Difference between revisions of "Roulette"
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A roulette is a curve traced by one single point on a shape as it rolls without slipping along another shape, curve, or line. | A roulette is a curve traced by one single point on a shape as it rolls without slipping along another shape, curve, or line. | ||
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+ | {{#ev:tubechop|jchrQqH6bT0&start=45&end=60|left}} Video of a man riding a bike with square-shaped wheels. | ||
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|Pre-K=No | |Pre-K=No | ||
|Elementary=No | |Elementary=No |
Revision as of 10:55, 28 May 2009
Roulette |
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Roulette
- Four different roulettes formed by rolling four different shapes through one fixed point.
Basic Description
Suppose you see a nickel rolling on the sidewalk. Imagine a pen traced the path path of one fixed point on the coin as it rolled. A curve would be created. This curve is called a roulette. The example is depicted below:
However, a roulette is not restricted to straight lines and circles. The rolling curve can range from a line to a parabola to a decagon. Similarly, the surface on which this curve rolls on does not have to be a line. It can be a parabola as well, or a circle, among many others. There are a few restrictions that apply:
- The curve that is not rolling must remain fixed.
- The point on the rolling curve must remain fixed.
- Both curves must be differentiable.
- The curves must be tangent at one point at all times.
There are numerous cases of different roulettes; the most common ones have been named. A few of these have been listed below:
A roulette is a curve traced by one single point on a shape as it rolls without slipping along another shape, curve, or line.
Video of a man riding a bike with square-shaped wheels.
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