Abstract
A new curve is produced and graphically studied. The name of my daughter, Nada, has been givento this curve; in other words, Nada is used to describe this curve whenever it is used in this paper. “Nada’s curve”is a form of closed curve that is constructed when the circle’s diameter and the ellipse’s minor axis share the samelength, and they are tangent by a point from a drawn line passing through the circumstances of the circle and ellipse.Then, from these two intersection points, the point of intersection of the vertical and horizontal lines is selectedto determine a point of Nada’s curve. By sharing two vertically lined points on both the circle’s diameter and theellipse’s minor axis, the parametric equation can be simplified and calculated easily, starting with an equation of thecircle: x2+(y-1)2=1. Cases of Nada’s curve were graphically investigated in this study. The surface generated bythe revolution of Nada’s curve around its axis is called “Nadaoid.
Recommended Citation
Al-ossmi, Laith H. M. and Zardari, Baqir Ali
(2023)
"Towards a new curvature produced by the tangent of a circle andan ellipse: The Nada’s curve,"
Iraqi Journal for Computer Science and Mathematics: Vol. 4:
Iss.
1, Article 1.
DOI: https://doi.org/10.52866/ijcsm.2023.01.01.001
Available at:
https://ijcsm.researchcommons.org/ijcsm/vol4/iss1/1
