Integral de $$$\frac{\sin{\left(\pi \left(z - 1\right) \right)}}{\pi \left(z - 1\right)}$$$ em relação a $$$\pi$$$

Encontre $$$\int \frac{\sin{\left(\pi \left(z - 1\right) \right)}}{\pi \left(z - 1\right)}\, d\pi$$$.

Aplique a regra do múltiplo constante $$$\int c f{\left(\pi \right)}\, d\pi = c \int f{\left(\pi \right)}\, d\pi$$$ usando $$$c=\frac{1}{z - 1}$$$ e $$$f{\left(\pi \right)} = \frac{\sin{\left(\pi \left(z - 1\right) \right)}}{\pi}$$$:

$${\color{red}{\int{\frac{\sin{\left(\pi \left(z - 1\right) \right)}}{\pi \left(z - 1\right)} d \pi}}} = {\color{red}{\frac{\int{\frac{\sin{\left(\pi \left(z - 1\right) \right)}}{\pi} d \pi}}{z - 1}}}$$

Seja $$$u=\pi \left(z - 1\right)$$$.

Então $$$du=\left(\pi \left(z - 1\right)\right)^{\prime }d\pi = \left(z - 1\right) d\pi$$$ (veja os passos »), e obtemos $$$d\pi = \frac{du}{z - 1}$$$.

Assim,

$$\frac{{\color{red}{\int{\frac{\sin{\left(\pi \left(z - 1\right) \right)}}{\pi} d \pi}}}}{z - 1} = \frac{{\color{red}{\int{\frac{\sin{\left(u \right)}}{u} d u}}}}{z - 1}$$

Esta integral (Integral seno) não possui forma fechada:

$$\frac{{\color{red}{\int{\frac{\sin{\left(u \right)}}{u} d u}}}}{z - 1} = \frac{{\color{red}{\operatorname{Si}{\left(u \right)}}}}{z - 1}$$

Recorde que $$$u=\pi \left(z - 1\right)$$$:

$$\frac{\operatorname{Si}{\left({\color{red}{u}} \right)}}{z - 1} = \frac{\operatorname{Si}{\left({\color{red}{\pi \left(z - 1\right)}} \right)}}{z - 1}$$

Portanto,

$$\int{\frac{\sin{\left(\pi \left(z - 1\right) \right)}}{\pi \left(z - 1\right)} d \pi} = \frac{\operatorname{Si}{\left(\pi \left(z - 1\right) \right)}}{z - 1}$$

Adicione a constante de integração:

$$\int{\frac{\sin{\left(\pi \left(z - 1\right) \right)}}{\pi \left(z - 1\right)} d \pi} = \frac{\operatorname{Si}{\left(\pi \left(z - 1\right) \right)}}{z - 1}+C$$

$$$\int \frac{\sin{\left(\pi \left(z - 1\right) \right)}}{\pi \left(z - 1\right)}\, d\pi = \frac{\operatorname{Si}{\left(\pi \left(z - 1\right) \right)}}{z - 1} + C$$$A