Integrate the rational function: \(\frac {1}{x^4-1}\)
Solution and Explanation
\(\frac {1}{x^4-1}\) = \(\frac {1}{(x^2-1)(x^2+1)}\)= \(\frac {1}{(x+1)(x-1)(1+x^2)}\)
Let \(\frac {1}{(x+1)(x-1)(1+x^2)}\) = \(\frac {A}{(x+1)}+\frac {B}{(x-1)}+\frac {Cx+D}{(x^2+1)}\)
\(1 = A(x-1)(x^2+1)+B(x+1)(x^2+1)+(Cx+D)(x^2-1)\)
\(1 = A(x^3+x-x^2-1)+B(x^3+x+x^2+1)+Cx^3+Dx^2-Cx-D\)
\(1 = (A+B+C)x^3+(-A+B+D)x^2+(A+B-C)x+(-A+B-D)\)
\(Equating \ the\ coefficient\ of\ x^3 , x^2 , x, and \ constant \ term, \ we \ obtain\)
\(A+B+C = 0\)
\(-A+B+D = 0\)
\(A+B-C = 0\)
\(-A+B-D = 1\)
\(On\ solving\ these\ equations, \ we \ obtain\)
\(A=-\frac 14, \ B=\frac 14,\ C=0,and \ D=-\frac 12\)
∴ \(\frac {1}{x^4-1}\)\(=-\frac 14(x+1)+\frac 14(x-1)-\frac 12(x^2+1)\)
⇒ \(∫\)\(\frac {1}{x^4-1}\ dx\) = \(-\frac 14\ log|x-1|+\frac 14log\ |x-1|-\frac 12\ tan^{-1}x+C\)
\(=\frac 14\ log|\frac {x-1}{x+1}|-\frac 12tan^{-1} x+C\)
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Concepts Used:
Integration by Partial Fractions
The number of formulas used to decompose the given improper rational functions is given below. By using the given expressions, we can quickly write the integrand as a sum of proper rational functions.
For examples,
