2. Integrate by parts S x2 e e-* dx . 3. Use the method of partial...
Integrate ex- - 8x + 18 dx by using the partial fractions method. Which of the following is correct? x2-9x + 20 4 AS**** *28 dx = S** 5 Ox x2 - 8x + 18 J XP-9x + 20 +- - 4 X - X - 5 oc s***8* * 28 dx=51-x katika O B. None of the other choices given is correct. px? - 8x + 18 2 72-9x + 20 ( - 4 x -504 -5 x2 -...
Evaluate the integral. 4) S -2x cos 7x dx Integrate the function. dx (x2+36) 3/2 5) S; 5) Express the integrand as a sum of partial fractions and evaluate the integral. 7x - 10 6) S -dx x² . 44 - 12 6)
integrate with your best choice (substitution rule, by parts, or partial fractions) d) ( z*In(a)dx e) / ** +20 – 12 I x(x2 - 1 dx
Evaluate the following integrals. S 5x-2 dx x2-4 s 9x+25 (x+3)2 dx 2 x3+3x2-4x-12 dx x2+x-6
6. Use the method of partial fractions to evaluate the indefinite integral. 8x' + 13x •dx (x + 2) 7. Consider a. Using complete sentences, explain why the integral is improper. b. Evaluate the improper integral to determine its convergence or divergence.
(Calc 2) 1) Evaluate the given integral using by partis method: S 2xe*dx 2) Evaluate using partial fractions method: S •dx x²-x-6 5x
label the u du v dv Integrate by parts x2 e-* dx.
C. Involving Partial fractions 4 z+ 2z + 3 S x2 + 5x – 14 dx in S2-6)(22+4) dz 4x - 11 dx iv) *342 + 4)(22 +7) 8 +t+6t2 - 12t3 dt.
- 2 + 6 Integrate -dx. 23 + 3x The partial fraction decomposition is (write all terms as fractions): dx The final answer is: dx = 23 + 3x Check Answer
integrate(please show work) 8x S=2 -2°*sinV5 x – 3e *sinv 5 x dx 10x 5 e