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Question

A sphere S which passes through origin and the image of it's center in the plane x+y+z=3 is (0,0,0). If a be the area of the cross section made by the plane then

A
a=9π
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B
a=4π
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C
S:(x2+y2+z2)4=(x+y+z)
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D
S:(x2+y2+z2)2=(x+y+z)
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Solution

The correct options are
A a=9π
C S:(x2+y2+z2)4=(x+y+z)
Let the center of the sphere be (x1,y1,z1)
Its image in the plane is (0,0,0)
Line perpendicular to the plane and passing through the centre and origin is,
x01=y01=z01=k
Any point on the line,
(k,k,k)
Midpoint of line joining the centre and origin lies on the plane,
x+y+z=33k=3k=1
Midpoint
(x12,y12,z12)=(1,1,1)(x1,y1,z1)=(2,2,2)
Center of the sphere is (2,2,2)
Radius =22+22+22=23

Equation of the sphere will be
S:(x2)2+(y2)2+(z2)2=12x2+y2+z2=4(x+y+z)(x2+y2+z2)4=(x+y+z)

Cross section of the intersection will be circle
Distance between centre and midpoint is,
(21)2+(21)2+(21)2=3

Therefore the radius of the circular cross section,
=(23)2(3)2=3
Hence, the area is
a=πr2=9π

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