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Area of an ellipse

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楼主
发表于 2005-4-30 00:17:16 | 只看该作者 回帖奖励 |倒序浏览 |阅读模式

Find the area of the smallest ellipse that passes (1,0), (1,1), (-1,0) and (-1,1).
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沙发
发表于 2005-4-30 01:25:09 | 只看该作者

回复:Area of an ellipse


pi ?
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板凳
 楼主| 发表于 2005-4-30 07:50:16 | 只看该作者

Sorry, I don't know. Pls show it.


  Sorry, I don't know. Pls show it.




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地板
 楼主| 发表于 2005-5-1 00:54:40 | 只看该作者

right. Could you try another?


I verified it and it is pi.  There is a similar question which asking to find the area of min ellipse to enclose 2 circles with r=.5 and centers at (.5,0) and (-.5,0).   I'll try it when I have time.www.ddhw.com
 
Thank you very much for contributing so many questions and answers, and articles in this and other boards.
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5#
发表于 2005-5-1 07:56:03 | 只看该作者

回复:right. Could you try another?


Sorry, since I went to church for whole day, I did not have chance to show the calculation for your 1st problem.
Thanks for your encouragement!
 
The 2nd one:
 
Let the equation of the ellipse be
x^2/a^2+y^2/b^2=1
Consider the intersection between the ellipse and the circle
(x-0.5)^2 + y^2 =0.5^2 (i.e.  x^2 - x + y^2=0 )
Substituting  y^2=x-x^2 into the equation of the ellipse, we got
x^2/a^2+(x-x^2)/b^2=1.
Simplifying it, we have www.ddhw.com
(b^2-a^2)*x^2 +a^2*x-a^2*b^2=0
As the quadratic equation has a unique solution for x, we have
a^4-4(a^2-b^2)*a^2*b^2=0,
so, a^2=4b^4/(4b^2-1)
 
Since the area of the ellipse is ab(pi), we may just find the min value of a^2*b^2.
a^2*b^2=4b^6/(4b^2-1)
use derivative, we found
ab reaches the minimum when b=(3/8)^0.5, a=3/8^0.5
The min of the area is
3/8*sqrt3*pi
www.ddhw.com

 
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