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Title | The Cayley-Dickson |
Description | The Universal Cayley-Dickson The Cayley-Dickson |
Keywords | Cayley-Dickson doubling via the Fano Plane, Cayley-Dickson Algebra,Cayley-Dickson Fano Plane, Fano Plane, Twisted group,Cayley-Dickson tree, Cayley-Dickson calculator,javascript calculator,Cayley-Dickson, octonion, sedenion |
WebSite | jwbales.us |
Host IP | 160.153.33.231 |
Location | United States |
Site | Rank |
US$324,429
Last updated: 2023-05-12 07:53:40
jwbales.us has Semrush global rank of 32,624,504. jwbales.us has an estimated worth of US$ 324,429, based on its estimated Ads revenue. jwbales.us receives approximately 37,435 unique visitors each day. Its web server is located in United States, with IP address 160.153.33.231. According to SiteAdvisor, jwbales.us is safe to visit. |
Purchase/Sale Value | US$324,429 |
Daily Ads Revenue | US$300 |
Monthly Ads Revenue | US$8,985 |
Yearly Ads Revenue | US$107,810 |
Daily Unique Visitors | 2,496 |
Note: All traffic and earnings values are estimates. |
Host | Type | TTL | Data |
jwbales.us. | A | 600 | IP: 160.153.33.231 |
jwbales.us. | NS | 3600 | NS Record: ns28.domaincontrol.com. |
jwbales.us. | NS | 3600 | NS Record: NS27.domaincontrol.com. |
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jwbales.us. | MX | 3600 | MX Record: 5 alt2.aspmx.l.google.com. |
jwbales.us. | MX | 3600 | MX Record: 1 aspmx.l.google.com. |
jwbales.us. | MX | 3600 | MX Record: 10 aspmx2.googlemail.com. |
jwbales.us. | MX | 3600 | MX Record: 10 aspmx3.googlemail.com. |
jwbales.us. | TXT | 3600 | TXT Record: v=spf1 include:_spf.google.com ~all |
jwbales.us. | TXT | 3600 | TXT Record: google-site-verification=MjAUzqAm8XHnrkCX-bV5QPJx5AWfQ1u363ba8Y-iVjM |
The Universal Cayley-Dickson Algebra The union of all finite dimensional Cayley-Dickson algebras An algebra of finite sequences This is a development of a Cayley-Dickson algebra \(\mathbb{A}\) which contains all real Cayley-Dickson algebras as proper sub-algebras. The elements of \(\mathbb{A}\) consist of all sequences of real numbers which terminate in a string of zeros (or, equivalently, all finite sequences of real numbers padded at the end by an unending string of zeros.) Ordered pairs as shuffled sequences An ordered pair of elements of \(\mathbb{A}\) will be represented by the shuffle of two sequences of \(\mathbb{A}\). To illustrate: Given elements \( x=x_0,x_1,x_2,\cdots\) and \( y=y_0,y_1,y_2,\cdots\) of \(\mathbb{A}\), the ordered pair \( (x,y)\) represents the sequence \( x_0,y_0,x_1,y_1,x_2,y_2,\cdots\). A real number \(x\) is represented by the sequence \(x,0,0,0\cdots\) A complex number \( a+b\mathbf{i}\) is represented by the sequence \( a,b,0,0,0,\cdots\) A quaternion |
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