First, a mini biology lesson: The sunflower is actually a composite and is a collection of hundreds of flowers, packed together next to one another on a platform called a receptacle (the tip of the stalk where the flower is attached). It is made up of two kinds of flowers. The disk flowers (tiny bead-like) in the center will form seeds. The infertile ray flowers are the 'petals' (bright yellow). The disk flowers grow in spiral rows around the head of the receptacle.
Bringing this 12 x 12 image to life: Timeless Treasures is a wonderful photo-treated fabric, backed with paper, that can be processed through an ink-jet printer. Google then came to the rescue. After locating the exact sunflower image I wanted, I made a full color print which would be the background on which to work and then was ready to select materials and bring this month's challenge to life.
The center of my 'composite flower' is embroidered and would be where the sunflower buds are just forming. Out from the center, the buds which will become flowers and then seeds are beaded. The outside rows are fully developed flowers and are beaded and embroidered. Finally, the 'petals' are made from double sided fabric, fused together with Heat n' Bond. The 'petals' were also shaded with a small toucn of fabric paint.
Just for the fun of it, a mini math lesson: In the heads of sunflowers, two series of curves can be observed, one winding one direction and one winding a different direction and the number of spirals will not be the same in each direction. The number of spirals will be 21 & 34, or 34 & 55, or 55 & 89, or 89 & 144. These numbers all belong to the Fibonacci sequence: 1, 2, 3, 5, 8, 13, 21, 34, 55, 89, 144, etc. (where the nunber is obtained from the sum of the two preceding numbers). This is the most effective way of filling space, which maximizes the nunber of seeds in a given area. Moreover, generally the petals are formed at the extremity of one of the spirals and therefore their number corresponds on average to a Fibonacci nunber. Fibonacci introduced these numbers in the year 1202 in attempting to model the growth of populations of rabbits.
And finally - an apology: In my "grand plan", I intended to fold the petals that went past the edge of the gallery wrap frame down and under. When it was time, I just could not; I really like the way it looked with the "over-hang." Therefore, my 12 x 12 is not really a 12 x 12. It is really 12 and a petal tip x 12 and a petal tip.
