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Question

In R3, consider the planes P1:y=0 and P2:x+z=1. Let P3 be a plane, different from P1 and P2, which passes through the intersection of P1 and P2. If the distance of the point (0,1,0) from P3 is 1 and the distance of a point (α,β,γ) from P3 is 2, then which of the following relations is/are true?

A
2α+β+2γ+2=0
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B
2αβ+2γ+4=0
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C
2α+β2γ10=0
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D
2αβ+2γ8=0
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Solution

The correct option is D 2αβ+2γ8=0
Equation of family of planes passing through P1 and P2 (plane P3) is given by: P2+λP1=0
x+λy+z1=0

The distance of the point (0,1,0) from P3 is 1.
|λ1|λ2+2=1
λ=12

Thus, the equation of the plane P3 is 2xy+2z2=0
Now, the distance of a point (α,β,γ) from P3 is 2.
|2αβ+2γ2|3=2
2αβ+2γ8=0 or 2αβ+2γ+4=0

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