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Captions

English

Construction diagram of the largest combination of circle and square with the same area inscribed in a square

Summary

DescriptionFS Q(CQ) dia.png	English: Construction diagram of the largest combination of circle and square with the same area inscribed in a square Deutsch: Konstruktionszeichnung der größten Kombination von Kreis und Quadrat gleicher Fläche, die in ein Quadrat eingeschrieben sind
Date	9 June 2024
Source	Own work
Author	Hans G. Oberlack

Elements

Base is the square of given side length $a_{0}$ with centroid at $S_{0}$
Inscribed are the largest possible circle and square with the same area.

General case

Segments in the general case

0) The side length of the base square: $a_{0}$
1) The radius of the inscribed circle: $r_{1}={\frac {\sqrt {2}}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\cdot a_{0}\quad \approx 0.287\cdot a_{0}\quad$ , see Calculation 1
2) The side length of the inscribed square: $a_{2}={\sqrt {\pi }}\cdot r_{1}={\frac {\sqrt {2\pi }}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\cdot a_{0}\quad \approx 0.509\cdot a_{0}\quad$ , see Calculation 1

Perimeters in the general case

0) Perimeter of base square $P_{0}=4\cdot a_{0}\quad$
1) Perimeter of the inscribed circle: $P_{1}=2\pi \cdot r_{1}={\frac {2\pi {\sqrt {2}}}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\cdot a_{0}\quad \approx 1.806\cdot a_{0}\quad$
2) Perimeter of the inscribed square: $P_{2}=4\cdot a_{2}={\frac {4{\sqrt {2\pi }}}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\cdot a_{0}\quad \approx 2.038\cdot a_{0}\quad$

Areas in the general case

0) Area of the base square $A_{0}=a_{0}^{2}$
1) Area of the inscribed circle: $A_{1}=\pi r_{1}^{2}=\pi \left({\frac {\sqrt {2}}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)^{2}\cdot a_{0}^{2}\quad \approx 0.259\cdot a_{0}^{2}\quad$
2) Area of the inscribed square: $A_{2}=a_{2}^{2}=\left({\frac {\sqrt {2\pi }}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)^{2}\cdot a_{0}^{2}\quad \approx 0.259\cdot a_{0}^{2}\quad$

Centroids in the general case

Centroids as graphically displayed

0) Centroid position of the base square: $S_{0}=0+0i=0$
1) Centroid position of the inscribed circle: $S_{1}={\frac {1}{2}}\cdot \left({\frac {{\sqrt {2\pi }}-{\sqrt {2}}+1}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot (1+i)\cdot a_{0}\quad \approx (0.213+0.213i)\cdot a_{0}\quad$ , see Calculation 4
2) Centroid position of the inscribed square: $S_{2}={\frac {1}{2}}\cdot \left(-{\frac {{\sqrt {2}}+1}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot (1+i)\cdot a_{0}\quad \approx (-0.245-0.245i)\cdot a_{0}\quad$ , see calculation 5

Orientated centroids

The centroid positions of the following shapes will be expressed orientated so that the first shape n with $S_{n}\neq S_{0}$ will be of type $S_{n}=0-ki$ with $k>0$ . The graphical representation does not correspond to the mathematical expression.
0) Orientated centroid position of the base square: $S_{0}=0+0i=0$
1) Orientated centroid position of the inscribed circle: $S_{1}=\left(0-{\frac {{\sqrt {2\pi }}-{\sqrt {2}}+1}{2{\sqrt {\pi }}+2+{\sqrt {2}}}}\cdot i\right)\cdot a_{0}\quad \approx (0-0.3i)\cdot a_{0}\quad$ , see calculation 2
2) Orientated centroid position of the inscribed square: $S_{2}=\left(0+{\frac {{\sqrt {2}}+1}{2{\sqrt {\pi }}+2+{\sqrt {2}}}}\cdot i\right)\cdot a_{0}\quad \approx (0+0.347i)\cdot a_{0}\quad$ , see calculation 3

