Срочно!!!!!Помогите пожалуйста с интергалом

Решите задачу:

$\int \dfrac{dx}{(9+x^2)\sqrt{9+x^2}}=\int \dfrac{dx}{\sqrt{(9+x^2)^3}}=\Big[\; x=3tgt\ ,\ dx=\frac{3\, dt}{cos^2t}\ ,\ t=arctg\frac{x}{3},\\\\\\9+x^2=9+9tg^2t=\frac{9}{cos^2t}\; \Big]=\int \dfrac{3\, dt}{cos^2t\cdot \sqrt{\frac{9}{cos^2t}}}=\int \dfrac{dt}{cost}=\int \dfrac{cosx\, dx}{cos^2x}=\\\\\\=\int \dfrac{cost\cdot dt}{1-sin^2t}=\int \dfrac{d(sint)}{1-sin^2t}=\dfrac{1}{2}\cdot ln\Big|\dfrac{1+sint}{1-sint}\Big|+C=\\\\\\=\dfrac{1}{2}\cdot ln\Big|\dfrac{\sqrt{9+x^2}+x}{\sqrt{9+x^2}-x}\Big|+C$

$ili\ \ \ ...=\int \dfrac{dt}{cost}=ln\Big|tg(\frac{t}{2}+\frac{\pi}{4})\Big|+C=ln\Big|tg\Big(\frac{arctg(x/3)}{2}+\frac{\pi}{4}\Big)\Big|+C$