Primitive of Reciprocal of x cubed by x squared plus a squared squared/Partial Fraction Expansion

Lemma for Primitive of Reciprocal of $x^3 \left({x^2 + a^2}\right)^2$

 * $\dfrac 1 {x^3 \left({x^2 + a^2}\right)^2} \equiv -\dfrac 2 {a^6 x} + \dfrac 1 {a^4 x^3} + \dfrac {2 x} {a^6 \left({x^2 + a^2}\right)} + \dfrac x {a^4 \left({x^2 + a^2}\right)^2}$

Proof
Setting $x = 0$ in $(1)$:

Equating coefficients of $x^2$ in $(1)$:

Equating coefficients of $x^6$ in $(1)$:

Equating coefficients of $x$ in $(1)$:

Equating coefficients of $x^5$ in $(1)$:

Equating coefficients of $x^3$ in $(1)$:

Equating coefficients of $x^4$ in $(1)$:

Summarising:

Hence the result.