This study was based on the research results conducted as an R&E project for gifted students with financial support from the Korea Foundation for the Advancement of Science and Creativity. This study defines the Expansion Mandart Inellipse of a convex quadrilateral by combining the concept of the Expansion Mandart Inellipse of a triangle with the idea of a circumscribed ellipse of a convex quadrilateral. Additionally, it explores various geometric properties of the Expansion Mandart Inellipse of a convex quadrilateral. The results of this study are as follows: First, it was shown that a necessary and sufficient condition for the existence of the Expansion Mandart Inellipse of a convex quadrilateral is that the quadrilateral must be a parallelogram. Second, the formula for the area of the inscribed ellipse of a parallelogram, based on the division ratio, was derived. Third, it was demonstrated that the areas of the inscribed ellipse of a convex quadrilateral and its corresponding Expansion Mandart Inellipse are equal. Fourth, it was revealed that the four points where the inscribed ellipse of a parallelogram and the Expansion Mandart Inellipse meet lie on the line segments connecting the midpoints of the opposite sides of the parallelogram. Fifth, the quadrilateral formed by the four intersection points of the inscribed ellipse of a parallelogram and its Expansion Mandart Inellipse is similar to the midpoint quadrilateral of the parallelogram, with the intersection of the diagonals of the parallelogram serving as the center of similarity. Sixth, it was shown that the quadrilateral formed by the points of tangency between the parallelogram and its inscribed ellipse has the same area as the quadrilateral formed by the four intersection points of the inscribed ellipse and its Expansion Mandart Inellipse. Finally, a construction method for the inscribed ellipse of a parallelogram was discovered. This study demonstrates that activities extending existing mathematical concepts, as exemplified by this work, can contribute to the advancement of mathematics.