(Calc 2) 1) Evaluate the given integral using by partis method: S 2xe*dx 2) Evaluate using...
Evaluate the integral by using partial fractions. Please write in clear steps. 2) Evaluate the integral x3 + 5x2 + 12x + 13 x² + 5x + 6 dx
Evaluate the given integral using the substitution (or method) indicated. T (5x-6) dx; v = 5x - 6 + C Need Help? Talk to a Tutor MY NOTES ASK YOUR TEACHER PRACTICE ANOTHER Evaluate the given integral using the substitution (or method) indicated. (4x - 2)4 dx shortcut +C Need Help? Talk to a Tutor Evaluate the given integral using the substitution (or method) indicated. / 4eX/6 dx; shortcut +C
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.
Express the integrand as a sum of partial fractions and evaluate the integral. 48x2 s dx (x-24)(x+8)2 Express the integrand as a sum of partial fractions. S 48x? dx= (x - 24)(x+8)2 SO dx Evaluate the indefinite integral. 48x? (x - 24)(x + 8)2 dx =
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)
(1 point) Show that the line integral 2xe-y dx + (4y – xey) dy is independent of path 0Q - M Evaluate the integral ( 2xe”) dx +(4y= xe=") dy = where C is any path from (1,0) to (3, 1).
Evaluate the integral using the Tabular method. [x*e*2*dx
Evaluate the following integral using trigonometric substitution. dx S 3 2 (1+x²) dx S 11 2 (Type an exact answer.)
Evaluate the following integral using the partial fraction method Jee - А) Зах — 1 dx х (х2 — 4).
2. Integrate by parts S x2 e e-* dx . 3. Use the method of partial fractions to evaluate S ( 5x-5 3x2-8x-3