impossible to make a composition of a regular n-angle, it was found that it is impossible to make a composition of the n-Lemniscate curve. When it was impossible to draw a regular n-angle using the impossibility of a regular polygon, it was logically demonstrated that the n-Lemniscate curve was not even possible to draw.