Mathematics, 17.06.2020 01:57 actived
Use integration by parts to establish the reduction formula: integral (ln x)^n dx = x(ln x)^n - n integral (ln x)^n-1 dx|: To begin the integration by parts, let u =| and dv =| dx. Evaluating du = | dx| and v = | leads immediately to the above reduction formula. Now apply the reduction formula to the problem: integral (ln x)^6 dx|. Getting the final result would be tedious, requiring 6| applications of the reduction formula. So for simplicity just give the result of applying the reduction formula one time. Integral (ln x)^6 dx| is simplified to:.
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Mathematics, 21.06.2019 22:30
If you prove that ∆wxz is congruent to ∆yzx, which general statement best describes what you have proved?
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Use integration by parts to establish the reduction formula: integral (ln x)^n dx = x(ln x)^n - n in...
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