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epicycloid
[ ep-uh-sahy-kloid ]
noun
- a curve generated by the motion of a point on the circumference of a circle that rolls externally, without slipping, on a fixed circle. Equation: x = ( a + b ) cos(θ) − b cos[( a + b )θ/ b ] and y = ( a + b ) sin(θ) − b sin[( a + b )θ/ b ].
epicycloid
/ ˌɛ±èɪˈ²õ²¹Éª°ì±ôɔɪ»å /
noun
- the curve described by a point on the circumference of a circle as this circle rolls around the outside of another fixed circle, the two circles being coplanar Compare hypocycloid cycloid
epicycloid
/ Ä•±è′Ä-²õī′°ì±ô´Ç¾±»å′ /
- The curve described by a point on the circumference of a circle as the circle rolls on the outside of the circumference of a second, fixed circle.
Derived Forms
- ËŒ±ð±è¾±³¦²âˈ³¦±ô´Ç¾±»å²¹±ô, adjective
Other ˜yÐÄvlog Forms
- ±ð±èi·³¦²â·³¦±ô´Ç¾±î€ƒd²¹±ô adjective
˜yÐÄvlog History and Origins
Origin of epicycloid1
Example Sentences
Suppose b a tracing point on b, then as b rolls on a it will describe the epicycloid a b.
The epicycloid shown is termed the “three-cusped epicycloid†or the “epicycloid of Cremona.â€
When c = a or = ∞ the curve reduces to the cardioid or the two cusped epicycloid previously discussed.
They are Involute teeth. in fact epicycloids traced by a rolling circle of infinite radius, i.e. a straight line.
If the generating circle proceeds along the convexity of the periphery, it is called an upper or exterior epicycloid; if along the concavity, a lower or interior epicycloid.
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