Decide on what substitution to use, and then evaluate the given integral using a substitution.(Remember to use absolute values where appropriate.) ∫ [(x⁵− x⁴) / (5x6 − 6x5)] dx

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asked Nov 18, 2021 188k views

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Decide on what substitution to use, and then evaluate the given integral using a substitution.(Remember to use absolute values where appropriate.)

∫ [(x⁵− x⁴) / (5x6 − 6x5)] dx

Mathematics
college

Alexander Kolarov asked

by Alexander Kolarov

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Answer:

The answer is
$(1)/(30)\Big[2\log x-\log 6\Big]$

Explanation:

Given,

$\int (x^(5)-x^(4))/(5x^(6)-6x^5)dx$

$=\int (x^4(x-1))/(x^5(5x-6))dx$

$=(1)/(6)\int\Big[(1)/(x)+(1)/(5x-6)\Big]dx$

$=\fracd{1}{6}\int (1)/(x)dx+(1)/(6* 5)\int(5)/(5x-6)dx$

$=(1)/(30)\Big[5\log x +\log (5x-6)\Big]$

$=(1)/(30)(2\log x-\log 6)$

Hence the result.

Abhinav Galodha answered Nov 22, 2021

by Abhinav Galodha

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