so far I have got to
[MATH](x-x_o)^2 +(y-y_o)^2=r^2[/MATH][MATH](y-y_o)^2=r^2 - (x-x_o)^2[/MATH][MATH]y-y_o=\sqrt{r^2-(x-x_o)^2}[/MATH][MATH]y=\sqrt{r^2 -(x-x_o)^2}+y_o[/MATH][MATH]\int_{x_1}^{x_2} \left(\sqrt{r^2 -(x-x_o)^2}+y_o\right)dx[/MATH]
but I cannot figure out how to solve for the anti derivative
[ wolfram misinterprets Mathjax, don’t know how to type it in a way it can understand, and symbolab spits out a monster ]
[MATH](x-x_o)^2 +(y-y_o)^2=r^2[/MATH][MATH](y-y_o)^2=r^2 - (x-x_o)^2[/MATH][MATH]y-y_o=\sqrt{r^2-(x-x_o)^2}[/MATH][MATH]y=\sqrt{r^2 -(x-x_o)^2}+y_o[/MATH][MATH]\int_{x_1}^{x_2} \left(\sqrt{r^2 -(x-x_o)^2}+y_o\right)dx[/MATH]
but I cannot figure out how to solve for the anti derivative
[ wolfram misinterprets Mathjax, don’t know how to type it in a way it can understand, and symbolab spits out a monster ]