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Title: Ellipse Area Triangle Post by Benoit_Mandelbrot on Feb 17th, 2004, 8:48am Find the equation of the line tangent to the ellipse: b2*x2 + a2*y2 = a2*b2 in the first quadrant that forms with the coordinate axes the triangle of smallest possible area (a & b are positive constants). |
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Title: Re: Ellipse Area Triangle Post by towr on Feb 17th, 2004, 10:06am interesting, I get a triangle area of ::[hide]a*b[/hide]:: And to answer the question, line ::[hide] y = b (sqrt(2) - x/a) [/hide]:: |
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Title: Re: Ellipse Area Triangle Post by John_Gaughan on Feb 17th, 2004, 11:51am Towr, how did you arrive at your answer? Given that this is the first quadrant, I was able to simplify to :: [hide] y == (b/a) sqrt (a2 - x2), where x and y are positive and a > x. I imagine I need to take the derivative of this equation to get the slope of the line, but I don't remember offhand how to do it in this case. I am at work, my books are at home.[/hide] :: |
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Title: Re: Ellipse Area Triangle Post by towr on Feb 17th, 2004, 12:06pm yep, that's how I started.. I have the luck of having my computer to do some of the 'hard' work, but you can just use the chain rule (I think that's what it's called) ::[hide]df(u)/dx = df(u)/du du/dx and of course in this case f(u) = (b/a) sqrt(u), and u = (a2 - x2) [/hide]:: |
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Title: Re: Ellipse Area Triangle Post by John_Gaughan on Feb 17th, 2004, 1:17pm I screwed something up I think... attached is the line I wound up with. It is in y=mx+b format. |
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Title: Re: Ellipse Area Triangle Post by towr on Feb 17th, 2004, 1:51pm ::[hide] starting at y = f(x) = (b/a) sqrt (a2 - x2), the tangent line to the ellips at a point on the upper arc has direction f'(x) = (b/a) * 1/2 / sqrt (a2 - x2) * (-2x) = -x (b/a) / sqrt (a2 - x2) the line we're looking for will cross through some point (x,y)min, where the triangle is minimized so we have y - ymin = f'(xmin)(x-xmin) y = f(xmin) + f'(xmin)(x-xmin ) y = b (a2 - xminx)/(a sqrt(a2 - xmin2)) from this line we'll need y when x=0, and x when y=0 (the points where the line crosses the axis) so y = ab/( sqrt(a2 - xmin2)) and 0 = b (a2 - xminx)/(a sqrt(a2 - xmin2)) => x = a2/xmin the size of the triangle (x*y/2) is minimized when we minimize x*y = a3b/(xminsqrt(a2 - xmin2)) To do this we'll finally determine xmin, so take the derivative and find where it is 0; eventually we get xmin = sqrt(2)a/2 (among other solutions which don't fit our needs) So filling this in in our description of the line, y = b (a2 - xminx)/(a sqrt(a2 - xmin2)) we get y = b(sqrt(2) a - x)/a [/hide]:: |
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