here 4x-8/x-2 is also in reduced form.
Q5). Integrate using Partial Fractions (show all working) 4x-8 dx x-2
Integrate using partial fractions. Х dx 4 1 +X
3) Complete the Partial Fractions and find the indefinite integral r-3x5 +4x4 +2x3 10x2 +4x +8 x3(x 1)2(x +2)2 dx 3) Complete the Partial Fractions and find the indefinite integral r-3x5 +4x4 +2x3 10x2 +4x +8 x3(x 1)2(x +2)2 dx
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 -...
- 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 with your best choice (substitution rule, by parts, or partial fractions) d) ( z*In(a)dx e) / ** +20 – 12 I x(x2 - 1 dx
Express the integrand as a sum of partial fractions and evaluate the integrals. x+8 -dx 2x3 - 8x Rewrite the integrand as the sum of partial fractions. x+8 2x - 8x Evaluate the integrals. X+8 -dx = 2x3 - 8x
QUESTION 1 Expand the quotient by partial fractions. 4x +4 (x - 5)(x - 2) 8 + X-5 X-2 8 -4. X-5 (x - 5)(x - 2) 8 HA + X-5 X-2 24 12 X-5 X-2 +
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 using partial fractions 4 + 9x2 +r+2 dx 2 +9
integrate. state du and u a) tan(4x sec (4x)dr dx r +1 b) dx x +1 c) csc (3xax a) tan(4x sec (4x)dr dx r +1 b) dx x +1 c) csc (3xax