Normalised case

In the normalised case the area of the base is set to 1.
$A_{0}=1\quad \Rightarrow a_{0}^{2}=1\quad \Rightarrow a_{0}^{2}=1$

Segments in the normalised case

0) Side length of the base square: $a_{0}=1$
1) The radius of the inscribed circle: $r_{1}={\frac {\sqrt {2}}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\quad \approx 0.287\quad$
2) The side length of the inscribed square: $a_{2}={\frac {\sqrt {2\pi }}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\quad \approx 0.509\quad$

Perimeters in the normalised case

0) Perimeter of base square: $P_{0}=4\cdot a_{0}=4$
1) Perimeter of the inscribed circle: $P_{1}=2\pi \cdot r_{1}={\frac {2\pi {\sqrt {2}}}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\quad \approx 1.806\quad$
2) Perimeter of the inscribed square: $P_{2}=4\cdot a_{2}={\frac {4{\sqrt {2\pi }}}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\quad \approx 2.038\quad$

Areas in the normalised case

0) Area of the base square: $A_{0}=1$
1) Area of the inscribed circle: $A_{1}=\pi r_{1}^{2}=\pi \left({\frac {\sqrt {2}}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)^{2}\quad \approx 0.259\quad$
2) Area of the inscribed square: $A_{2}=a_{2}^{2}=\left({\frac {\sqrt {2\pi }}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)^{2}\quad \approx 0.259\quad$

Covered surface of the base shape

$C_{b}={\frac {A_{1}+A_{2}}{A_{0}}}\approx 0.519\quad \approx 52\%$

Centroids in the normalised case

Normalized centroids as graphically displayed

0) Centroid position of the base square: $S_{0}=0+0i=0$
1) Centroid position of the inscribed circle: $S_{1}={\frac {1}{2}}\cdot \left({\frac {{\sqrt {2\pi }}-{\sqrt {2}}+1}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot (1+i)\quad \approx (0.213+0.213i)\quad$
2) Centroid position of the inscribed square: $S_{2}={\frac {1}{2}}\cdot \left(-{\frac {{\sqrt {2}}+1}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot (1+i)\quad \approx (-0.245-0.245i)\quad$

Normalized centroids orientated

The centroid positions of the following shapes will be expressed orientated so that the first shape n with $S_{n}\neq S_{0}$ will be of type $S_{n}=0-ki$ with $k>0$ . The graphical representation does not correspond to the mathematical expression.
0) Orientated centroid position of the base square: $S_{0}=0+0i=0$
1) Orientated centroid position of the inscribed circle: $S_{1}=\left(0-{\frac {{\sqrt {2\pi }}-{\sqrt {2}}+1}{2{\sqrt {\pi }}+2+{\sqrt {2}}}}\cdot i\right)\quad \approx (0-0.3i)\quad$
2) Orientated centroid position of the inscribed square: $S_{2}=\left(0+{\frac {{\sqrt {2}}+1}{2{\sqrt {\pi }}+2+{\sqrt {2}}}}\cdot i\right)\quad \approx (0+0.347i)\quad$

Calculations

Equations of given elements and relations

(0) The area of square $\square AKEH$ has to be the same as the area of the circle with radius $r_{1}$ around center point $S_{1}\quad \Rightarrow A_{1}=A_{2}$
(1) $|AB|=|BC|=|CD|=|AD|=a_{0}\quad$ since $\square ABCD$ is a square
(2) $|AC|={\sqrt {2}}\cdot a_{0}\quad$ since ${\overline {AC}}$ is the diagonal of square $\square ABCD$
(3) $|AK|=|EK|=|EH|=|AH|=a_{2}\quad$ since $\square AKEH$ is a square
(4) $|S_{1}F|=|FC|=|CG|=|GS_{1}|=r_{1}\quad$ since $\square S_{1}FCG$ is a square, because $F$ and $G$ are tangent points of the circle around $S_{1}$ with the sides of square $\square ABCD$

