User:Hans G. Oberlack/FS CVC2

Shows the second largest circle within a forced sudoku of CV-type.

Base is the circle of given radius ${\displaystyle r_{0}}$ around point ${\displaystyle D}$ and the resulting quarter circle ${\displaystyle [ABC]}$ of radius ${\displaystyle r_{1}}$ around point ${\displaystyle A}$

Inscribed is the largest possible circle in the shape ${\displaystyle [CBG]}$ having radius ${\displaystyle r_{2}}$ around point ${\displaystyle F}$. This is the second largest circle in a CV type sangaku.

In order to find radius ${\displaystyle r_{2}}$ of the circle, the following reasoning is used:
The line segment ${\displaystyle [AG]}$ is the diameter of the circle around ${\displaystyle D}$ with radius ${\displaystyle r_{0}}$. The line segment ${\displaystyle [AE]}$ is radius ${\displaystyle r_{1}}$ of the quarter circle around ${\displaystyle A}$. The line segment ${\displaystyle [EG]}$ is the diameter of the circle around ${\displaystyle F}$ with radius ${\displaystyle r_{2}}$.

${\displaystyle |AG|=|AE|+|EG|=2\cdot r_{0}}$
${\displaystyle \Rightarrow r_{1}+2\cdot r_{2}=2\cdot r_{0}}$
${\displaystyle \Leftrightarrow 2\cdot r_{2}=2\cdot r_{0}-r_{1}}$

From the construction of the quarter circle (see FS_CV) we know that ${\displaystyle r_{1}={\sqrt {2}}\cdot r_{0}}$. So:
${\displaystyle \quad 2\cdot r_{2}=2\cdot r_{0}-{\sqrt {2}}\cdot r_{0}}$
${\displaystyle \Leftrightarrow 2\cdot r_{2}=(2-{\sqrt {2}})\cdot r_{0}}$
${\displaystyle \Leftrightarrow r_{2}={\frac {2-{\sqrt {2}}}{2}}\cdot r_{0}}$

0) The radius of the base circle ${\displaystyle =r_{0}}$
1) Radius of the quarter circle ${\displaystyle r_{1}={\sqrt {2}}\cdot r_{0}}$
2) Radius of the additional circle ${\displaystyle r_{2}={\frac {2-{\sqrt {2}}}{2}}\cdot r_{0}}$

0) Perimeter of base circle ${\displaystyle P_{0}=2\cdot \pi \cdot r_{0}}$
1) Perimeter of the quarter circle ${\displaystyle P_{1}={\frac {4+\pi }{\sqrt {2}}}\cdot r_{0}}$
2) Perimeter of additional circle ${\displaystyle P_{2}=2\cdot \pi \cdot r_{2}=2\cdot \pi \cdot {\frac {2-{\sqrt {2}}}{2}}\cdot r_{0}=(2-{\sqrt {2}})\cdot \pi \cdot r_{0}=(1-{\frac {1}{\sqrt {2}}})\cdot 2\cdot \pi \cdot r_{0}}$
${\displaystyle \quad \Leftrightarrow P_{2}=(1-{\frac {1}{\sqrt {2}}})\cdot P_{0}}$

0) Area of the base circle ${\displaystyle A_{0}=\pi \cdot r_{0}^{2}}$
1) Area of the inscribed quarter circle ${\displaystyle A_{1}={\frac {1}{2}}\cdot A_{0}}$
2) Area of the additional circle
${\displaystyle \quad A_{2}=\pi \cdot r_{2}^{2}=\pi \cdot ((1-{\frac {1}{\sqrt {2}}})\cdot r_{0})^{2}=(1-{\frac {1}{\sqrt {2}}})^{2}\cdot \pi \cdot r_{0}^{2}=({\frac {\sqrt {2}}{\sqrt {2}}}-{\frac {1}{\sqrt {2}}})^{2}\cdot \pi \cdot r_{0}^{2}=({\frac {{\sqrt {2}}-1}{\sqrt {2}}})^{2}\cdot \pi \cdot r_{0}^{2}={\frac {({\sqrt {2}}-1)^{2}}{2}}\cdot \pi \cdot r_{0}^{2}}$
${\displaystyle \quad \Leftrightarrow A_{2}={\frac {2-2\cdot {\sqrt {2}}+1}{2}}\cdot \pi \cdot r_{0}^{2}={\frac {3-2\cdot {\sqrt {2}}}{2}}\cdot \pi \cdot r_{0}^{2}=({\frac {3}{2}}-{\sqrt {2}})\cdot \pi \cdot r_{0}^{2}}$
${\displaystyle \quad \Leftrightarrow A_{2}=({\frac {3}{2}}-{\sqrt {2}})\cdot A_{0}}$

Centroid positions are measured from the lower left point of the surrounding square.
0) Centroid positions of the base square: ${\displaystyle x_{0}=r_{0}\quad y_{0}=r_{0}}$
1) Centroid positions of the inscribed quarter circle:
${\displaystyle \quad x_{1}=({\frac {\sqrt {32}}{3\cdot \pi }}+{\frac {{\sqrt {2}}-1}{\sqrt {2}}})\cdot r_{0}}$
${\displaystyle \quad y_{1}=x_{1}}$

