Received: from 173-13-139-235-sfba.hfc.comcastbusiness.net ([173.13.139.235]:40511 helo=jukni.digitalkingdom.org) by stodi.digitalkingdom.org with smtp (Exim 4.80.1) (envelope-from ) id 1Y40jt-0000Ko-Go; Wed, 24 Dec 2014 21:13:35 -0800 Received: by jukni.digitalkingdom.org (sSMTP sendmail emulation); Wed, 24 Dec 2014 21:13:33 -0800 From: "Apache" Date: Wed, 24 Dec 2014 21:13:33 -0800 To: webmaster@lojban.org, curtis289@att.net Subject: [jvsw] Definition Edited At Word cpolinomi'a -- By krtisfranks Bcc: jbovlaste-admin@lojban.org Message-ID: <549b9cfd.PrCSiJMLorIFuLKU%webmaster@lojban.org> User-Agent: Heirloom mailx 12.5 7/5/10 MIME-Version: 1.0 Content-Type: text/plain; charset=us-ascii Content-Transfer-Encoding: 7bit X-Spam-Score: 0.5 (/) X-Spam_score: 0.5 X-Spam_score_int: 5 X-Spam_bar: / X-Spam-Report: Spam detection software, running on the system "stodi.digitalkingdom.org", has NOT identified this incoming email as spam. The original message has been attached to this so you can view it or label similar future email. If you have any questions, see @@CONTACT_ADDRESS@@ for details. Content preview: In jbovlaste, the user krtisfranks has edited a definition of "cpolinomi'a" in the language "English". Differences: 2,2c2,2 < $x1$ is a formal polynomial over structure/ring $x2$ of degree $x3$ and indeterminant $x4$ --- > $x_1$ is a formal polynomial with coefficients $x2$ (ordered list) of degree $x_3$ over structure/ring $x_4$ (to which coefficients $x_2$ all belong) and in indeterminant $x_5$ 5,5c5,5 < If x2 is presented as an ordered list, the entries represent the 'coefficients' of the particular polynomial and are specified in the order such that the ith entry/term is the (i-1)th 'coefficient' for all natural numbers i between 1 and n+1 inclusively. See also: {tefsujme'o} (polynomial function) --- > If x2 is presented as an ordered list, the entries represent the 'coefficients' of the particular polynomial and are specified in the order such that the ith entry/term is the (i-1)th 'coefficient' for all natural numbers i between 1 and n+1 inclusively; thus, the first entry is the constant term (when treated as a function), the second term is the coefficient of the argument of x5 (when treated as a function), and the nth term is the coefficient of the argument of x5 exponentiated by (n-1). See also: {tefsujme'o} (polynomial function) 11,11d10 < Word: polynomial, In Sense: formal, ring element (not as: a function or a funcion evaluated at a particular input value) \n14a14,14 \n> Word: polynomial, In Sense: formal, ring element (not as: a function or a funcion evaluated at a particular input value) [...] Content analysis details: (0.5 points, 5.0 required) pts rule name description ---- ---------------------- -------------------------------------------------- 1.4 RCVD_IN_BRBL_LASTEXT RBL: No description available. [173.13.139.235 listed in bb.barracudacentral.org] 0.0 URIBL_BLOCKED ADMINISTRATOR NOTICE: The query to URIBL was blocked. See http://wiki.apache.org/spamassassin/DnsBlocklists#dnsbl-block for more information. [URIs: lojban.org] -1.9 BAYES_00 BODY: Bayes spam probability is 0 to 1% [score: 0.0000] 1.0 RDNS_DYNAMIC Delivered to internal network by host with dynamic-looking rDNS In jbovlaste, the user krtisfranks has edited a definition of "cpolinomi'a" in the language "English". Differences: 2,2c2,2 < $x1$ is a formal polynomial over structure/ring $x2$ of degree $x3$ and indeterminant $x4$ --- > $x_1$ is a formal polynomial with coefficients $x2$ (ordered list) of degree $x_3$ over structure/ring $x_4$ (to which coefficients $x_2$ all belong) and in indeterminant $x_5$ 5,5c5,5 < If x2 is presented as an ordered list, the entries represent the 'coefficients' of the particular polynomial and are specified in the order such that the ith entry/term is the (i-1)th 'coefficient' for all natural numbers i between 1 and n+1 inclusively. See also: {tefsujme'o} (polynomial function) --- > If x2 is presented as an ordered list, the entries represent the 'coefficients' of the particular polynomial and are specified in the order such that the ith entry/term is the (i-1)th 'coefficient' for all natural numbers i between 1 and n+1 inclusively; thus, the first entry is the constant term (when treated as a function), the second term is the coefficient of the argument of x5 (when treated as a function), and the nth term is the coefficient of the argument of x5 exponentiated by (n-1). See also: {tefsujme'o} (polynomial function) 11,11d10 < Word: polynomial, In Sense: formal, ring element (not as: a function or a funcion evaluated at a particular input value) \n14a14,14 \n> Word: polynomial, In Sense: formal, ring element (not as: a function or a funcion evaluated at a particular input value) Old Data: Definition: $x1$ is a formal polynomial over structure/ring $x2$ of degree $x3$ and indeterminant $x4$ Notes: If x2 is presented as an ordered list, the entries represent the 'coefficients' of the particular polynomial and are specified in the order such that the ith entry/term is the (i-1)th 'coefficient' for all natural numbers i between 1 and n+1 inclusively. See also: {tefsujme'o} (polynomial function) Jargon: Gloss Keywords: Word: polynomial, In Sense: formal, ring element (not as: a function or a funcion evaluated at a particular input value) Word: coefficient, In Sense: polynomial Word: coefficient ring, In Sense: of polynomial Word: indeterminant, In Sense: of formal polynomial Place Keywords: Word: degree, In Sense: polynomial, For Place: 1 New Data: Definition: $x_1$ is a formal polynomial with coefficients $x2$ (ordered list) of degree $x_3$ over structure/ring $x_4$ (to which coefficients $x_2$ all belong) and in indeterminant $x_5$ Notes: If x2 is presented as an ordered list, the entries represent the 'coefficients' of the particular polynomial and are specified in the order such that the ith entry/term is the (i-1)th 'coefficient' for all natural numbers i between 1 and n+1 inclusively; thus, the first entry is the constant term (when treated as a function), the second term is the coefficient of the argument of x5 (when treated as a function), and the nth term is the coefficient of the argument of x5 exponentiated by (n-1). See also: {tefsujme'o} (polynomial function) Jargon: Gloss Keywords: Word: coefficient, In Sense: polynomial Word: coefficient ring, In Sense: of polynomial Word: indeterminant, In Sense: of formal polynomial Word: polynomial, In Sense: formal, ring element (not as: a function or a funcion evaluated at a particular input value) Place Keywords: Word: degree, In Sense: polynomial, For Place: 1 You can go to to see it.