area of largest rectangle in ellipse, closest pt on parabola
- Thread starter des4ij
- Start date
Re: largest area in an ellipse...
Check this link:
http://www.freemathhelp.com/forum/viewt ... ht=ellipse
\(\displaystyle \L\\y=\pm\sqrt{-x}\)
\(\displaystyle \L\\L=\sqrt{(x-0)^{2}+(y+3)^{2}}\)
\(\displaystyle \L\\L=\sqrt{x^{2}+(-\sqrt{-x}+3)^{2}}\)
The distance and the square of the distance both have their max and mins at the same place, thus, eliminating the need for a radical.
\(\displaystyle \L\\S=L^{2}=x^{2}-6\sqrt{-x}-x+9\)
\(\displaystyle \L\\\frac{dS}{dx}=\frac{3}{\sqrt{-x}}+2x-1\)
Set \(\displaystyle \frac{dS}{dx}=0\), solve for x. Use that value to find your corresponding y value and, therefore, the needed point.
des4ij said:
Check this link:
http://www.freemathhelp.com/forum/viewt ... ht=ellipse
\(\displaystyle \L\\y=\pm\sqrt{-x}\)
\(\displaystyle \L\\L=\sqrt{(x-0)^{2}+(y+3)^{2}}\)
\(\displaystyle \L\\L=\sqrt{x^{2}+(-\sqrt{-x}+3)^{2}}\)
The distance and the square of the distance both have their max and mins at the same place, thus, eliminating the need for a radical.
\(\displaystyle \L\\S=L^{2}=x^{2}-6\sqrt{-x}-x+9\)
\(\displaystyle \L\\\frac{dS}{dx}=\frac{3}{\sqrt{-x}}+2x-1\)
Set \(\displaystyle \frac{dS}{dx}=0\), solve for x. Use that value to find your corresponding y value and, therefore, the needed point.