http://www.mapleprimes.com/questions/130498-Integration-Upper-Bound-Appears-Within-Integrand en-us 2026 Maplesoft, A Division of Waterloo Maple Inc. Maplesoft Document System Thu, 11 Jun 2026 09:41:07 GMT Thu, 11 Jun 2026 09:41:07 GMT The latest answers and comments added to the Question, Integration: upper bound appears within integrand http://www.mapleprimes.com/images/mapleprimeswhite.jpg http://www.mapleprimes.com/questions/130498-Integration-Upper-Bound-Appears-Within-Integrand http://www.mapleprimes.com/questions/130498-Integration-Upper-Bound-Appears-Within-Integrand?ref=Feed:MaplePrimes:Integration: upper bound appears within integrand:Comments#answer130499 <p>The response gives a hint:</p> <p>int((15-x)/(232/7-(19/14)*x), x = 6 .. x, AllSolutions);</p> <p><img src="data:image/png;base64,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" alt=""></p> <p>The response gives a hint:</p> <p>int((15-x)/(232/7-(19/14)*x), x = 6 .. x, AllSolutions);</p> <p><img src="data:image/png;base64,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" alt=""></p> 130499 Thu, 09 Feb 2012 11:56:25 Z Markiyan Hirnyk Markiyan Hirnyk http://www.mapleprimes.com/questions/130498-Integration-Upper-Bound-Appears-Within-Integrand?ref=Feed:MaplePrimes:Integration: upper bound appears within integrand:Comments#answer130500 <p>You have a pole at x=464/19, you cannot integrate over it. use assume to make safe integration ranges.</p> <p>You have a pole at x=464/19, you cannot integrate over it. use assume to make safe integration ranges.</p> 130500 Thu, 09 Feb 2012 11:57:34 Z ThU ThU