How do you write the partial fraction decomposition of the rational expression $3/(x ^(2) + 16x +5)$ ?

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How do you write the partial fraction decomposition of the rational expression $3/(x ^(2) + 16x +5)$ ?

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Answer 1 · 2015-12-14T21:12:17

$3/(x^2+16x+5)$

Explanation:

Notice how the denominator cannot be factored (within the real numbers).

This fraction is already as simple as it can get.

Answer 2 · 2015-12-14T22:05:35

$3/(x^2+16x+5) = 3/(2 sqrt(59)(x+8-sqrt(59)))-3/(2 sqrt(59)(x+8+sqrt(59)))$

Explanation:

$x^2+16x+5 = x^2+16x+64-59$

$=(x+8)^2-(sqrt(59))^2$

$=(x+8-sqrt(59))(x+8+sqrt(59))$

So to find the partial fraction decomposition, solve:

$3/((x+8-sqrt(59))(x+8+sqrt(59)))$

$= A/(x+8-sqrt(59)) + B/(x+8+sqrt(59))$

$= (A(x+8+sqrt(59))+B(x+8-sqrt(59)))/((x+8-sqrt(59))(x+8+sqrt(59)))$

$=((A+B)x + 8(A+B) + (A-B)sqrt(59))/((x+8-sqrt(59))(x+8+sqrt(59)))$

Equating the coefficient of $x$ , we find $A+B = 0$ . So $B = -A$ .

Equating the remaining constant term we find $2 A sqrt(59) = 3$

Hence $A=3/(2 sqrt(59))$ and:

$3/(x^2+16x+5) = 3/(2 sqrt(59)(x+8-sqrt(59)))-3/(2 sqrt(59)(x+8+sqrt(59)))$

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How do you write the partial fraction decomposition of the rational expression $3/(x ^(2) + 16x +5)$ ?

2 Answers

Explanation:

Explanation:

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Science

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Humanities

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How do you write the partial fraction decomposition of the rational expression 3/(x ^(2) + 16x +5) 3/(x ^(2) + 16x +5)?

2 Answers

Explanation:

Explanation:

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How do you write the partial fraction decomposition of the rational expression $3/(x ^(2) + 16x +5)$ ?