Rewrite integrand: x4(x−x3)1/3=x4x1/3(1−x2)1/3. Factor as x31(x21−1)1/3.
Let t=x21−1, so dt=−x32dx. Limits: x=31→t=8; x=1→t=0.
I=21∫08t1/3dt=21⋅43⋅84/3=83⋅16=6.
∫311x4(x−x3)31dx=
Held on 30 Aug 2022 · Verified 13 Jul 2026.
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