Calculation 1

The radius $r_{1}$ is calculated:

a) First the relation between $r_{1}$ and $a_{2}$ is determined from equation (0):
$A_{1}=A_{2}\quad$ applying equation (0)
$\quad \Leftrightarrow a_{2}^{2}=\pi \cdot r_{1}^{2}\quad$ , definitions of areas of squares and circles
$\quad \Leftrightarrow a_{2}={\sqrt {\pi }}\cdot r_{1}\quad$ , since negative length cannot be applied

b) Then the relation between $r_{1}$ and $a_{0}$ is determined from the following identity:
$|AC|={\sqrt {2}}\cdot a_{0}\quad$ since $\square ABCD$ is a square
$\quad \Leftrightarrow |AE|+|ES_{1}|+|S_{1}C|={\sqrt {2}}\cdot a_{0}\quad$ , because the three segments are forming the diagonal of the square
$\quad \Leftrightarrow {\sqrt {2}}\cdot a_{2}+|ES_{1}|+|S_{1}C|={\sqrt {2}}\cdot a_{0}\quad$ , since $\square AKEH$ is a square
$\quad \Leftrightarrow {\sqrt {2}}({\sqrt {\pi }}\cdot r_{1})+|ES_{1}|+|S_{1}C|={\sqrt {2}}\cdot a_{0}\quad$ , applying part a) of the calculation
$\quad \Leftrightarrow {\sqrt {2}}{\sqrt {\pi }}\cdot r_{1}+r_{1}+|S_{1}C|={\sqrt {2}}\cdot a_{0}\quad$ , because E is a tangent point on the circle and a vertex of the square $\square AKEH$
$\quad \Leftrightarrow {\sqrt {2\pi }}\cdot r_{1}+r_{1}+{\sqrt {2}}\cdot r_{1}={\sqrt {2}}\cdot a_{0}\quad$ , because $\square S_{1}FCG$ is a square with side length $r_{1}$
$\quad \Leftrightarrow r_{1}\cdot ({\sqrt {2\pi }}+1+{\sqrt {2}})={\sqrt {2}}\cdot a_{0}\quad$ , extracting $r_{1}$ out of the bracket
$\quad \Leftrightarrow r_{1}={\frac {\sqrt {2}}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\cdot a_{0}\quad \approx 0.287\cdot a_{0}$ , rearranging

c) Eventually the relation between $a_{2}$ and $a_{0}$ is determined by using part a) of the calculation:
$a_{2}={\sqrt {\pi }}\cdot r_{1}\quad$ , from part a) of the calculation
$\quad \Leftrightarrow a_{2}={\sqrt {\pi }}\cdot {\frac {\sqrt {2}}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\cdot a_{0}$ , using the result from part b) of the calculation
$\quad \Leftrightarrow a_{2}={\frac {\sqrt {2\pi }}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\cdot a_{0}\quad \approx 0.509\cdot a_{0}$ , rearranging

