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Question

Find the equation of the tangents drawn form the point (5,3) to the hyperbola x225y29=1.


A

3x25xy15x+25y=0

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B

3x25xy+10x+15y=0

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C

2x25xy10x+15y=0

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D

2x25xy15x+25y=0

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Solution

The correct option is A

3x25xy15x+25y=0


Given point is p(5,3)

Hyperbola S=x225y291=0

S1=x225y291=1<0

Point P(5,3) lies outside the hyperbola

Two tangents can be drawn from the point p(5,3) and

equation of pair of pair of tangents is SS1=T2

(x225y291)(1)=(5x252y91)2

x225+y29+1=x225+y29+12xy15+2y32x5

2x2252xy15+2y32x5=0

3x25xy+25y15x=0

Equation of pair of tangents

3x25xy15x+25y=0


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