Cycloid
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- The Brachistochrone Problem: Mathematics for a Broad Audience Via a Large Context Problem
- The Brachistochrone Curve: the Problem of Quickest Descent
- Descartes, Pascal, and the Epistemology of Mathematics: the Case of the Cycloid
- And His Mystic Hexagram B
- Lesson 10. Parametric Curves
- The History of the Cycloid Curve
- [Math.HO] 17 Jan 2005 Christiaan Huygens and Contact Geometry
- Why Cycloids? • the Basic Idea Is Easy to Comprehend and Engaging
- The Design Method of Hypocycloid and Epicycloid of Ball-Type Speed Reducer
- Motion Simulation of Cycloidal Gears, Cams, and Other Mechanisms
- The Cycloid and the Kinematic Circumference
- Extras04-The Tautochrone
- An Alternative Solution to the General Tautochrone Problem
- Arxiv:1107.5664V1 [Physics.Class-Ph] 28 Jul 2011 Ahfrtebb Hscnb Achieved
- The Radius of Curvature According to Christiaan Huygens
- 2Dcurves in .Pdf Format (1882 Kb) Curve Literature Last Update: 2003−06−14 Higher Last Updated: Lennard−Jones 2002−03−25 Potential
- Blaise Pascal Kevin Kappenman Blaise Pascal’S Life
- Math 2433–006 Honors Calculus III Tautochrone Property of the Cycloid