Paraboloid and Cylinder surface
11 vues (au cours des 30 derniers jours)
We know that x^2+y^2=4*f*z, where f is the focal length of the paraboloid. Given that the cylinder (x-a)^2+y^2<=r^2, where a is the distance between the axis of the cylinder and the axis of the paraboloid.r is the radius of the cylinder. The surface on the paraboloid intercepted by the cylinder is obtained by using the above equation. Question: How to input f, a and r to obtain the image of intersecting surface and extract the coordinates of N points from the surface?
Vimal Rathod le 23 Juin 2021
From the given equations in your question the solution to the value would be (0,0) as the equation of cylinder creates a surface on z = 0 and the equation of paraboloid creates a paraboloid with only one point of intersection with the cylinderical surface.
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