Find the indefinite integral by making a change of variables. \int x^2 \sqrt{1-x}dx

Maiclubk

Maiclubk

Answered question

2021-09-12

Find the indefinite integral by making a change of variables.
x21xdx

Answer & Explanation

Talisha

Talisha

Skilled2021-09-13Added 93 answers

Step 1:To determine To determine x21xdx
Step 2: Calculation Let 1x=u Differentiating on both sides , we get , dx=dudx=du
Since, 1x=u1u=xx2=(1u)2x2(1x)dx=(1u)2udu
So , Calculating (1u)2u12du
=(1+u22u)u12du
=(u12+u522u32)du
=[u3232+u32322u32{32}]
=[23u32+27u7245u52]
=23u3227u72+45u52+C
Substituting back value of u=1x, we get
x2(1x)dx=23(1x)3227(1x)72+45(1x)52+C
Step 3:Conclusion

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