Integral de $$$\sqrt{a^{2} - x^{2}}$$$ em relação a $$$x$$$

Encontre $$$\int \sqrt{a^{2} - x^{2}}\, dx$$$.

Seja $$$x=\sin{\left(u \right)} \left|{a}\right|$$$.

Então $$$dx=\left(\sin{\left(u \right)} \left|{a}\right|\right)^{\prime }du = \cos{\left(u \right)} \left|{a}\right| du$$$ (os passos podem ser vistos »).

Além disso, segue-se que $$$u=\operatorname{asin}{\left(\frac{x}{\left|{a}\right|} \right)}$$$.

Portanto,

$$$\sqrt{a^{2} - x^{2}} = \sqrt{- a^{2} \sin^{2}{\left( u \right)} + a^{2}}$$$

Use a identidade $$$1 - \sin^{2}{\left( u \right)} = \cos^{2}{\left( u \right)}$$$:

$$$\sqrt{- a^{2} \sin^{2}{\left( u \right)} + a^{2}}=\sqrt{1 - \sin^{2}{\left( u \right)}} \left|{a}\right|=\sqrt{\cos^{2}{\left( u \right)}} \left|{a}\right|$$$

Supondo que $$$\cos{\left( u \right)} \ge 0$$$, obtemos o seguinte:

$$$\sqrt{\cos^{2}{\left( u \right)}} \left|{a}\right| = \cos{\left( u \right)} \left|{a}\right|$$$

A integral pode ser reescrita como

$${\color{red}{\int{\sqrt{a^{2} - x^{2}} d x}}} = {\color{red}{\int{a^{2} \cos^{2}{\left(u \right)} d u}}}$$

Aplique a fórmula de redução de potência $$$\cos^{2}{\left(\alpha \right)} = \frac{\cos{\left(2 \alpha \right)}}{2} + \frac{1}{2}$$$ com $$$\alpha= u $$$:

$${\color{red}{\int{a^{2} \cos^{2}{\left(u \right)} d u}}} = {\color{red}{\int{\frac{a^{2} \left(\cos{\left(2 u \right)} + 1\right)}{2} d u}}}$$

Aplique a regra do múltiplo constante $$$\int c f{\left(u \right)}\, du = c \int f{\left(u \right)}\, du$$$ usando $$$c=\frac{1}{2}$$$ e $$$f{\left(u \right)} = a^{2} \left(\cos{\left(2 u \right)} + 1\right)$$$:

$${\color{red}{\int{\frac{a^{2} \left(\cos{\left(2 u \right)} + 1\right)}{2} d u}}} = {\color{red}{\left(\frac{\int{a^{2} \left(\cos{\left(2 u \right)} + 1\right) d u}}{2}\right)}}$$

Expand the expression:

$$\frac{{\color{red}{\int{a^{2} \left(\cos{\left(2 u \right)} + 1\right) d u}}}}{2} = \frac{{\color{red}{\int{\left(a^{2} \cos{\left(2 u \right)} + a^{2}\right)d u}}}}{2}$$

Integre termo a termo:

$$\frac{{\color{red}{\int{\left(a^{2} \cos{\left(2 u \right)} + a^{2}\right)d u}}}}{2} = \frac{{\color{red}{\left(\int{a^{2} d u} + \int{a^{2} \cos{\left(2 u \right)} d u}\right)}}}{2}$$

Aplique a regra da constante $$$\int c\, du = c u$$$ usando $$$c=a^{2}$$$:

$$\frac{\int{a^{2} \cos{\left(2 u \right)} d u}}{2} + \frac{{\color{red}{\int{a^{2} d u}}}}{2} = \frac{\int{a^{2} \cos{\left(2 u \right)} d u}}{2} + \frac{{\color{red}{a^{2} u}}}{2}$$

Aplique a regra do múltiplo constante $$$\int c f{\left(u \right)}\, du = c \int f{\left(u \right)}\, du$$$ usando $$$c=a^{2}$$$ e $$$f{\left(u \right)} = \cos{\left(2 u \right)}$$$:

$$\frac{a^{2} u}{2} + \frac{{\color{red}{\int{a^{2} \cos{\left(2 u \right)} d u}}}}{2} = \frac{a^{2} u}{2} + \frac{{\color{red}{a^{2} \int{\cos{\left(2 u \right)} d u}}}}{2}$$

Seja $$$v=2 u$$$.

Então $$$dv=\left(2 u\right)^{\prime }du = 2 du$$$ (veja os passos »), e obtemos $$$du = \frac{dv}{2}$$$.

