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Question
Resolve the following rational expressions into partial fractions
`(x - 1)^2/(x^3 + x)`
Solution
`(x - 1)^2/(x^3 + x) = (x - 1)^2/(x(x^2 + 1))`
`(x - 1)^2/(x^3 + x) = "A"/x + ("B"x + "C")/(x^2 + 1)`
`(x - 1)^2/(x^3 + x) = ("A"(x^2 + 1) + ("B"x + "C")x)/(x(x^2 + 1))`
(x – 1)2 = A(x2 + 1) + Bx2 + Cx ......(1)
Put x = 0 in equation (1)
(0 – 1)2 = A(02 + 1) + B × 0 + C × 0
1 = A + 0 + 0
⇒ A = 1
Equating the coefficient of x2 on both sides
1 = A + B
1 = 1 + B
⇒ B = 0
Put x = 1 in equation (1)
(1 – 1)2 = A(12 + 1) + B × 12 + C × 1
0 = 2A + B + C
0 = 2 × 1 + 0 + C
⇒ C = – 2
∴ The required partial fraction is
`(x - 1)^2/(x^3 + x) = 1/x + (0*x - 2)/(x^2 + 1)`
`(x - 1)^2/(x^3 + x) = 1/x - 2/(x^2 + 1)`
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