# Epitrochoids

Epitrochoids
Field: Geometry
Image Created By: Kevin Liu

Epitrochoids

An epitrochoid is a roulette made from a circle going around another circle. A roulette is a curve that is created by tracing a point attached to a rolling figure.

# Basic Description

The basic concept of this is: a circle that can't move and a circle that can. The circle that can't move is fixed onto a surface (like paper). Within the circle that can move is a line that will create a line once this circle is moving around the fixed circle. Think of it as a rabbit that runs around its hole (that's hopefully on the ground) holding a marker while staying in the same position, but twirling.

# A More Mathematical Explanation

Note: understanding of this explanation requires: *Roulettes

## Deriving the Parametric

1: Let's just say that "m" will be the sum of the 2 radii from the 2 circ [...]

## Deriving the Parametric

1: Let's just say that "m" will be the sum of the 2 radii from the 2 circles -> m=A+B

2: The equation of the larger circle with radius "A", with its center at the origin of a graph. -> x^2+y^2=a^2

3: The equation of the smaller circle (with radius "B"),will be this since (x-m) in this case would be used to find the center of the smaller circle on the graph since "m" is the sum of the 2 radii. -> (x-m)^2 + y^2= b^2

4: Define point P on its distance away from the origin in coordinate form when t=0 -> P[0] = ( m-h , 0 )

5: Since the small circle (radius "B")revolves counter-clockwise around the the big circle -> P= m [cos(t), sin(t)] - h [cos( b), sin( b)]

6: Angle B needs to be expresses in terms of "t", the angle of the big circle.Thus when the smaller circle rolls on the big circle, it produces the same arc length as the big circle.-> arc BC = arc RC

7: Now, because s = r(theta), -> a t = b t[1]

8: Solve the equation for t[1] -> t[1]= (at/b)

9:It's seen that-> b = t[1]+ t

10:Now substitute the equation from #8, to show Angle B in terms of "t"-> b = (at/b)

11:Combine m=A+B to get-> b = mt/b

Parametric Equations for an epitrochoid:

## Equations

(These equations were found at http://mathworld.wolfram.com/Epitrochoid.html)

This is the equation for the velocity of the rotating circle:

This is for the acceleration of the rotating circle:

The Equation for the Arc Length:

This is the equation for the amount of curvature:

For all of these above equations: h is the distance from the point being traced to the center of the rotating/rolling circle.

The radius of the rolling circle is b.

The radius of the stationary circle, that the smaller circle is rolling around, is a.

## Explanation on the Position of the Point

The amount of times the point being traced goes back to where it started on the revolving circle is based on the two different circumferences. If the circumference of the revolving circle is a, and the stationary circle is 2a, that means the point on the revolving circle will end up where it started twice (2a/a=2). In other words, it takes the rotating circle two full rotations in order to return to the place where it first started.

Where the point is does not affect how many times arcs will be traced, as long as it is attached to the revolving circle. As demonstrated by this image, there are 2 curves no matter where the point is. If the point is on the edge of the circle, the curves will touch the edge of the stationary circle (red). If the point is inside the rotating circle, the curves will not touch the edge of the stationary circle (blue). If the point is outside of the rotating circle, the curves will loop into the stationary circle (purple).

However, the positioning of the point being traced does affect how curved the line is when the point goes back to its starting point. right

# Why It's Interesting

It creates interesting shapes and can be applied to uses of art and engineering. Two examples of usages of an epitrochoids include the Wankel Rotary Engine and the Spirograph.

## Wankel Rotary

The Wankel Rotary Engine was created by Felix Wankel in the 1920s that is used in cars and vehicles as engines. At the time, it was a new type of gasoline engine. The rotor itself is an equilateral triangle while the bore is made of an eptitrochoid curve. By following the path that the rotor tip creates, you can see the traces produced. For another explanation, you can go on: Involute

## Spirograph

The Spirograph is a geometric tool used in manually drawing roulettes. It can produce epitrochoids. It can also produce hypocycloids, hypotrochoids, and epicycloid.

# How the Main Image Relates

The concept of epitrochoids is explained.

Student