From a variable point P a pair of tangen...

From a variable point `P` a pair of tangent are drawn to the ellipse `x^2+4y^2=4`, the points of contact being `Q` and `R`. Let the sum of the ordinate of the points `Q` and `R` be unity. If the locus of the point `P` has the equation `x^2+y^2=ky` then find `k`

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From a variable point `P` a pair of tangent are drawn to the ellipse `x^2+4y^2=4`, the points of contact being `Q` and `R`. Let the sum of the ordinate of the points `Q` and `R` be unity. If the locus of the point `P` has the equation `x^2+y^2=ky` then find `k`

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