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integrate with your best choice (substitution rule, by parts, or partial fractions)
integrate with your best choice (substitution rule, by parts, or partial fractions) d) ( z*In(a)dx e)...
2. Integrate by parts S x2 e e-* dx . 3. Use the method of partial fractions to evaluate S ( 5x-5 3x2-8x-3
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 -...
Integrate using partial fractions. Х dx 4 1 +X
(1 point) Calculate the integral below by partial fractions and by using the indicated substitution. Be sure that you can show how the results you obtain are the same. 1. 2x - dx 1 x² – 64 +C. First, rewrite this with partial fractions: I ZX64 dx = | dx + dx = (Note that you should not include the +C in your entered answer, as it has been provided at the end of the expression.) Next, use the substitution...
by trig substitution please 2. Integrate the function. 5 dx 6 + x2 2 D) 2 x +6 2. Integrate the function. 5 dx 6 + x2 2 D) 2 x +6
Q5). Integrate using Partial Fractions (show all working) 4x-8 dx x-2
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)
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.
jusr d and e 4. Evaluate the following integrals by making appropriate substitution. fe*(e* 1)?dx + a. esc2x dx cot3x dx Vx+2 b. C. S dx d. 1 (1+x) dx 0 x2+1 e. 4. Evaluate the following integrals by making appropriate substitution. fe*(e* 1)?dx + a. esc2x dx cot3x dx Vx+2 b. C. S dx d. 1 (1+x) dx 0 x2+1 e.