Logo,

$$\frac{a^{2} u}{2} + \frac{a^{2} {\color{red}{\int{\cos{\left(2 u \right)} d u}}}}{2} = \frac{a^{2} u}{2} + \frac{a^{2} {\color{red}{\int{\frac{\cos{\left(v \right)}}{2} d v}}}}{2}$$

Aplique a regra do múltiplo constante $$$\int c f{\left(v \right)}\, dv = c \int f{\left(v \right)}\, dv$$$ usando $$$c=\frac{1}{2}$$$ e $$$f{\left(v \right)} = \cos{\left(v \right)}$$$:

$$\frac{a^{2} u}{2} + \frac{a^{2} {\color{red}{\int{\frac{\cos{\left(v \right)}}{2} d v}}}}{2} = \frac{a^{2} u}{2} + \frac{a^{2} {\color{red}{\left(\frac{\int{\cos{\left(v \right)} d v}}{2}\right)}}}{2}$$

A integral do cosseno é $$$\int{\cos{\left(v \right)} d v} = \sin{\left(v \right)}$$$:

$$\frac{a^{2} u}{2} + \frac{a^{2} {\color{red}{\int{\cos{\left(v \right)} d v}}}}{4} = \frac{a^{2} u}{2} + \frac{a^{2} {\color{red}{\sin{\left(v \right)}}}}{4}$$

Recorde que $$$v=2 u$$$:

$$\frac{a^{2} u}{2} + \frac{a^{2} \sin{\left({\color{red}{v}} \right)}}{4} = \frac{a^{2} u}{2} + \frac{a^{2} \sin{\left({\color{red}{\left(2 u\right)}} \right)}}{4}$$

Recorde que $$$u=\operatorname{asin}{\left(\frac{x}{\left|{a}\right|} \right)}$$$:

$$\frac{a^{2} \sin{\left(2 {\color{red}{u}} \right)}}{4} + \frac{a^{2} {\color{red}{u}}}{2} = \frac{a^{2} \sin{\left(2 {\color{red}{\operatorname{asin}{\left(\frac{x}{\left|{a}\right|} \right)}}} \right)}}{4} + \frac{a^{2} {\color{red}{\operatorname{asin}{\left(\frac{x}{\left|{a}\right|} \right)}}}}{2}$$

Portanto,

$$\int{\sqrt{a^{2} - x^{2}} d x} = \frac{a^{2} \sin{\left(2 \operatorname{asin}{\left(\frac{x}{\left|{a}\right|} \right)} \right)}}{4} + \frac{a^{2} \operatorname{asin}{\left(\frac{x}{\left|{a}\right|} \right)}}{2}$$

Usando as fórmulas $$$\sin{\left(2 \operatorname{asin}{\left(\alpha \right)} \right)} = 2 \alpha \sqrt{1 - \alpha^{2}}$$$, $$$\sin{\left(2 \operatorname{acos}{\left(\alpha \right)} \right)} = 2 \alpha \sqrt{1 - \alpha^{2}}$$$, $$$\cos{\left(2 \operatorname{asin}{\left(\alpha \right)} \right)} = 1 - 2 \alpha^{2}$$$, $$$\cos{\left(2 \operatorname{acos}{\left(\alpha \right)} \right)} = 2 \alpha^{2} - 1$$$, $$$\sinh{\left(2 \operatorname{asinh}{\left(\alpha \right)} \right)} = 2 \alpha \sqrt{\alpha^{2} + 1}$$$, $$$\sinh{\left(2 \operatorname{acosh}{\left(\alpha \right)} \right)} = 2 \alpha \sqrt{\alpha - 1} \sqrt{\alpha + 1}$$$, $$$\cosh{\left(2 \operatorname{asinh}{\left(\alpha \right)} \right)} = 2 \alpha^{2} + 1$$$, $$$\cosh{\left(2 \operatorname{acosh}{\left(\alpha \right)} \right)} = 2 \alpha^{2} - 1$$$, simplifique a expressão:

$$\int{\sqrt{a^{2} - x^{2}} d x} = \frac{a^{2} x \sqrt{- \frac{x^{2}}{\left|{a}\right|^{2}} + 1}}{2 \left|{a}\right|} + \frac{a^{2} \operatorname{asin}{\left(\frac{x}{\left|{a}\right|} \right)}}{2}$$

Simplifique ainda mais:

$$\int{\sqrt{a^{2} - x^{2}} d x} = \frac{a^{2} \operatorname{asin}{\left(\frac{x}{\left|{a}\right|} \right)}}{2} + \frac{x \sqrt{a^{2} - x^{2}}}{2}$$

Adicione a constante de integração:

$$\int{\sqrt{a^{2} - x^{2}} d x} = \frac{a^{2} \operatorname{asin}{\left(\frac{x}{\left|{a}\right|} \right)}}{2} + \frac{x \sqrt{a^{2} - x^{2}}}{2}+C$$

$$$\int \sqrt{a^{2} - x^{2}}\, dx = \left(\frac{a^{2} \operatorname{asin}{\left(\frac{x}{\left|{a}\right|} \right)}}{2} + \frac{x \sqrt{a^{2} - x^{2}}}{2}\right) + C$$$A