MaplePrimes - Questions and Posts tagged with conjecture
http://www.mapleprimes.com/tags/conjecture
en-us2017 Maplesoft, A Division of Waterloo Maple Inc.Maplesoft Document SystemMon, 26 Jun 2017 15:34:10 GMTMon, 26 Jun 2017 15:34:10 GMTThe most recent questions and posts on MaplePrimes tagged with conjecturehttp://www.mapleprimes.com/images/mapleprimeswhite.jpgMaplePrimes - Questions and Posts tagged with conjecture
http://www.mapleprimes.com/tags/conjecture
Modular Arithmetic
http://www.mapleprimes.com/questions/202982-Modular-Arithmetic?ref=Feed:MaplePrimes:Tagged With conjecture
<p>How do I use msolve to solve y^2 + y - 11=0 in Zp for all primes p with 41=< p =<107 ?</p>
<p>Also, using the results make a conjecture describing the primes p for which there are solutions to y^2 + y - 11 = 0 in Zp</p>
<p>This was what I did.</p>
<p>41<=p<=107</p>
<p>msolve(y^2 + y - 11=0, p)</p>
<p>but I received this error, no implementation of msolve matches the arguments in call, msolve(y^2 + y - 11=0, p)</p>
<p>Any help is appreciated. Thanks</p><p>How do I use msolve to solve y^2 + y - 11=0 in Zp for all primes p with 41=< p =<107 ?</p>
<p>Also, using the results make a conjecture describing the primes p for which there are solutions to y^2 + y - 11 = 0 in Zp</p>
<p>This was what I did.</p>
<p>41<=p<=107</p>
<p>msolve(y^2 + y - 11=0, p)</p>
<p>but I received this error, no implementation of msolve matches the arguments in call, msolve(y^2 + y - 11=0, p)</p>
<p>Any help is appreciated. Thanks</p>202982Sun, 30 Nov 2014 20:36:32 Zeunice95eunice95Calculating Collatz's Conjecture
http://www.mapleprimes.com/questions/200538-Calculating-Collatzs-Conjecture-?ref=Feed:MaplePrimes:Tagged With conjecture
<p>Hi everyone, I'm trying to print out Collatz's Conjecture's steps for any given value with the following code but it takes forever and prints nothing. Any idea on how I can get it working ?</p>
<p> </p>
<p>checkCollatzValue:=proc(val) local res, remaining;<br> while res <> 1 do<br> remaining = irem(val, 2); remaining;<br> if remaining = 0 then res = val / 2; else res = val * 3 + 1; fi;<br> res;<br> od; <br>end proc;</p><p>Hi everyone, I'm trying to print out Collatz's Conjecture's steps for any given value with the following code but it takes forever and prints nothing. Any idea on how I can get it working ?</p>
<p> </p>
<p>checkCollatzValue:=proc(val) local res, remaining;<br> while res <> 1 do<br> remaining = irem(val, 2); remaining;<br> if remaining = 0 then res = val / 2; else res = val * 3 + 1; fi;<br> res;<br> od; <br>end proc;</p>200538Thu, 19 Dec 2013 21:08:56 ZNotCamelCaseNotCamelCaseA list of small graphs, invariants and conjectured inequalites
http://www.mapleprimes.com/posts/125239-A-List-Of-Small-Graphs-Invariants-And?ref=Feed:MaplePrimes:Tagged With conjecture
<p>A list of small graphs with associated pictures and tables of <br>values of various graph invariants.<br><br>The graph invariants were made using Maple programs which uses <br>the <span style="text-decoration: underline;">networks</span> and <span style="text-decoration: underline;">GraphTheory</span> packages. <br><br>A picture presents some inequality conjectures between the graph invariants.</p>
<p>http://www.msci.memphis.edu/~speeds/<br><br>Sam Speed August 29, 2011<p>A list of small graphs with associated pictures and tables of <br>values of various graph invariants.<br><br>The graph invariants were made using Maple programs which uses <br>the <span style="text-decoration: underline;">networks</span> and <span style="text-decoration: underline;">GraphTheory</span> packages. <br><br>A picture presents some inequality conjectures between the graph invariants.</p>
<p>http://www.msci.memphis.edu/~speeds/<br><br>Sam Speed August 29, 2011</p>
<p> </p>125239Mon, 29 Aug 2011 19:30:44 ZMRB constant rational?A
http://www.mapleprimes.com/posts/101640-MRB-Constant-RationalA?ref=Feed:MaplePrimes:Tagged With conjecture
<p> </p>
<p> </p>
<!--break-->
<p>When adding the positive integers taken to their own roots such as -1+2^(1/2)-3^(1/3)+4^(1/4) etc., in that alternating fashon, and I stop on the largest positive term, I get the value of the MRB constant. All of those terms except for the first one are irrational. However I previously mentioned that there is no proof that the MRB constant is irrational, but before I can prove anything I must know what I am proving.</p>
<p>In this post I would like to form a conjecture, and since I would like the conjecture to be true, I need to go to the edge of my reasoning as to which is more likely: Is the MRB constant rational or is it irrational? From this point on and until I have some convincing evidence, I am going to try to be neutral in my opinion as to its rationality.</p>
<p>I’ve been warned by experts that I might be working on this for a lifetime, without success..., and I don’t want to take their warning blithely, but I have no wish to stifle my curiosity. I do welcome your reasoning as well. Perhaps you can convince me of the ir/rationality of the MRB constant. I would dare go as far as to ask for unscientific opinions if that is all you have at this time, but if you have some reasoning about this issue I hereby beg for it!</p>
<p> </p>
<p><a href="http://marvinrayburns.com">marvinrayburns.com<br></a></p>101640Sun, 13 Feb 2011 07:07:43 ZMarvin Ray BurnsMarvin Ray Burns