Let line L passes through the point of intersection of 2x+y−1=0 and x+2y−2=0. If L makes a triangle with the coordinate axes of area 58sq. units, then the equation of L can be
A
4x−5y+5=0
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B
4x+5y−5=0
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C
4x−5y−5=0
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D
4x+5y+5=0
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Solution
The correct options are A4x−5y+5=0 B4x+5y−5=0 The equation of L is 2x+y−1+λ(x+2y−2)=0 ⇒(2+λ)x+(1+2λ)y−1−2λ=0 Dividing by 1+2λ, we get x1+2λ2+λ+y1−1=0
x− intercept is 1+2λ2+λ y− intercept is 1
So, the area of triangle 58=∣∣∣12×1×1+2λ2+λ∣∣∣⇒∣∣∣1+2λ2+λ∣∣∣=54⇒1+2λ2+λ=±54
Therefore, the equation of L is x54+y−1=0⇒4x+5y−5=0