## May 25, 2011

### Riding on Square Wheels

No visit to Macalester College can be complete without a quick spin on a square-wheeled trike. It's a weird contraption, but you can ride it quite smoothly, without the sequence of jarring bumps that you might expect. The secret is in the shape of the road over which the square wheels roll.

The author aboard the Macalester square-wheeled tricycle. Photo by P. Zorn.

A square wheel can roll smoothly, keeping its axle moving in a straight line and at a constant velocity, if it travels over evenly spaced bumps of just the right shape. This special shape is called an inverted catenary.

A square rolling across a sequence of linked inverted catenaries. Wikipedia.

A catenary is the curve describing a rope or chain hanging loosely between two supports. At first glance, it looks like a parabola. In fact, it corresponds to the graph of a function called the hyperbolic cosine. Turning the curve upside down gives you an inverted catenary.

The Exploratorium in San Francisco exhibits a model of such a roadbed and a pair of square wheels joined by an axle to travel over it.

Square wheel exhibit at the Exploratorium in San Francisco.

When Macalester mathematician Stan Wagon saw the Exploratorium model, he was intrigued. The exhibit inspired him to investigate the relationship between the shapes of wheels and the roads over which they roll smoothly. These studies also led Wagon to build a full-size bicycle with square wheels. "As soon as I learned it could be done, I had to do it," Wagon says.

The resulting bicycle (actually a trike) went on display at the Macalester science center, where it could be seen and ridden by the public. In 2004, the science center obtained a new, improved square-wheeled trike. "The old one was falling apart," Wagon says. "The new one's ride is much, much smoother."

The improved Macalester square-wheeled trike. Photo by I. Peterson.

Ken Moffett briefly describes in a YouTube video how he reengineered Wagon's trike to improve its performance.

Steering remains difficult, however. If you turn the square wheels too much, they get out of sync with the inverted catenaries. Nonetheless, people ride the trike. It has an odometer, which logs about 15 miles per year, an average of eight rides per day.

A view of the rear of Wagon's square-wheeled trike. Photo by I. Peterson.

In 2007, students in a mathematical modeling course at St. Norbert College in Wisconsin successfully built a square-wheeled bicycle. This bicycle was a popular attraction in 2008 at MAA MathFest in Madison, Wisconsin.

The St. Norbert square-wheeled bicycle in the exhibit hall at MAA MathFest in Madison, Wisconsin. Photo by R. Miller.

It turns out that for just about every shape of wheel there's an appropriate road to produce a smooth ride, and vice versa. Wagon and Leon Hall described many of the possibilities in the article "Roads and Wheels," published in the December 1992 Mathematics Magazine.

Just as a square rides smoothly across a roadbed of linked inverted catenaries, other regular polygons, including pentagons and hexagons, also ride smoothly over curves made up of appropriately selected pieces of inverted catenaries. As the number of a polygon's sides increases, these catenary segments get shorter and flatter. Ultimately, for an infinite number of sides (in effect, a circle), the curve becomes a straight, horizontal line.

Interestingly, triangular wheels don't work.

As an equilateral triangle rolls over one catenary, it ends up bumping into the next catenary (above). However, you can find roads for wheels shaped like ellipses, cardioids, rosettes, teardrops, and many other geometric forms.

A cardioid rolls on an inverted cycloid.

You can also start with a road profile and find the shape that rolls smoothly across it. A sawtooth road, for instance, requires a wheel pasted together from pieces of an equiangular spiral.

An equiangular spiral on a sawtooth road.

There's certainly more than one way to ride a bike!

Originally posted July 13, 1998.
Updated May 25, 2011.

References:

Hall, L., and S. Wagon. 1992. Roads and wheelsMathematics Magazine 65(December):283-301.

Rathgen, D., P. Doherty, and the Exploratorium Teacher Institute. 2002. Square wheels. In Square Wheels and Other Easy-to-Build, Hands-On Science Activities. San Francisco: Exploratorium.

Robison, G.B. 1960. Rockers and rollers. Mathematics Magazine 33(January-February): 139-144.

Wagon, S. 1999. The ultimate flat tireMath Horizons 5(February):14-17.

______. 2010. Mathematica in Action, 3rd ed. New York: Springer.

## May 22, 2011

### Fountain Parabolas

Shooting graceful arcs of water into the air, fountains can offer lessons in geometric spectacle. The fountain at the National Gallery of Art Sculpture Garden in Washington, D.C., is a notable example.

The circular fountain at the National Gallery of Art Sculpture Garden shoots parabolic streams of water from its circumference toward its center.

One factor that makes some fountains more spectacular than others is the angle of the jets that send water in parabolic paths. Angles between 50 and 60 degrees seem to produce particularly striking effects, either enclosing the largest possible volume or having the greatest total surface area (see "The Geometric Spectacle of Water Fountains").

Water jets shooting from standard nozzles quickly spread out and lose definition as parabolas.

In most fountains, the water jets become wider and fuzzier as they shoot farther out, losing their precise definition as parabolas. One particularly dramatic exception is an indoor fountain in the Edward H. McNamara Terminal at Detroit Metropolitan Wayne County Airport.

Precisely defined laminar (turbulence-free) flow produces jets of rapidly moving water that look motionless, like glass rods bent into parabolas, as in this fountain at Detroit Metropolitan Wayne County Airport.

The water jets look like bent glass rods. Each narrow jet of rapidly flowing water retains its circular cross section throughout its trajectory. When the flow is interrupted, you can trace the final segment all the way to the end, still following its natural arc. At times, the computer-orchestrated water choreography makes the segmented water jets look like exquisitely slim, silvery fish leaping through the air.

The fountain was designed by WET Design, a company based in Universal City, Calif., that specializes in manipulating water to spectacular effect. WET stands for Water Entertainment Technologies. A key element of these fountain designs is a special nozzle, invented by Mark Fuller (one of the founders of WET Design), that generates streamline (or laminar or turbulence-free) flow rather than the spray typical of most nozzles.

Jets of rapidly moving water emerge from special nozzles embedded in a black granite slab.

Photos by I. Peterson