Find the indefinite integral \int x\sin x^{2}dx

krypsojx

krypsojx

Answered question

2021-11-23

Find the indefinite integral xsinx2dx

Answer & Explanation

Phisecome

Phisecome

Beginner2021-11-24Added 18 answers

Step 1
Given: The integral xsinx2dx,
To evaluate: The given indefinite integral.
Step 2
Explanation:
Let I=xsinx2dx
Substituting
x2=t
2xdx=dt
xdx=dt2
Hence
I=sintdt2
I=12sintdt
I=12cost+C   [sinxdx=cosx]
Now substituting t=x2,
I=cosx22+C
Where C is arbitrary constant known as constant of integration.
Answer: xsinx2dx=cosx22+C, where C is constant of integration.
Befory

Befory

Beginner2021-11-25Added 19 answers

Step 1: Use Integration by Substitution.
Let u=x2,du=2xdx, then xdx=12du
Step 2: Using u and du above, rewrite xsin(x2)dx.
sinu2du
Step 3: Use Constant Factor Rule: cf(x)dx=cf(x)dx.
12sinudu
Step 4: Use Trigonometric Integration: the integral of sinu is cosu.
cosu2
Step 5: Substitute u=x2 back into the original integral.
cos(x2)2
Step 6: Add constant.
cos(x2)2+C

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