As previously mentioned previous, Mrs. Winchester certainly discovered the powerful trio of symmetric primes by learning Bacon’s usage of them

As previously mentioned previous, Mrs. Winchester certainly discovered the powerful trio of symmetric primes by learning Bacon’s usage of them

The Winchester Algorithm

also, she learned the bigger dimensional mathematics of William Thompson (Lord Kelvin), and William Rowan Hamilton.

Thompson (1824-1907) theorized the existence of “Vortex Atoms.” They are perhaps maybe maybe not atoms into the ordinary feeling, but alternatively act like tiny, sub-atomic “whirlpools,” resonating and extending in a variety of modes of symmetry in a huge higher dimensional foam or ether. Exactly just What Thompson had been explaining (almost one and a half hundreds of years ago) ended up being, really, the mechanics of what exactly is now called “String Theory.” The essential issue using the Vortex Atom (as we now understand) is the fact that, theoretically, it functions as being a “blob.” in an effort become self-consistent, the blob would need to resonate in the rate of light—which we currently understand is an impossible feat for a blob-like framework to execute. But, it absolutely was later demonstrated that the string-like framework can resonate during the rate of light—hence, “String Theory” as opposed to “Blob Theory.”

The larger dimensional atomic concept of this latter area of the century that is nineteenth a greater dimensional brand of mathematics to spell it out its functions. Thompson never fully accomplished that end. But, the mathematician that is irish Rowan Hamilton formulated a method where the symmetries regulating wave function in four dimensional room is revealed. He called their innovation “Quaternions.”

The Winchester algorithm is really a variation that is simplified of, except it just utilizes genuine numbers (in real mail order brides review the place of Hamilton’s fictional figures). More over, two numbers are constantly increased by one another, making an item that will be partitioned, as well as the numbers that are partitioned then added together leading to an amount. As an example, 52 x 88 = 4,576. This system can then be partitioned as 45 76, which, whenever combined becomes 121 (11 squared), or, it may be partitioned (through the inside-out) as 57 46, which, whenever combined equates to 103 (13). Or, it may be partitioned in reverse, in other words. 67 54, which, whenever combined also renders 121.

Observe that 52 x 88 is truly a variation of 7 x 7—because 52 and 88 both simplify to the true number 7. hence, the merchandise needs to be described as a variation of 49 (for example. 7 squared). The variant of 49 is 4,576 (i.e in this case. 52 x 88). This quantity or other variation of 7 squared will usually equate towards the quantity 13 (or variations of 13), which then simplify to 4. By partitioning this quantity set, and combining the partitions, the symmetrical relationship between 7 squared, 11 squared, in addition to quantity 13 happens to be demonstrated.

The importance of the Winchester algorithm is the fact that it reveals hidden symmetries that could otherwise not be understood or seen. Once we shall see, the characteristics associated with the algorithm are crucial towards the application of higher mathematics that are dimensional.

Obviously, whenever Winchester figures are used into the algorithm, stunning symmetries are often created. The main reason we all know about Sarah’s algorithm is really because she included an amazing calculating unit to the House that plainly demonstrates exactly how greater dimensional mathematics works. Moreover, any 10 12 months child that is old equipped by having a calculator, can simply be a master of Sarah’s quantity system.

The Spider-web Window

The Winchester home has 13 restrooms. The 13th restroom has 13 actions prior to its entrance. The wall that is exterior the entry has 13 wood panels. In, we find six, identical windows, all fashioned in a distinctive design that is“Spider-web. Even though there are also “Spider-web” windows based in other areas of the home here is the final destination where Sarah plainly desired the “enlightened initiate” to land. Right right Here, Sarah has ingeniously included her spider-web design in to the architecture as a calculating device operating both being an instructional device that shows just exactly exactly how her algorithm works, so when a model exposing the basic, symmetric framework regarding the world.

