Roses Contain Mysteries and are Favored by Mystics. First, consider the visible side of roses. Leaves on the bushes come in clusters. These clusters can be comprised of 3,5 or 7 leaves. It has been proven that:”If you want the rose bush to keep blooming, cut the branches between clusters of five and three leaves.” For the roses to continuously blossom, they must be cut between the Fibonacci numbers 3 and 5. Also significant for this blog: The rose has 5 strong petals and 13 weaker. Now the mysticism begins. The background for this blog is the preference that Neolithic cultures showed for number squares.
ROSES CONTAIN MYSTERIES THAT APPLY TO NUMBER SQUARES
Here are the two number squares that the rose draws on. Neolithic cultures knew that nature works on these squares. Today, many have yet to realize this. The 5 strong petals and 13 weaker draw on the key central numbers of 3 x 3 and 5 x 5. The core number of the 3 x 3 is #5. The core number of the 5 x 5 square is #13.
Fibonacci Series Shares the Key Numbers With Roses
Fibonacci numbers grow numbers grow by adding the two previous numbers to arrive at the next larger number. We thus find: 1,1,2,3,5,8,13,34…….The series can continue infinitely. Life both favors and significantly uses the ratio of these consecutive numbers. Note: The Fibonacci numbers that form the petals of the rose: 5 and 13. As the series develops, the ratio of the by which the larger of the two is greater than the smaller gets closer and closer to the infinite number of phi: 1.618… That number is called by the Greek word, phi, or the Golden Section. The definitive phi number can never be reached. It is an irrational number that extends to infinity. Could that be why man will always fall short of immortality?
ANOTHER BIG ROSE CO-INCIDENCE
Consider the following about roses contain mysteries: I have already blogged extensively about these bullet points below . Both 5 and 13 define the strong petals on a rose. Both 5 and 13 define the core of the 1st two odd numbered squares as pictured above. The co-incidence extends to regular and semi-regular polyhedrons:
- There can only be 5 regular polyhedrons.
- There can only be 13 semi-regular polyhedrons.
The knowledge of many of prehistoric civilizations was also preserved by planting roses in Jerusalem. This knowledge today calls for a new vision of peace and co-operation. Let roses lead the way. Hooray for flower power!