How do you express $\frac{1}{(x + 6) (x^{2} + 3)}$ $1/((x+6)(x^2+3))$ in partial fractions?

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How do you express $\frac{1}{(x + 6) (x^{2} + 3)}$ $1/((x+6)(x^2+3))$ in partial fractions?

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Answer 1 · 2016-03-28T08:14:38

$\frac{1}{(x + 6) (x^{2} + 3)} = \frac{\frac{1}{39}}{x + 6} + \frac{- \frac{1}{39} x + \frac{2}{13}}{x^{2} + 3}$ $1/((x+6)(x^2+3))=(1/39)/(x+6)+(-1/39x+2/13)/(x^2+3)$

Explanation:

We start setting up the equation with the unknown constants A, B, C

$\frac{1}{(x + 6) (x^{2} + 3)} = \frac{A}{x + 6} + \frac{B x + C}{x^{2} + 3}$ $1/((x+6)(x^2+3))=A/(x+6)+(Bx+C)/(x^2+3)$

After setting this right like this, convert it to one fraction
using the LCD $= (x + 6) (x^{2} + 3)$ $=(x+6)(x^2+3)$

so that

$\frac{1}{(x + 6) (x^{2} + 3)} = \frac{A (x^{2} + 3) + (B x + C) (x + 6)}{(x + 6) (x^{2} + 3)}$ $1/((x+6)(x^2+3))=(A(x^2+3)+(Bx+C)(x+6))/((x+6)(x^2+3))$

simplify

$\frac{1}{(x + 6) (x^{2} + 3)} = \frac{A x^{2} + 3 A + (B x^{2} + C x + 6 B x + 6 C)}{(x + 6) (x^{2} + 3)}$ $1/((x+6)(x^2+3))=(Ax^2+3A+(Bx^2+Cx+6Bx+6C))/((x+6)(x^2+3))$

$\frac{1}{(x + 6) (x^{2} + 3)} = \frac{A x^{2} + 3 A + B x^{2} + C x + 6 B x + 6 C}{(x + 6) (x^{2} + 3)}$ $1/((x+6)(x^2+3))=(Ax^2+3A+Bx^2+Cx+6Bx+6C)/((x+6)(x^2+3))$

Rearrange according to degree from highest to lowest

$\frac{1}{(x + 6) (x^{2} + 3)} = \frac{A x^{2} + B x^{2} + 6 B x + C x + 3 A + 6 C}{(x + 6) (x^{2} + 3)}$ $1/((x+6)(x^2+3))=(Ax^2+Bx^2+6Bx+Cx+3A+6C)/((x+6)(x^2+3))$

Determine the appropriate numerical coefficients

$\frac{0 \cdot x^{2} + 0 \cdot x + 1 \cdot x^{0}}{(x + 6) (x^{2} + 3)}$ $(0*x^2+0*x+1*x^0)/((x+6)(x^2+3))$

$= \frac{(A + B) x^{2} + (6 B + C) x + (3 A + 6 C) x^{0}}{(x + 6) (x^{2} + 3)}$ $=((A+B)x^2+(6B+C)x+(3A+6C)x^0)/((x+6)(x^2+3))$

We can now obtain the equations to solve for A, B, C

$A + B = 0$ $A+B=0" "$ first equation
$6 B + C = 0$ $6B+C=0" "$ second equation
$3 A + 6 C = 1$ $3A+6C=1" "$ third equation

Simultaneous solution of these three equations result to

$A = \frac{1}{39}$ $A=1/39$ and $B = - \frac{1}{39}$ $B=-1/39$ and $C = \frac{2}{13}$ $C=2/13$

so that our final answer is

$\frac{1}{(x + 6) (x^{2} + 3)} = \frac{\frac{1}{39}}{x + 6} + \frac{- \frac{1}{39} x + \frac{2}{13}}{x^{2} + 3}$ $1/((x+6)(x^2+3))=(1/39)/(x+6)+(-1/39x+2/13)/(x^2+3)$

God bless ....I hope the explanation is useful.

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How do you express $\frac{1}{(x + 6) (x^{2} + 3)}$ $1/((x+6)(x^2+3))$ in partial fractions?

1 Answer

Explanation:

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How do you express $\frac{1}{(x + 6) (x^{2} + 3)}$ $1/((x+6)(x^2+3))$ in partial fractions?