Calculation 2

The centroid of the inscribed circle is calculated in orientated expression:
$S_{1}=S_{0}+{\overrightarrow {S_{0}C}}+{\overleftarrow {CS_{1}}}$
$\quad \Leftrightarrow S_{1}=(0+0i)+{\overrightarrow {S_{0}C}}+{\overleftarrow {CS_{1}}}$ , applying definition of $S_{0}$
$\quad \Leftrightarrow S_{1}=(0+0i)+(0-|S_{0}C|i)+{\overleftarrow {CS_{1}}}$ , applying the orientation principle
$\quad \Leftrightarrow S_{1}=(0-|S_{0}C|i)+{\overleftarrow {CS_{1}}}$ , rearranging
$\quad \Leftrightarrow S_{1}=(0-|S_{0}C|i)+(0+|CS_{1}|i)$ , since ${\overline {S_{0}C}}$ and ${\overline {CS_{1}}}$ are collinear
$\quad \Leftrightarrow S_{1}=(0-{\frac {{\sqrt {2}}\cdot a_{0}}{2}}\cdot i)+(0+|CS_{1}|i)\quad$ , since ${\overline {S_{0}C}}$ is half the diagonal of square $\square {ABCD}$
$\quad \Leftrightarrow S_{1}=(0-{\frac {{\sqrt {2}}\cdot a_{0}}{2}}\cdot i)+(0+{\sqrt {2}}\cdot r_{1}\cdot i)\quad$ , since ${\overline {CS_{1}}}$ is the diagonal of square $\square {S_{1}FCG}$ with side length $r_{1}$
$\quad \Leftrightarrow S_{1}=0-\left({\frac {{\sqrt {2}}\cdot a_{0}}{2}}-{\sqrt {2}}\cdot r_{1}\right)\cdot i\quad$ , rearranging
$\quad \Leftrightarrow S_{1}=0-{\sqrt {2}}\cdot \left({\frac {a_{0}}{2}}-r_{1}\right)\cdot i\quad$ , rearranging
$\quad \Leftrightarrow S_{1}=0-{\sqrt {2}}\cdot \left({\frac {a_{0}}{2}}-{\frac {\sqrt {2}}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\cdot a_{0}\right)\cdot i\quad$ , applying result from Calculation 1
$\quad \Leftrightarrow S_{1}=0-{\sqrt {2}}\cdot \left({\frac {1}{2}}-{\frac {\sqrt {2}}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot i\cdot a_{0}\quad$ , extracting $a_{0}$
$\quad \Leftrightarrow S_{1}=0-{\sqrt {2}}\cdot \left({\frac {{\sqrt {2\pi }}+{\sqrt {2}}+1}{2\cdot ({\sqrt {2\pi }}+{\sqrt {2}}+1)}}-{\frac {2{\sqrt {2}}}{2\cdot ({\sqrt {2\pi }}+{\sqrt {2}}+1)}}\right)\cdot i\cdot a_{0}\quad$ , rearranging
$\quad \Leftrightarrow S_{1}=0-{\sqrt {2}}\cdot \left({\frac {{\sqrt {2\pi }}+{\sqrt {2}}+1-2{\sqrt {2}}}{2\cdot ({\sqrt {2\pi }}+{\sqrt {2}}+1)}}\right)\cdot i\cdot a_{0}\quad$ , rearranging
$\quad \Leftrightarrow S_{1}=0-{\sqrt {2}}\cdot \left({\frac {{\sqrt {2\pi }}-{\sqrt {2}}+1}{2\cdot ({\sqrt {2\pi }}+{\sqrt {2}}+1)}}\right)\cdot i\cdot a_{0}\quad$ , rearranging
$\quad \Leftrightarrow S_{1}=0-\left({\frac {{\sqrt {2\pi }}-{\sqrt {2}}+1}{{\sqrt {2}}\cdot ({\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot i\cdot a_{0}\quad$ , rearranging
$\quad \Leftrightarrow S_{1}=\left(0-{\frac {{\sqrt {2\pi }}-{\sqrt {2}}+1}{2{\sqrt {\pi }}+2+{\sqrt {2}}}}\cdot i\right)\cdot a_{0}\quad \approx (0-0.3i)\cdot a_{0}\quad$ , rearranging

