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Question

Let π be the plane parallel to yaxis and containing the points (1,0,1) and (3,2,1). Also, A(4,0,0) and B(6,0,2) are two points and P(x0, y0, z0) is a variable point on the plane π. Then which of the following is/are CORRECT?

A
The equation of the plane π is x+z=2
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B
If (PA+PB) is minimum, then |4x0+y0+2z0| is 12
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C
If |PAPB|[0,N], then N is 8
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D
If the reflection of the line AB in the plane π is x21=yα0=z+β1, then (α4+β4) is 16
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Solution

The correct option is D If the reflection of the line AB in the plane π is x21=yα0=z+β1, then (α4+β4) is 16
Let the plane be αx+βz+1=0
It passes through (1,0,1) and (3,2,1)
α=12; β=12
Equation of plane π is x+z=2

Both A and B are on same side of π.
Reflection of A in plane π is given by
x41=y00=z01=2(4+02)12+12
So, coordinates of reflection point A is (2,0,2)
Equation of line AB: r=6i2^k+λ(4^i)
For P:6+4λ+02=2
λ=12
Coordinates of P are (4,0,2)
|4x0+y0+2z0|=12

Now, |PAPB|min=0
|PAPB|max will approach AB=4+0+4=8
|PAPB|[0,8]

Also, A will lie on x21=yα0=z+β1
221=0α0=2+β1
α=0, β=2
α4+β4=16

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