Let the line y=mx and the ellipse 2x2+y2=1 intersect at point P in the first quadrant. If the normal to this ellipse at P meets the co-ordinate axes at (−13√2,0) and (0,β), then β is equal to:
A
2√3
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B
23
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C
2√23
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D
√23
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Solution
The correct option is D√23
Let P≡(x1,y1) Given equation of ellipse is 2x2+y2=1
Equation of normal at P(x1,y1) is x2x1−yy1=−12 It passes through (−13√2,0) ⇒x1=13√2 using ellipse equation y1=2√23 as P lies in first quadrant.
Since (0,β) lies on the normal of the ellipse at point P, hence we get 3β2√2=−12⇒β=√23