Sarah’s Symmetric Spider-web design

The look for the spider-web screen is essential for many reasons. To begin with, it certainly possesses the standard of captivating those who venture in. But, more to the point, it represents the tangled, interconnectedness of all of the things. They are maybe not simple geometric designs intersecting a pane of cup, instead they are to be considered as residing strands of fibrous sequence which not just link the average person bits of cup, but additionally, through the characteristics of “gauge symmetry,” unify all things as a complete entire.

exactly What else are we to see in this screen? Sarah knew we observe in nature) form a four-sided square—and she has purposely embedded four pieces of glass into the outer-most edge of each of the four sides, i.e. 4444 that we would notice the outside perimeters of the web (unlike the webs. Remember that the “window” is just showing us a two view that is dimensional of spider-web (become discussed later).

The the next thing Sarah wishes us to note is the fact that web contains 49 split items of cup. We recall this is of the quantity since it pertains to both the quantity 13, and its particular prominent display when you look at the grid of Sarah’s room ceiling.

Next, Sarah directs our focus on the true quantity 52 ( Winchester). But, where are we to get it? Ah… yes, true to Bacon’s theme of concealment, we need to look involving the bits of glass—and, sure enough, the 49 pieces are typical accompanied together at correctly 52 various points.

The web’s center is occupied by a circle. It’s the circle that is only the window’s design. The group is not intersected or divided, nor is there some of the characteristics that are web-like see distributed on the other countries in the window’s area. Yet, every thing within the pattern causes the circle—and, everything emanates from it.

You can find three spider-web bands moving outward through the circle like concentric waves in a pond. Their web-like quality could be the outcome of inverting every one of the arcs that link the 3 points of each and every band. Furthermore, all the bands contain 16 items of glass—however, the next, outer-most band is squared down, which types the external boundary of this internet.

Considering that the number 16 simplifies to 7, we possibly may see these three concentric bands as 777 (in place of 16 16 16). And, we remember that the true number 777 also corresponds to your title William (34) Wirt (25) Winchester (52).

Spider-web Window, Concentric Sectors

Sarah further knew that individuals would grow 49 x 777, which means 38073. Then, 38 + 73 = 111 (for example. Bacon, Kaye Cipher, and William Wirt Winchester, Pythagorean Cipher). Moreover, she knew we might observe that the quantity 49 simplifies to 13—hence, 13 x 777 = 10101 (111). Furthermore, the reverse “palindromic” twin of 13 is 31—thus, 31 x 777 yields the result that is same i.e. 31 x 777 = 24087—then, 24 + 87 = 111. In reality, any variation of this quantity 13 (in other words. 4, 22, 31, 58, 85, 67, 76, 49, 94, 121, 112, 211, or 1111, etc.), whenever increased by the number 777 will constantly make the symmetry of 111.

Sarah further knew we might then use the tables of our ideas to your true quantity 52. Therefore, we now multiply 52 x 777, leading to 40404, i.e. 444 (the combined value of Bacon’s Rossi Crosse seals). Obviously, once the quantity 7, or any variation of this number is increased by 777, the end result (through the Winchester algorithm) will often be 444.

And, needless to say 13, or any variation of 13, increased by 444 will usually end up in 777. Note the good thing about this product of 13 x 444—it’s 5772. It’s tantamount to inserting the word “ Winchester goose” (77) within the name Winchester (52). Both Bacon and Sarah needed to keenly have been alert to this. Furthermore, the title Winchester seems properly 27 times in the Shakespearean works. We remember that Bacon’s “super” term from Loves’ Labour’s Lost, honorificabilitudinitatibus, comes with 27 letters. 27 rotates into 117 (John Dee), and, whenever reversed, its 72 (Sarah Winchester) or 711.

For Sarah and Bacon, 444 had been an expression that is simplified of. This can be similarly real of this relationship between 777 and 161616. The 3 symmetric triplets of 777, 111, and 444 are in reality greater dimensional expressions of 7, 11, and 13.