![integration - Geometric interpretation of integral $-\int\frac{1}{\sqrt{a+2bx-hx^{2}}}dx=\frac{1}{\sqrt{h}}\arccos\frac{b-hx}{\sqrt{b^{2}+ah}}$ - Mathematics Stack Exchange integration - Geometric interpretation of integral $-\int\frac{1}{\sqrt{a+2bx-hx^{2}}}dx=\frac{1}{\sqrt{h}}\arccos\frac{b-hx}{\sqrt{b^{2}+ah}}$ - Mathematics Stack Exchange](https://i.stack.imgur.com/Q5D1O.png)
integration - Geometric interpretation of integral $-\int\frac{1}{\sqrt{a+2bx-hx^{2}}}dx=\frac{1}{\sqrt{h}}\arccos\frac{b-hx}{\sqrt{b^{2}+ah}}$ - Mathematics Stack Exchange
![arccos(x) integral | What is integrate of arccosx or cos^-1x? ~ Mathematics - Graph Drawing - Derivative - Integral arccos(x) integral | What is integrate of arccosx or cos^-1x? ~ Mathematics - Graph Drawing - Derivative - Integral](https://blogger.googleusercontent.com/img/b/R29vZ2xl/AVvXsEh5k3KJjI-aJcXpnEnv33_ITHuzPVz3ZxGFkL7FQkQFNVgBeqagxkBqLk8Q9hv3y-tccYsXbkT5u28lTiQpNVRUPGqaI7DkK83NwBt73K8o_1praD-z6Qavjb2d_AfKyFyUwAuGHt4kMG0MAR50vPNtP9-mO1ye6xVgMEbxPsRsdpvBw6jls2SrmQvAVQ/s540/arccosintegratee.png)
arccos(x) integral | What is integrate of arccosx or cos^-1x? ~ Mathematics - Graph Drawing - Derivative - Integral
![aplicamos la fórmula de integración por partes para calcular la integral de arccos(x) obteniendo x·arcc… | Educacion matematicas, Matematicas avanzadas, Matematicas aplicamos la fórmula de integración por partes para calcular la integral de arccos(x) obteniendo x·arcc… | Educacion matematicas, Matematicas avanzadas, Matematicas](https://i.pinimg.com/originals/38/73/d1/3873d1a090cc73ff2ff49c3c1abe5452.png)
aplicamos la fórmula de integración por partes para calcular la integral de arccos(x) obteniendo x·arcc… | Educacion matematicas, Matematicas avanzadas, Matematicas
![mixture: integral of { [ arcsin(sqrt(x)) - arccos(sqrt(x)) ] / [ arcsin(sqrt(x)) + arccos(sqrt(x))] } mixture: integral of { [ arcsin(sqrt(x)) - arccos(sqrt(x)) ] / [ arcsin(sqrt(x)) + arccos(sqrt(x))] }](https://4.bp.blogspot.com/-OCEj9DFF460/WIBn8pt8U8I/AAAAAAAABE4/NyfKHx9Ya6wPTTWTqr5yRGrnUhsLu_B7wCLcB/s1600/integration%2Bby%2Bparts%2B1.jpg)