Mathematical Quilts

Some of my work...


DaVinci’s Dessert - Sherbert Without Pi—When Leonardo DaVinci became interested
in dissections, it is thought he was trying to square the circle. Today we know that
this is impossible. In this quilt, the curvilinear gold shapes can be cut and put together
to form a rectangle. Leonardo’s solution was elegant and unusual.

Leonardo’s Treat - This quilt was based on a design in Herbert Wills III book -
Leonardo’s Dessert—No Pi. A delightful pattern that nests squares and circles. This pattern
is found on floors around the world. Many interesting area relationships can be found in this pattern. The quilt is in a private collection.

San Gaku - The San Gaku tablets come from Japan during the Edo period—1603-1867.
The tablets number around 800, and are found in various shrines in Japan. These
San Gaku were found in the Kono Hachimen Shrine outside Tokyo. Solving a San Gaku
was a way of venerating the Gods.

Sierpinkskis Triangle - Waclaw Sierpinski, 1882-1969, was a Polish mathematician that
was very interested in patterns, including Pythagorean triples. This triangle, a fractal,
was found on the floor of a church in Anagni, Italy. This oldest fractal dates to 1104. It is
said that this fractal, named after Sierpinski, is the first fractal in the fractal alphabet. The
quilt is owned by the London Science Museum.

Pascal’s Surprise -
A quilt made for Marc Roth based on Blaise Pascal’s (1623-1662)
number pattern. The Pascal triangle was actually found in literature as early as 1303 by
Cho Ski-kie. The pattern formed here is found by taking Pascal’s triangle and inserting
a new triangle in between existing numbers. The colors reflect if the number is even or odd.

Elaine eagerly awaited her fourth grandchild's birth.
Cam Hunter, born February 15th, 2007, has been such a pleasure for grandma
and her family. As Cam grows, he will see that his quilt was designed using
the bear furniture in his nursery.

Some quilts are for sale - please contact Elaine at for more
information and prices.