3. (Trigonometric substitution and partial fractions) In this question, you are asked to solve the integral S √²+2x+2 dx (x € (0, ∞)), which involves multiple steps. Answer the following questions to obtain the solution. de. i. Complete the square, use a substitution, and a trigonometric substitution to convert the integral into 5 sin² (9) cos(8) ii. Use the substitution v = : sin(₹) to convert the integral into S²(1-²) dv. iii. Use partial fractions to show that the integral equals √3-1 √²+2x+2 dx. x²+2x+1 iv. Evaluate /1+(1+x)² 1+x +In √1+(1+x)²+1+x √1+(1+x)²-1-x +C

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3. (Trigonometric substitution and partial fractions) In this question, you are asked to solve the integral dx (x = (0, ∞)), which involves multiple steps. Answer the following questions to obtain the solution. S √x²+2x+2 x²+2x+1 i. Complete the square, use a substitution, and a trigonometric substitution to convert the integral into 5 sin²(0) cos(0) -do. sin() to convert the integral into [ ²(1-²) dv. ii. Use the substitution v = iii. Use partial fractions to show that the integral equals iv. Evaluate √3-1 √√√x²+2x+² dx. x²+2x+1 1+(1+x)² 1+x 1 + In /1+(1+x)²+1+x √1+(1+x)²− -1-x + C