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Title: Integral Post by mathstudent155 on Jan 27th, 2013, 12:31pm Hello everybody! May I ask you a big favor? I need help. What I have is: (2x-3)/ sqrt(4x-1) What is the integral of it?? I've tried to use Integral Calculator here: numberempire.com/integral...var=x&answers= And I've got : (x-4)*sqrt(4*x-1)/3 Seems like it is the right answer. But I want to understand the way of solving it. Please show me step by step solution. Thanks in advance! |
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Title: Re: Integral Post by towr on Jan 27th, 2013, 1:08pm You can use integration by parts. http://en.wikipedia.org/wiki/Integration_by_parts We can take (2x-3)/ sqrt(4x-1) = (2x-3) d[1/2 sqrt(4x-1)] Then http://www.ocf.berkeley.edu/~wwu/YaBBImages/symbols/int.gif(2x-3) d[1/2 sqrt(4x-1)] = 1/2 sqrt(4x-1) * (2x-3) - http://www.ocf.berkeley.edu/~wwu/YaBBImages/symbols/int.gif1/2 sqrt(4x-1) d[2x-3] = 1/2 sqrt(4x-1) * (2x-3) - http://www.ocf.berkeley.edu/~wwu/YaBBImages/symbols/int.gifsqrt(4x-1) d x = 1/2 sqrt(4x-1) * (2x-3) - 1/4 * 2/3 * (4x-1)^(3/2) = ((2x-3)*3-(4x-1))/6 * sqrt(4x-1) = (x-4)/3 * sqrt(4x-1) (I think it's literally been years since I've last done this..) |
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Title: Re: Integral Post by tsitut on Feb 20th, 2013, 12:12pm Thanks, I actually needed it too :P |
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