Calculation 3

The centroid of the inscribed square is calculated in orientated expression:
$S_{2}=S_{0}+{\overrightarrow {S_{0}A}}+{\overrightarrow {AS_{2}}}$
$\quad \Leftrightarrow S_{2}=(0+0i)+{\overrightarrow {S_{0}A}}+{\overrightarrow {AS_{2}}}$ , applying definition of $S_{0}$
$\quad \Leftrightarrow S_{2}=(0+0i)+(0+|S_{0}A|i)+{\overrightarrow {AS_{2}}}$ , applying the orientation
$\quad \Leftrightarrow S_{2}=(0+|S_{0}A|i)+{\overrightarrow {AS_{2}}}$ , rearranging
$\quad \Leftrightarrow S_{2}=(0+|S_{0}A|i)+(0-|AS_{2}|i)$ , applying the orientation
$\quad \Leftrightarrow S_{2}=(0+{\frac {{\sqrt {2}}\cdot a_{0}}{2}}\cdot i)+(0-|AS_{2}|i)$ , since ${\overline {S_{0}A}}$ is half the diagonal of square $\square {ABCD}$ with side length $a_{0}$
$\quad \Leftrightarrow S_{2}=(0+{\frac {{\sqrt {2}}\cdot a_{0}}{2}}\cdot i)+(0-{\frac {{\sqrt {2}}\cdot a_{2}}{2}}\cdot i)$ , since ${\overline {AS_{2}}}$ is half the diagonal of square $\square {AKEH}$ with side length $a_{2}$
$\quad \Leftrightarrow S_{2}=(0+{\frac {{\sqrt {2}}\cdot a_{0}}{2}}\cdot i-{\frac {{\sqrt {2}}\cdot a_{2}}{2}}\cdot i)\quad$ , rearranging
$\quad \Leftrightarrow S_{2}=(0+{\frac {\sqrt {2}}{2}}\cdot i\cdot a_{0}-{\frac {\sqrt {2}}{2}}\cdot i\cdot a_{2})\quad$ , rearranging
$\quad \Leftrightarrow S_{2}=(0+{\frac {\sqrt {2}}{2}}\left(a_{0}-a_{2}\right)\cdot i)\quad$ , rearranging
$\quad \Leftrightarrow S_{2}=(0+{\frac {\sqrt {2}}{2}}\left(a_{0}-{\frac {\sqrt {2\pi }}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\cdot a_{0}\right)\cdot i)\quad$ , applying result from Calculation 1
$\quad \Leftrightarrow S_{2}=(0+{\frac {\sqrt {2}}{2}}\left(1-{\frac {\sqrt {2\pi }}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot i\cdot a_{0})\quad$ , rearranging
$\quad \Leftrightarrow S_{2}=(0+{\frac {\sqrt {2}}{2}}\left(1-{\frac {\sqrt {2\pi }}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot i)\cdot a_{0}\quad$ , rearranging
$\quad \Leftrightarrow S_{2}=(0+{\frac {\sqrt {2}}{2}}\left({\frac {{\sqrt {2\pi }}+{\sqrt {2}}+1}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}-{\frac {\sqrt {2\pi }}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot i)\cdot a_{0}\quad$ , extending the denominator
$\quad \Leftrightarrow S_{2}=(0+{\frac {\sqrt {2}}{2}}\left({\frac {{\sqrt {2\pi }}+{\sqrt {2}}+1-{\sqrt {2\pi }}}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot i)\cdot a_{0}\quad$ , rearranging
$\quad \Leftrightarrow S_{2}=(0+{\frac {\sqrt {2}}{2}}\left({\frac {{\sqrt {2}}+1}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot i)\cdot a_{0}\quad$ , rearranging
$\quad \Leftrightarrow S_{2}=(0+{\frac {1}{\sqrt {2}}}\left({\frac {{\sqrt {2}}+1}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot i)\cdot a_{0}\quad$ , since ${\frac {\sqrt {a}}{a}}={\frac {1}{\sqrt {a}}}$
$\quad \Leftrightarrow S_{2}=(0+{\frac {{\sqrt {2}}+1}{2{\sqrt {\pi }}+2+{\sqrt {2}}}}\cdot i)\cdot a_{0}\quad \approx (0+0.347i)\cdot a_{0}\quad$ , rearranging

