Sketched Ellipse dimensions are $(a=5,b=3,e=0.8)$. Can you figure out errors in the second and fourth quadrants? The angle variations are plotted showing by comparison that starting deLaHire polar line is inclined more than (or equals to at extreme axes) the Central polar coordinate always. In either case polar angles $\theta = 0$ and $\theta= \pi/2$ reach to the same points at the ends of major and minor axes respectively. To more clearly distinguish between them we should note there are two different $\theta$ s, viz $\theta_ \tag 2 $$ The Ellipse parametrization is done differently. A cylindrical coordinates calculator is one of them, and it allows you to save time while calculating the position of a point.What you at first proposed as ellipse looks like: It has a vast range of mathematical problems, and the CalCon team endeavors to cover them via our articles. In order to do some control, you can change the input values to be cylindrical coordinates and do the calculation of Cartesian.
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