Integrate the rational function: $\frac{1}{x^2-9}$

Let $\frac{1}{(x+3)(x-3)} = \frac{A}{(x+3)}+\frac{B}{(x-3)}$ 1 = A (x-3)+B(x+3) Equating the coefficients of x and constant term, we obtain A + B = 0 −3A + 3B = 1 On solving, we obtain A =- $\frac{1}{6}$ and B = $\frac{1}{6}$ ∴ $\frac{1}{(x+3)(x-3)}=\frac{-1}{6(x+3)}+\frac{1}{6(x-3)}$ $\Rightarrow \int\frac{1}{(xx^2-9)}dx=\int\bigg(\frac{-1}{6(x+3)}+\frac{1}{6(x-3)}\bigg)dx$ = $-\frac{1}{6}\log\mid x+3 \mid +\frac{1}{6}\log \mid x-3 \mid+C$ $\frac{1}{6}\log \mid\frac{(x-3)}{(x+3)} \mid+C$