\int_{1}^{0} \tan(x^2)dx+2\int_{1}^{0} x^2 \sec^2(x^2)dx=\frac{\pi}{4} Select one: True False

rastafarral6

rastafarral6

Answered question

2021-12-02

10tan(x2)dx+210x2sec2(x2)dx=π4
Select one:
True
False

Answer & Explanation

Steven Arredondo

Steven Arredondo

Beginner2021-12-03Added 18 answers

Step1
This qestion belongs to the definite intergal in which we have to justify the given statement is true or false by
providing the correct solution of the given question. We can write the given statement below
10tan(x2)dx+210x2sec(x2)dx=π4 to solve the question we move to the nest step-2
Step 2
first, we write the given statement below and take the LHS side of the given statement so
10tan(x2)dx+210x2sec(x2)dx=π4
now take the LHS side
LHS=10tan(x2)dx+210x2sec(x2)dx
=10tan(x2)dx+210x2sec(x2)dx
Now use the integration by part consider p and q function of x
pqdx=pqdx(dpdxqdx)dx
now apply
=10tan(x2)dx+210x2sec(x2)dx
=tan(x2)101dx10(ddxtan(x2)101dx)dx+210x2sec(x2)dx

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