Add to ORKGA cylinder of radius r is attached coaxially to a second cylinder of radius R, which is greater than r. If the smaller cylinder is rolled along the edge of a table, any point at a radius a on the larger cylinder will move along a cycloidal path. Figure 1 gives one example of this. The nature of the cycloid changes for a less than, equal to, or greater than r
The cycloid finds applications in other fields such as atomic physics and electronics. Charged parti...
This Demonstration uses parametric equations to plot cycloids [x=a(y-sin(t)), y=a(t-cos(t)] and Arch...
It has been established that the web height in the operating position area can be ensured by realizi...
1. INTRODUCTION. A cycloid is the path traced by a point on the boundary of a circular disk that rol...
Calculus and Analytic GeometryThe curve traced out by a point on the rim of a circle rolling along a...
The article describes the creation of the normal cycloidal curve by rotation of the point about the ...
equation of the second degreeA single fixed point on a circle creates a path as the circle rolls wit...
This session includes a hands-on exploration to see graphs of different types of cycloids. Participa...
The cycloid is one of the most intriguing objects in the classical physics world, at once solving th...
A polygon Q rolls on a line m. The positions of a vertex when Q has a side flush with m form a polyg...
This paper illustrates the use of the envelope theorem for the geometric design of a cycloidal speed...
A point on the boundary of a circular disk that rolls once along a straight line traces a cycloid. ...
This paper proposes an analysis of the cyclic curves that can be considered as some of the most impo...
I Introduction The cycloid drive is an epicyclic gear train which consists of an input shaft with an...
The paper presents a family of cycloidal cyclical surfaces, which are created by a movement of a cir...
The cycloid finds applications in other fields such as atomic physics and electronics. Charged parti...
This Demonstration uses parametric equations to plot cycloids [x=a(y-sin(t)), y=a(t-cos(t)] and Arch...
It has been established that the web height in the operating position area can be ensured by realizi...
1. INTRODUCTION. A cycloid is the path traced by a point on the boundary of a circular disk that rol...
Calculus and Analytic GeometryThe curve traced out by a point on the rim of a circle rolling along a...
The article describes the creation of the normal cycloidal curve by rotation of the point about the ...
equation of the second degreeA single fixed point on a circle creates a path as the circle rolls wit...
This session includes a hands-on exploration to see graphs of different types of cycloids. Participa...
The cycloid is one of the most intriguing objects in the classical physics world, at once solving th...
A polygon Q rolls on a line m. The positions of a vertex when Q has a side flush with m form a polyg...
This paper illustrates the use of the envelope theorem for the geometric design of a cycloidal speed...
A point on the boundary of a circular disk that rolls once along a straight line traces a cycloid. ...
This paper proposes an analysis of the cyclic curves that can be considered as some of the most impo...
I Introduction The cycloid drive is an epicyclic gear train which consists of an input shaft with an...
The paper presents a family of cycloidal cyclical surfaces, which are created by a movement of a cir...
The cycloid finds applications in other fields such as atomic physics and electronics. Charged parti...
This Demonstration uses parametric equations to plot cycloids [x=a(y-sin(t)), y=a(t-cos(t)] and Arch...
It has been established that the web height in the operating position area can be ensured by realizi...