" Consider an ellipse "E:(x^2)/(16)+(y^2...

`" Consider an ellipse "E:(x^2)/(16)+(y^2)/(12)=1" and a parabola P whose "`,`" vertex is "(-sqrt(3),0)" and focus is the origin "`,`" If the parabola P divides the ellipse E into two "`, regions whose areas are `A_(1)` and `A_(2)` `(A_(1) lt A_(2))` then `(A_(1))/(A_(2))` equals

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`" Consider an ellipse "E:(x^2)/(16)+(y^2)/(12)=1" and a parabola P whose "`,`" vertex is "(-sqrt(3),0)" and focus is the origin "`,`" If the parabola P divides the ellipse E into two "`, regions whose areas are `A_(1)` and `A_(2)` `(A_(1) lt A_(2))` then `(A_(1))/(A_(2))` equals

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