This study was based on the research results conducted as a R&E project for the gifted students with a financial support from the Korea Foundation for the Advancement of Science and Creativity. Through the research of Park, Park, & Cho (2020), it was found that all points inside the triangle can be the focal point of the inscribed ellipse of the triangle. Then, what could be the focus of the inscribed ellipse of the parallelogram? In this study, the research method of Park, et al (2020) was expanded to investigate. In other words, the research was conducted by applying the idea that each side of a parallelogram is a tangent of an inscribed ellipse. Through this study, the following research results were obtained. First, we found the necessity and sufficiency to become the focal point of the inscribed ellipse of the parallelogram. By drawing various parallelograms circumscribed to an ellipse in the Geogebra program and finding their common points, we found find the necessity and sufficiency to be the focal point of the inscribed ellipse of the parallelogram. Second, we found that the point which can be the focal point of the inscribed ellipse of a rhombus forms two diagonal lines of a rhombus. Third, we found that the point that can be the focal point of the inscribed ellipse of a parallelogram, not a rhombus, forms a hyperbolic curve. When the angle of the parallelogram that is not bigger than 90 degrees is called a, and if we choose the origin as a intersection of the two diagonals of the parallelogram, the points that can be the focal points of the inscribed ellipse form a hyperbolic curve rotated clockwise by (45-a/2) degrees in standard form around the origin. Through this, it can be seen that there are countless inscribed ellipses of rectangular and parallelogram shapes, and rhombus. Finally, I was able to find a way to draw an inscribed ellipse of a parallelogram. The method of drawing the inscribed ellipse of the parallelogram was found by using the curve formed by the focal point of the inscribed ellipse of the parallelogram.