Final answer:
To evaluate the given integral, complete the square and use trigonometric substitution.
Step-by-step explanation:
To evaluate the integral ∫dx/(x² +4x+13)¹/² using completing the square and trigonometric substitution, follow these steps:
- Complete the square by rewriting the expression as ∫dx/((x+2)² +9).
- Make a trigonometric substitution such as x+2 = 3tan(θ), which leads to dx = 3sec²(θ)dθ.
- Substituting these values in the integral gives ∫3sec²(θ)dθ/((3tan(θ))²+9).
- Simplify the expression using trigonometric identities, integrate with respect to θ, and change the variable back to x to obtain the final answer.