How do you integrate $\int \frac{3 x - 1}{x^{2} - x}$ $int (3x-1)/(x^2-x)$ using partial fractions?

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How do you integrate $\int \frac{3 x - 1}{x^{2} - x}$ $int (3x-1)/(x^2-x)$ using partial fractions?

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Answer 1 · 2018-04-12T16:41:20

The answer is $= ln (| x |) + 2 ln (| x - 1 |) + C$ $=ln(|x|)+2ln (|x-1|)+C$

Explanation:

Perform the decomposition into partial fractions

$\frac{3 x - 1}{x^{2} - x} = \frac{3 x - 1}{x (x - 1)} = \frac{A}{x} + \frac{B}{x - 1}$ $(3x-1)/(x^2-x)=(3x-1)/(x(x-1))=A/(x)+B/(x-1)$

$= \frac{A (x - 1) + B x}{x (x - 1)}$ $=(A(x-1)+Bx)/(x(x-1))$

The denominators are the same, compare the numerators

$3 x - 1 = A (x - 1) + B x$ $3x-1=A(x-1)+Bx$

Let $x = 0$ $x=0$ , $\Rightarrow$ $=>$ , $- 1 = - A$ $-1=-A$ , $\Rightarrow$ $=>$ , $A = 1$ $A=1$

Let $x = 1$ $x=1$ , $\Rightarrow$ $=>$ , $2 = B$ $2=B$ , $\Rightarrow$ $=>$ , $B = 2$ $B=2$

Therefore,

$\frac{3 x - 1}{x^{2} - x} = \frac{1}{x} + \frac{2}{x - 1}$ $(3x-1)/(x^2-x)=1/(x)+2/(x-1)$

$\int \frac{(3 x - 1) d x}{x^{2} - x} = \int \frac{1 d x}{x} + \int \frac{2 d x}{x - 1}$ $int((3x-1)dx)/(x^2-x)=int(1dx)/(x)+int(2dx)/(x-1)$

$= ln (| x |) + 2 ln (| x - 1 |) + C$ $=ln(|x|)+2ln (|x-1|)+C$

Answer 2 · 2018-04-12T16:57:50

$ln | x | + 2 ln | (x - 1) | + C, or, ln ∣ ∣ x {(x - 1)}^{2} ∣ ∣ + C$ $ln|x|+2ln|(x-1)|+C, or, ln|x(x-1)^2|+C$ .

Explanation:

Suppose that, $I = \int \frac{3 x - 1}{x^{2} - x} d x = \int \frac{3 x - 1}{x (x - 1)} d x$ $I=int(3x-1)/(x^2-x)dx=int(3x-1)/{x(x-1)}dx$

To decompose the integrand $\frac{3 x - 1}{x (x - 1)}$ $(3x-1)/{x(x-1)}$ into partial

fraction, we let, for some $A,B in RR$ ,

$(3x-1)/{x(x-1)}=A/x+B/(x-1)={A(x-1)+Bx}/{x(x-1)}$ ,

$rArr A(x-1)+Bx=3x-1...........(diamond)$ .

$"Note that "(diamond)" must hold "AA x in RR," in particular so, for"$

$x=0, and x=1$ .

$x=0, x=1, and (diamond) rArr A=1, &, B=2," resp."$ .

$:. I=int{1/x+2/(x-1)}dx$ ,

$=ln|x|+2ln|(x-1)|$ .

$rArr I=ln|x|+2ln|(x-1)|+C, or, ln|x(x-1)^2|+C$ .

Enjoy Maths.!

Answer 3 · 2018-04-12T17:09:39

$2ln|(x-1)|+ln|x|+C$ .

Explanation:

The Question can easily be solved without using the

Method of Partial Fraction, as shown below :

$int(3x-1)/(x^2-x)dx=int(3x-1)/{x(x-1)}dx$ ,

$=int{(3x)/{x(x-1)}-1/{x(x-1)}}dx$ ,

$=int{3/(x-1)-{x-(x-1)}/{x(x-1)}}dx$ ,

$=int[3/(x-1)-{x/{x(x-1)}-(x-1)/{x(x-1)}}]dx$ ,

$=3intdx/(x-1)-intdx/(x-1)+intdx/x$ ,

$=2intdx/(x-1)+intdx/x$ ,

$=2ln|(x-1)|+ln|x|+C$ , as before!

Enjoy Maths!

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