4 ∫ 0 X D X - Mathematics

Given that \[\int\limits_0^\infty \frac{x^2}{\left( x^2 + a^2 \right)\left( x^2 + b^2 \right)\left( x^2 + c^2 \right)} dx = \frac{\pi}{2\left( a + b \right)\left( b + c \right)\left( c + a \right)},\] the value of \[\int\limits_0^\infty \frac{dx}{\left( x^2 + 4 \right)\left( x^2 + 9 \right)},\]

\[\int\limits_{- \pi/2}^{\pi/2} \sin\left| x \right| dx\] is equal to

The derivative of \[f\left( x \right) = \int\limits_{x^2}^{x^3} \frac{1}{\log_e t} dt, \left( x > 0 \right),\] is

\[\int\limits_0^{\pi/2} \frac{\sin x}{\sin x + \cos x} dx\] equals to

\[\int\limits_0^\infty \log\left( x + \frac{1}{x} \right) \frac{1}{1 + x^2} dx =\]

If f (a + b − x) = f (x), then \[\int\limits_a^b\] x f (x) dx is equal to

The value of \[\int\limits_{- \pi/2}^{\pi/2} \left( x^3 + x \cos x + \tan^5 x + 1 \right) dx, \] is

\[\int\limits_0^\pi \frac{x \sin x}{1 + \cos^2 x} dx\]

\[\int\limits_0^{\pi/2} \frac{1}{2 \cos x + 4 \sin x} dx\]

\[\int\limits_0^{\pi/2} \frac{dx}{4 \cos x + 2 \sin x}dx\]

\[\int\limits_1^4 \left( x^2 + x \right) dx\]

Evaluate the following using properties of definite integral:

`int_(- pi/2)^(pi/2) sin^2theta "d"theta`

Evaluate the following using properties of definite integral:

`int_0^1 log (1/x - 1) "d"x`

Evaluate the following integrals as the limit of the sum:

`int_1^3 (2x + 3) "d"x`

If `int (3"e"^x - 5"e"^-x)/(4"e"6x + 5"e"^-x)"d"x` = ax + b log |4e^x + 5e –x| + C, then ______.

Evaluate the following:

`int ((x^2 + 2))/(x + 1) "d"x`

Find: `int logx/(1 + log x)^2 dx`

4 ∫ 0 X D X - Mathematics

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4 ∫ 0 X D X - Mathematics

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