What is the area of the largest Kepler Triangle that can be inscribed in the circle whose equation is x^2 + y^2 = 9 ????
{A Kepler Triangle is a right triangle whose sides are in the ratio of 1 : √Phi : Phi....where Phi = [1 + √5] / 2 }
What is the area of the largest Kepler Triangle that can be inscribed in the circle whose equation is x^2 + y^2 = 9 ????
{A Kepler Triangle is a right triangle whose sides are in the ratio of 1 : √Phi : Phi....where Phi = [1 + √5] / 2 }
$$\boxed{a:b:c = 1:\sqrt{\varphi}:\varphi}$$
$$r_{circle} = \sqrt{9} = 3\qquad c = 2\cdot r_{circle} \\\\
\small{\text{$
\begin{array}{rcl}
\sqrt{ \varphi } & \cdot & \dfrac{ \varphi }{ \sqrt{ \varphi } } = \varphi \\\\
b & \cdot & \dfrac { \varphi } { \sqrt{ \varphi } } = c \\\\
\textcolor[rgb]{1,0,0}{b} &\textcolor[rgb]{1,0,0}{=}& \textcolor[rgb]{1,0,0}{c \cdot \dfrac{ \sqrt{ \varphi } } { \varphi }}\\\\
\hline
&\\
\end{array}
$}}\\\\\\
\small{\text{$
\begin{array}{rcl}
1 & \cdot & \dfrac{ \varphi }{ 1 } = \varphi \\\\
a & \cdot & \dfrac{ \varphi }{ 1 } = c \\\\
\textcolor[rgb]{1,0,0}{a} &\textcolor[rgb]{1,0,0}{=}& \textcolor[rgb]{1,0,0}{\dfrac{ c } { \varphi } }\\\\
\hline
&\\
\end{array}
$}}\\\\$$
$$\small{\text{$
\begin{array}{rcl}
A &=& \dfrac{a\cdot b}{2} \\\\
A &=& \dfrac{\dfrac{ c } { \varphi }\cdot c \cdot \dfrac{ \sqrt{ \varphi } } { \varphi } }{2} \\\\
A&=& \dfrac{c^2}{\varphi^2} \cdot \dfrac{ \sqrt{ \varphi } } { 2}\\\\
A &=& 2\cdot r^2 \cdot \dfrac{ \sqrt{ \varphi } } { \varphi^2 } \\\\
A &=& 18 \cdot \dfrac{ \sqrt{ \varphi } } { \varphi^2 } \\\\
A &=& 8.74562889162 \\\\
\end{array}
$}}$$
(I realize that golden rectangle and kepler triangle are different,Thank you CPhill!)
What is the area of the largest Kepler Triangle that can be inscribed in the circle whose equation is x^2 + y^2 = 9 ????
{A Kepler Triangle is a right triangle whose sides are in the ratio of 1 : √Phi : Phi....where Phi = [1 + √5] / 2 }
$$\boxed{a:b:c = 1:\sqrt{\varphi}:\varphi}$$
$$r_{circle} = \sqrt{9} = 3\qquad c = 2\cdot r_{circle} \\\\
\small{\text{$
\begin{array}{rcl}
\sqrt{ \varphi } & \cdot & \dfrac{ \varphi }{ \sqrt{ \varphi } } = \varphi \\\\
b & \cdot & \dfrac { \varphi } { \sqrt{ \varphi } } = c \\\\
\textcolor[rgb]{1,0,0}{b} &\textcolor[rgb]{1,0,0}{=}& \textcolor[rgb]{1,0,0}{c \cdot \dfrac{ \sqrt{ \varphi } } { \varphi }}\\\\
\hline
&\\
\end{array}
$}}\\\\\\
\small{\text{$
\begin{array}{rcl}
1 & \cdot & \dfrac{ \varphi }{ 1 } = \varphi \\\\
a & \cdot & \dfrac{ \varphi }{ 1 } = c \\\\
\textcolor[rgb]{1,0,0}{a} &\textcolor[rgb]{1,0,0}{=}& \textcolor[rgb]{1,0,0}{\dfrac{ c } { \varphi } }\\\\
\hline
&\\
\end{array}
$}}\\\\$$
$$\small{\text{$
\begin{array}{rcl}
A &=& \dfrac{a\cdot b}{2} \\\\
A &=& \dfrac{\dfrac{ c } { \varphi }\cdot c \cdot \dfrac{ \sqrt{ \varphi } } { \varphi } }{2} \\\\
A&=& \dfrac{c^2}{\varphi^2} \cdot \dfrac{ \sqrt{ \varphi } } { 2}\\\\
A &=& 2\cdot r^2 \cdot \dfrac{ \sqrt{ \varphi } } { \varphi^2 } \\\\
A &=& 18 \cdot \dfrac{ \sqrt{ \varphi } } { \varphi^2 } \\\\
A &=& 8.74562889162 \\\\
\end{array}
$}}$$