Solving Integrals by Trigonometric substitution/Examples

Question

• ${\displaystyle \int \frac{1}{x^2+1}dx}$

If we look at the relationships between the things that are being substituted we can see that tan is the only one that has a 1 + ${\displaystyle {\tan }^2\theta }$. This means that it is best choice for use as a substition. The purpose of the substitution is to create denominator that is a single trigonometric identity. If we set ${\displaystyle x^2}$ equal to tan squared we get such an expression.

• ${\displaystyle \int \frac{1}{{\tan }^{2}u+1}{\sec }^{2}udu}$

Using the relationship.

• ${\displaystyle =\int \frac{1}{{\sec }^{2}u}{\sec }^{2}udu}$
• ${\displaystyle =\int du}$
• ${\displaystyle =u+c}$

Using the initial substitution

• ${\displaystyle =\arctan x+c}$

${\displaystyle \gamma =frac1\alpha +\beta }$

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