Actions

Cycloid: Difference between revisions

From DT Online

(Created Cycloid)
 
mNo edit summary
Line 1: Line 1:
An [https://en.wikipedia.org/wiki/Cycloid '''Cycloid'''] is the path traced by a point on the circumference of a circle as it rolls without slipping along a straight line. The curve has sometmes been used by architects to design and shape of a [http://en.wikipedia.org/wiki/Kimbell_Art_Museum curved roof]. The term ''‘cycloid’'' is used also to describe the shape of some [http://en.wikipedia.org/wiki/Fish_scale fish scales].
An [https://en.wikipedia.org/wiki/Cycloid '''Cycloid'''] is the path traced by a point on the circumference of a circle as it rolls without slipping along a straight line. The curve has been used to design [https://en.wikipedia.org/wiki/Cycloid_gear gear teeth] and has sometimes been used by architects to design the shape of a [http://en.wikipedia.org/wiki/Kimbell_Art_Museum curved roof]. The term ''‘cycloid’'' is used also to describe the shape of some [http://en.wikipedia.org/wiki/Fish_scale fish scales].


A line produced by a point following a set of rules in this way is known as the '''[[Loci|locus of a point]]''' ''(plural is '''[[loci]]''')''.
A line produced by a point following a set of rules in this way is known as the '''[[Loci|locus of a point]]''' ''(plural is '''[ [loci]]''')''.


{| cellpadding="5"  
{| cellpadding="5"  

Revision as of 14:27, 19 February 2015

An Cycloid is the path traced by a point on the circumference of a circle as it rolls without slipping along a straight line. The curve has been used to design gear teeth and has sometimes been used by architects to design the shape of a curved roof. The term ‘cycloid’ is used also to describe the shape of some fish scales.

A line produced by a point following a set of rules in this way is known as the locus of a point (plural is [ [loci]]).

Drawing a Cycloid
  • Draw a starting circle and divide into equal segments (say, 12)
  • Draw a horizontal line for the circle to roll along, of length equal to the circle circumference, and divide this into the same number of equal parts. (Constructing a Scale is a convenient way of doing this).
  • Project lines parallel to the base line at heights representing the heights reached by the points on the circle as it rolls round.
  • Start at 0 then describe a circle from the second centre position on to the first line above the baseline, which shows the height the point now reaches.
  • Repeat this procedure for each progressive centre position as shown.
  • Sketch a fair curve through the points (or use French Curves or a flexible strip for example).

Note: The cycloid is a special case of Trochoid in which the point traced is on the circumference of the rolling circle. Using a similar technique, Superior and Inferior Trochoids can also be generated by plotting points either outside (as the tip of a paddle wheel as a boat is propelled by it) or inside the rolling circle (as if marked on a rolling disc for example) . Also, by similar trechniques, the base line can be replaced by a base circle and the rolling circle rolled around either the inside or the outside of it to generate Hypocycloids or Epicycloids - as used in Epicyclic Gearing for example ,