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Integral de $$$\frac{1}{- a^{2} + x^{2}}$$$ em relação a $$$x$$$
Calculadora relacionada: Calculadora de Integrais Definidas e Impróprias
Sua entrada
Encontre $$$\int \frac{1}{- a^{2} + x^{2}}\, dx$$$.
Solução
Efetuar a decomposição em frações parciais:
$${\color{red}{\int{\frac{1}{- a^{2} + x^{2}} d x}}} = {\color{red}{\int{\left(- \frac{1}{2 \left(x + \left|{a}\right|\right) \left|{a}\right|} + \frac{1}{2 \left(x - \left|{a}\right|\right) \left|{a}\right|}\right)d x}}}$$
Integre termo a termo:
$${\color{red}{\int{\left(- \frac{1}{2 \left(x + \left|{a}\right|\right) \left|{a}\right|} + \frac{1}{2 \left(x - \left|{a}\right|\right) \left|{a}\right|}\right)d x}}} = {\color{red}{\left(\int{\frac{1}{2 \left(x - \left|{a}\right|\right) \left|{a}\right|} d x} - \int{\frac{1}{2 \left(x + \left|{a}\right|\right) \left|{a}\right|} d x}\right)}}$$
Aplique a regra do múltiplo constante $$$\int c f{\left(x \right)}\, dx = c \int f{\left(x \right)}\, dx$$$ usando $$$c=\frac{1}{2 \left|{a}\right|}$$$ e $$$f{\left(x \right)} = \frac{1}{- a + x}$$$:
$$- \int{\frac{1}{2 \left(x + \left|{a}\right|\right) \left|{a}\right|} d x} + {\color{red}{\int{\frac{1}{2 \left(x - \left|{a}\right|\right) \left|{a}\right|} d x}}} = - \int{\frac{1}{2 \left(x + \left|{a}\right|\right) \left|{a}\right|} d x} + {\color{red}{\left(\frac{\int{\frac{1}{- a + x} d x}}{2 \left|{a}\right|}\right)}}$$
Seja $$$u=- a + x$$$.
Então $$$du=\left(- a + x\right)^{\prime }dx = 1 dx$$$ (veja os passos »), e obtemos $$$dx = du$$$.
Logo,
$$- \int{\frac{1}{2 \left(x + \left|{a}\right|\right) \left|{a}\right|} d x} + \frac{{\color{red}{\int{\frac{1}{- a + x} d x}}}}{2 \left|{a}\right|} = - \int{\frac{1}{2 \left(x + \left|{a}\right|\right) \left|{a}\right|} d x} + \frac{{\color{red}{\int{\frac{1}{u} d u}}}}{2 \left|{a}\right|}$$
A integral de $$$\frac{1}{u}$$$ é $$$\int{\frac{1}{u} d u} = \ln{\left(\left|{u}\right| \right)}$$$:
$$- \int{\frac{1}{2 \left(x + \left|{a}\right|\right) \left|{a}\right|} d x} + \frac{{\color{red}{\int{\frac{1}{u} d u}}}}{2 \left|{a}\right|} = - \int{\frac{1}{2 \left(x + \left|{a}\right|\right) \left|{a}\right|} d x} + \frac{{\color{red}{\ln{\left(\left|{u}\right| \right)}}}}{2 \left|{a}\right|}$$
Recorde que $$$u=- a + x$$$:
$$\frac{\ln{\left(\left|{{\color{red}{u}}}\right| \right)}}{2 \left|{a}\right|} - \int{\frac{1}{2 \left(x + \left|{a}\right|\right) \left|{a}\right|} d x} = \frac{\ln{\left(\left|{{\color{red}{\left(- a + x\right)}}}\right| \right)}}{2 \left|{a}\right|} - \int{\frac{1}{2 \left(x + \left|{a}\right|\right) \left|{a}\right|} d x}$$
Aplique a regra do múltiplo constante $$$\int c f{\left(x \right)}\, dx = c \int f{\left(x \right)}\, dx$$$ usando $$$c=\frac{1}{2 \left|{a}\right|}$$$ e $$$f{\left(x \right)} = \frac{1}{a + x}$$$:
$$\frac{\ln{\left(\left|{a - x}\right| \right)}}{2 \left|{a}\right|} - {\color{red}{\int{\frac{1}{2 \left(x + \left|{a}\right|\right) \left|{a}\right|} d x}}} = \frac{\ln{\left(\left|{a - x}\right| \right)}}{2 \left|{a}\right|} - {\color{red}{\left(\frac{\int{\frac{1}{a + x} d x}}{2 \left|{a}\right|}\right)}}$$
Seja $$$u=a + x$$$.
Então $$$du=\left(a + x\right)^{\prime }dx = 1 dx$$$ (veja os passos »), e obtemos $$$dx = du$$$.
A integral pode ser reescrita como
$$\frac{\ln{\left(\left|{a - x}\right| \right)}}{2 \left|{a}\right|} - \frac{{\color{red}{\int{\frac{1}{a + x} d x}}}}{2 \left|{a}\right|} = \frac{\ln{\left(\left|{a - x}\right| \right)}}{2 \left|{a}\right|} - \frac{{\color{red}{\int{\frac{1}{u} d u}}}}{2 \left|{a}\right|}$$
A integral de $$$\frac{1}{u}$$$ é $$$\int{\frac{1}{u} d u} = \ln{\left(\left|{u}\right| \right)}$$$:
$$\frac{\ln{\left(\left|{a - x}\right| \right)}}{2 \left|{a}\right|} - \frac{{\color{red}{\int{\frac{1}{u} d u}}}}{2 \left|{a}\right|} = \frac{\ln{\left(\left|{a - x}\right| \right)}}{2 \left|{a}\right|} - \frac{{\color{red}{\ln{\left(\left|{u}\right| \right)}}}}{2 \left|{a}\right|}$$
Recorde que $$$u=a + x$$$:
$$\frac{\ln{\left(\left|{a - x}\right| \right)}}{2 \left|{a}\right|} - \frac{\ln{\left(\left|{{\color{red}{u}}}\right| \right)}}{2 \left|{a}\right|} = \frac{\ln{\left(\left|{a - x}\right| \right)}}{2 \left|{a}\right|} - \frac{\ln{\left(\left|{{\color{red}{\left(a + x\right)}}}\right| \right)}}{2 \left|{a}\right|}$$
Portanto,
$$\int{\frac{1}{- a^{2} + x^{2}} d x} = \frac{\ln{\left(\left|{a - x}\right| \right)}}{2 \left|{a}\right|} - \frac{\ln{\left(\left|{a + x}\right| \right)}}{2 \left|{a}\right|}$$
Simplifique:
$$\int{\frac{1}{- a^{2} + x^{2}} d x} = \frac{\ln{\left(\left|{a - x}\right| \right)} - \ln{\left(\left|{a + x}\right| \right)}}{2 \left|{a}\right|}$$
Adicione a constante de integração:
$$\int{\frac{1}{- a^{2} + x^{2}} d x} = \frac{\ln{\left(\left|{a - x}\right| \right)} - \ln{\left(\left|{a + x}\right| \right)}}{2 \left|{a}\right|}+C$$
Resposta
$$$\int \frac{1}{- a^{2} + x^{2}}\, dx = \frac{\ln\left(\left|{a - x}\right|\right) - \ln\left(\left|{a + x}\right|\right)}{2 \left|{a}\right|} + C$$$A