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Question

If the two lines x+(a1)y=1 and 2x+a2y=1, (aR{0,1}) are perpendicular, then the distance of their point of intersection from the origin is :

A
25
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B
25
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C
25
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D
25
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Solution

The correct option is C 25
x+(a1)y=12x+a2y=1
Since, the given lines are perpendicular.
1(a1)×2a2=1
a2(a1)=2
a3a2+2=0
(a1)(a22a+2)=0
or, a=1
Therefore, given equations can be represented as :
x2y+1=02x+y1=0
Point of intersection is (15,35)
Distance from origin=125+925=25

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