2) Centroids of the additional circle:
${\displaystyle \quad x_{2}=|AF|\cdot cos(45)=(|AG|-|FG|)\cdot cos(45)=(2\cdot r_{0}-r_{2})\cdot cos(45)=(2\cdot r_{0}-{\frac {2-{\sqrt {2}}}{2}}\cdot r_{0})\cdot cos(45)}$
${\displaystyle \quad \Leftrightarrow x_{2}=(2\cdot -{\frac {2-{\sqrt {2}}}{2}})\cdot r_{0}\cdot cos(45)=({\frac {4-2+{\sqrt {2}}}{2}})\cdot r_{0}\cdot cos(45)=({\frac {2+{\sqrt {2}}}{2}})\cdot r_{0}\cdot cos(45)}$
${\displaystyle \quad \Leftrightarrow x_{2}=({\frac {2+{\sqrt {2}}}{2}})\cdot r_{0}\cdot {\frac {1}{\sqrt {2}}}=\left({\frac {{\sqrt {2}}+1}{2}}\right)\cdot r_{0}\cdot {\frac {\sqrt {2}}{\sqrt {2}}}={\frac {{\sqrt {2}}+1}{2}}\cdot r_{0}\cdot }$
${\displaystyle \quad y_{2}=x_{2}}$

In the normalised case the area of the base is set to 1.
${\displaystyle A_{0}=1\quad \Rightarrow r_{0}={\frac {1}{\sqrt {\pi }}}}$

0) Radius of the base circle ${\displaystyle r_{0}={\frac {1}{\sqrt {\pi }}}=0.56...}$
1) Radius of the inscribed quarter circle ${\displaystyle r_{1}={\sqrt {\frac {2}{\pi }}}=0.79...}$
2) Radius of the additional circle
${\displaystyle \quad r_{2}={\frac {2-{\sqrt {2}}}{2}}\cdot r_{0}={\frac {2-{\sqrt {2}}}{2}}\cdot {\frac {1}{\sqrt {\pi }}}={\frac {2-{\sqrt {2}}}{2\cdot {\sqrt {\pi }}}}=0.165...}$

0) Perimeter of base square ${\displaystyle P_{0}=2\cdot {\sqrt {\pi }}=3.5449077...}$
1) Perimeter of the inscribed quarter circle ${\displaystyle P_{1}={\frac {4+\pi }{\sqrt {2\cdot \pi }}}=2.8490832...}$
2) Perimeter of additional circle ${\displaystyle P_{2}=(1-{\frac {1}{\sqrt {2}}})\cdot 2\cdot {\sqrt {\pi }}=1.0382794...}$
S) Sum of perimeters ${\displaystyle P_{s}=P_{0}+P_{1}+P_{2}=7.4322703...}$

0) Area of the base square ${\displaystyle A_{0}=1}$
1) Area of the inscribed quarter circle ${\displaystyle A_{1}=0.5}$
2) Area of the additional circle ${\displaystyle A_{2}=({\frac {3}{2}}-{\sqrt {2}})\cdot A_{0}=({\frac {3}{2}}-{\sqrt {2}})=0.086...}$

Centroid positions are measured from the lower left point of the surrounding square.
0) Centroid positions of the base square: ${\displaystyle x_{0}=r_{0}=0.5641895...\quad y_{0}=r_{0}=0.5641895...}$
1) Centroid positions of the inscribed quarter circle: ${\displaystyle x_{1}=0.503880...\quad y_{1}=x_{1}=0.503880...}$
2) Centroids of the additional circle:
${\displaystyle \quad x_{2}=\left({\frac {2+{\sqrt {2}}}{2\cdot {\sqrt {2}}}}\right)\cdot r_{0}=\left({\frac {2+{\sqrt {2}}}{2\cdot {\sqrt {2}}}}\right)\cdot {\frac {1}{\sqrt {\pi }}}=\left({\frac {2+{\sqrt {2}}}{2\cdot {\sqrt {2\pi }}}}\right)=0.68103707...}$
${\displaystyle \quad y_{2}=x_{2}=0.68103707...}$

The distance between the centroid of the base element and the centroid of the quarter circle is:
${\displaystyle d01={\sqrt {(x_{0}-x_{1})^{2}+(y_{0}-y_{1})^{2}}}=0.0852905...}$
${\displaystyle d02={\sqrt {(x_{0}-x_{2})^{2}+(y_{0}-y_{2})^{2}}}=0.1652473...}$
${\displaystyle d12={\sqrt {(x_{1}-x_{2})^{2}+(y_{1}-y_{2})^{2}}}=0.2505378...}$

The sum of the distances is ${\displaystyle D_{s}=0.5010757...}$

Apart of the base element there are two shapes allocated. Therefore the integer part of the identifying number is 2.
The decimal part of the identifying number is the decimal part of the sum of the perimeters and sum of the distances of the centroids in the normalised case.

${\displaystyle decimalpart(7.4322704...+0.5010758...)=decimalpart(7.9333462...)=.9333462}$

So the identifying number is: ${\displaystyle 2.9333462}$