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Question
Resolve the following rational expressions into partial fractions
`x/((x^2 + 1)(x - 1)(x + 2))`
Solution
`x/((x^2 + 1)(x - 1)(x + 2)) = ("A"x + "B")/(x^2 + 1) + "C"/(x - 1) + "D"/(x + 2)`
`x/((x^2 + 1)(x - 1)(x + 2)) = (("A"x + "B")(x - 1)(x + 2) + "C"(x^2 + 1)(x + 2) + "D"(x^2 + 1)(x - 1))/((x^2 + 1)(x - 1)(x + 2))`
x = A(x + 1)(x + 2) + B(x – 1)(x + 2) + C(x2 + 1)(x + 2) + D(x2 + 1)(x – 1) ......(1)
Put x = 1 in equation (1)
1 = A(1)(1 – 1)(1 + 2) + B(1 – 1)(1 + 2) + C(12 + 1)(1 + 2) + D(12 + 1)(1 – 1)
1 = A × 0 + B × 0 + C(2)(3) + D × 0
1 = 6C
⇒ C = `1/6`
Put x = – 2 in equation (1)
– 2 = A(– 2)(– 2 – 1)(– 2 + 2) + B(– 2 – 1)(– 2 + 2) + C ((– 2)2 + 1)(– 2 + 2) + D((– 2)2 + 1)(– 2 – 1)
– 2 = A × 0 + B × 0 + C × 0 + D(4 + 1)(– 3)
– 2 = D(5)(– 3)
⇒ – 2 = – 15 D
⇒ D = `2/15`
Put x = 0 in equation (1)
0 = A(0)(0 – 1)(0 + 2) + B(0 – 1)(0 + 2)+ C(02 + 1)(0 + 2) + D(02 + 1)(0 – 1)
0 = 0 + B(– 2) + C(2) + D(– 1)
0 = – 2B + 2C – D
0 = `- 2"B" + 2 xx 1/6 - 2/15`
⇒ 2B = `1/3 - 2/15`
⇒ 2B = `(5 - 2)/15`
⇒ 2B = `3/15`
⇒ 2B = `1/5`
⇒ B = `1/10`
In equation (1), equate the coefficient of x3 on both sides
0 = A + C + D
0 = `"A" + 1/6 + 2/15`
⇒ A = `- 1/6 - 2/15`
= `(- 5 - 4)/30`
= `- 9/30`
⇒ A = `- 3/10`
∴ The required partial fractions is
`x/((x^2 + 1)(x - 1)(x + 2)) = (- 3/10 x + 1/10)/(x^2 + 1) + (1/6)/(x - 1) + (2/15)/(x + 2)`
`x/((x^2 + 1)(x - 1)(x + 2)) = (1 - 3x)/(10(x^2 + 1)) + 1/(6(x - 1)) + 2/(15(x + 2))`
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