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Analytical Geometry

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22 Nov 2009 20:13:22 IST

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If the eccentric angle of a point lying in the first quadrant on the ellipse x^2/a^2+y^2/b^2=1 be Q(

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If the eccentric angle of a point lying in the first quadrant on the ellipse x^2/a^2+y^2/b^2=1 be Q(theta) and the line joining the centre to that point makes angle O(phi) with the x-axis, then Q-O(theta-phi) will be maximum when Q(theta) is equal to.........

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Abhinav Sharma

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11 Feb 2012 19:48:23 IST

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I am looking for some help in this question as well

boywholived

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21 Mar 2012 19:10:05 IST

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Where did you get this question ?? it is tough. The problem is in theta-phi is maximum if the question is any trignometric ratio's theta - phi is maximum i could solve it . but not here anyway please tell me the details of where you get the question

boywholived

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21 Mar 2012 19:10:20 IST

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kartikAIR1

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21 Mar 2012 20:07:45 IST

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maximize it

you get;

tan² = a/b

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