Calculation 4

Calculating the centroids as displayed:
$S_{1}=S_{0}+{\overrightarrow {S_{0}S_{1}}}$
$\quad \Leftrightarrow S_{1}=(0+0i)+{\overrightarrow {S_{0}C}}+{\overrightarrow {CS_{1}}}$
$\quad \Leftrightarrow S_{1}=\left(|S_{0}C|\cdot {\frac {1}{\sqrt {2}}}\cdot (1+i)\right)+{\overrightarrow {CS_{1}}}\quad$ , since ${\overrightarrow {S_{0}C}}$ is collinear to the diagonal of the square
$\quad \Leftrightarrow S_{1}=\left({\frac {{\sqrt {2}}\cdot a_{0}}{2}}\cdot {\frac {1}{\sqrt {2}}}\cdot (1+i)\right)+{\overrightarrow {CS_{1}}}\quad$ , since ${\overrightarrow {S_{0}C}}$ is half the diagonal of the square
$\quad \Leftrightarrow S_{1}=\left({\frac {a_{0}}{2}}\cdot (1+i)\right)+{\overrightarrow {CS_{1}}}\quad$ , rearranging
$\quad \Leftrightarrow S_{1}=\left({\frac {a_{0}}{2}}\cdot (1+i)\right)-\left(|S_{1}C|\cdot {\frac {1}{\sqrt {2}}}\cdot (1+i)\right)\quad$ , rearranging
$\quad \Leftrightarrow S_{1}=\left({\frac {a_{0}}{2}}\cdot (1+i)\right)-\left({\sqrt {2}}\cdot r_{1}\cdot {\frac {1}{\sqrt {2}}}\cdot (1+i)\right)\quad$ , since ${\overrightarrow {S_{1}C}}$ is the diagonal of the square $\square {S_{1}FCG}$ with side length $r_{1}$
$\quad \Leftrightarrow S_{1}=\left({\frac {a_{0}}{2}}\cdot (1+i)\right)-\left(r_{1}\cdot (1+i)\right)\quad$ , rearranging
$\quad \Leftrightarrow S_{1}=\left({\frac {a_{0}}{2}}-r_{1}\right)\cdot (1+i)\quad$ , rearranging
$\quad \Leftrightarrow S_{1}=\left({\frac {a_{0}}{2}}-{\frac {\sqrt {2}}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\cdot a_{0}\right)\cdot (1+i)\quad$ , applying Calculation 2
$\quad \Leftrightarrow S_{1}=\left({\frac {1}{2}}-{\frac {\sqrt {2}}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot (1+i)\cdot a_{0}\quad$ , rearranging
$\quad \Leftrightarrow S_{1}={\frac {1}{2}}\cdot \left(1-{\frac {2{\sqrt {2}}}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot (1+i)\cdot a_{0}\quad$ , rearranging
$\quad \Leftrightarrow S_{1}={\frac {1}{2}}\cdot \left({\frac {{\sqrt {2\pi }}+{\sqrt {2}}+1-2{\sqrt {2}}}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot (1+i)\cdot a_{0}\quad$ , rearranging
$\quad \Leftrightarrow S_{1}={\frac {1}{2}}\cdot \left({\frac {{\sqrt {2\pi }}-{\sqrt {2}}+1}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot (1+i)\cdot a_{0}\quad \approx (0.213+0.213i)\cdot a_{0}\quad$ , rearranging

