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Question

If 2xy+1=0 is a tangent to the hyperbola x2a2y216=1, then which of the following CANNOT be sides of a right angled triangle?

A
a, 4, 1
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B
a, 4, 2
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C
2a, 8, 1
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D
2a, 4, 1
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Solution

The correct option is C 2a, 8, 1
Hyperbola : x2a2y216=1
Tangent : 2xy+1=0
Tangent to a hyperbola,
y=mx±a2m2b2 =mx±a2m216
Comparing them : m=2 and
a2m216=±1
Squaring both sides,
4a216=1a=1722.1
From the options,
A) 161+174

B) 164+174

C) 641+17

D) 17=16+1

Hence sides given in option A, B, C will not form a right angle triangle.

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