Calculation 5

Calculating the centroids as displayed:
$S_{2}=S_{0}+{\overrightarrow {S_{0}S_{2}}}$
$\quad \Leftrightarrow S_{2}=(0+0i)+{\overrightarrow {S_{0}A}}+{\overrightarrow {AS_{2}}}$
$\quad \Leftrightarrow S_{2}=(0+0i)-{\overrightarrow {AS_{0}}}+{\overrightarrow {AS_{2}}}$
$\quad \Leftrightarrow S_{2}=\left(-|S_{0}A|\cdot {\frac {1}{\sqrt {2}}}\cdot (1+i)\right)+{\overrightarrow {AS_{2}}}\quad$ , since ${\overrightarrow {S_{0}A}}$ is collinear to the diagonal of the square $\square {ABCD}$
$\quad \Leftrightarrow S_{2}=\left(-{\frac {{\sqrt {2}}\cdot a_{0}}{2}}\cdot {\frac {1}{\sqrt {2}}}\cdot (1+i)\right)+{\overrightarrow {AS_{2}}}\quad$ , since ${\overrightarrow {S_{0}A}}$ is half the diagonal of the square $\square {ABCD}$
$\quad \Leftrightarrow S_{2}=\left(-{\frac {a_{0}}{2}}\cdot (1+i)\right)+{\overrightarrow {AS_{2}}}\quad$ , rearranging
$\quad \Leftrightarrow S_{2}=\left(-{\frac {a_{0}}{2}}\cdot (1+i)\right)+\left(|AS_{2}|\cdot {\frac {1}{\sqrt {2}}}\cdot (1+i)\right)\quad$ , since ${\overrightarrow {AS_{2}}}$ is collinear to the diagonal of the square $\square {AKEH}$
$\quad \Leftrightarrow S_{2}=\left(-{\frac {a_{0}}{2}}\cdot (1+i)\right)+\left({\frac {{\sqrt {2}}\cdot a_{2}}{2}}\cdot {\frac {1}{\sqrt {2}}}\cdot (1+i)\right)\quad$ , since ${\overrightarrow {AS_{2}}}$ is half the diagonal of the square $\square {AKEH}$
$\quad \Leftrightarrow S_{2}=\left(-{\frac {a_{0}}{2}}\cdot (1+i)\right)+\left({\frac {a_{2}}{2}}\cdot (1+i)\right)\quad$ , rearranging
$\quad \Leftrightarrow S_{2}={\frac {1}{2}}\cdot (a_{2}-a_{0})\cdot (1+i)\quad$ , rearranging
$\quad \Leftrightarrow S_{2}={\frac {1}{2}}\cdot \left({\frac {\sqrt {2\pi }}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\cdot a_{0}-a_{0}\right)\cdot (1+i)\quad$ , applying calculation 1c
$\quad \Leftrightarrow S_{2}={\frac {1}{2}}\cdot \left({\frac {\sqrt {2\pi }}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}-1\right)\cdot (1+i)\cdot a_{0}\quad$ , rearranging
$\quad \Leftrightarrow S_{2}={\frac {1}{2}}\cdot \left({\frac {{\sqrt {2\pi }}-({\sqrt {2\pi }}+{\sqrt {2}}+1)}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot (1+i)\cdot a_{0}\quad$ , rearranging
$\quad \Leftrightarrow S_{2}={\frac {1}{2}}\cdot \left({\frac {{\sqrt {2\pi }}-{\sqrt {2\pi }}-{\sqrt {2}}-1}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot (1+i)\cdot a_{0}\quad$ , rearranging
$\quad \Leftrightarrow S_{2}={\frac {1}{2}}\cdot \left({\frac {-{\sqrt {2}}-1}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot (1+i)\cdot a_{0}\quad$ , rearranging
$\quad \Leftrightarrow S_{2}={\frac {1}{2}}\cdot \left(-{\frac {{\sqrt {2}}+1}{{\sqrt {2\pi }}+{\sqrt {2}}+1}}\right)\cdot (1+i)\cdot a_{0}\quad \approx (-0.245-0.245i)\cdot a_{0}\quad$ , rearranging

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File:FS Q(CQ) dia.png

Captions

Captions

Summary

Elements

General case

Segments in the general case

Perimeters in the general case

Areas in the general case

Centroids in the general case

Centroids as graphically displayed

Orientated centroids

Normalised case

Segments in the normalised case

Perimeters in the normalised case

Areas in the normalised case

Covered surface of the base shape

Centroids in the normalised case

Normalized centroids as graphically displayed

Normalized centroids orientated

Calculations

Equations of given elements and relations

Calculation 1

Calculation 2

Calculation 3

Calculation 4

Calculation 5

Licensing

File history

File usage on Commons

Metadata

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