A rod of length 2 units whose one end is (1,0,−1) and other end touches the plane x−2y+2z+4=0. Then
A
the rod sweeps a figure whose volume is π cubic units.
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B
the area of the figure which the rod traces on the plane is 2π units.
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C
the length of projection of the rod on the plane is √3 units.
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D
the centre of the region which the rod traces on the plane is (23,23,−53)
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Solution
The correct options are A the rod sweeps a figure whose volume is π cubic units. C the length of projection of the rod on the plane is √3 units. D the centre of the region which the rod traces on the plane is (23,23,−53)
Let AB be the rod. Given AB=2 So the rod sweeps out a cone. Perpendicular distance of A(1,0,−1) from the plane x−2y+2z+4=0 is AC=|1−2+4|√1+4+4=1 ∴ Radius of the base of the cone, BC=√22−12=√3
Hence, the volume of the cone =13π(√3)2⋅1=π
Area of the circle which the rod traces on the plane is π(√3)2=3π.
Let centre of the circle be C(x,y,z) Then equation of the line joining points A and C, x−11=y−0−2=z+12=k⇒x=k+1,y=−2k,z=2k−1 Putting this in the equation of plane, k+1+4k+4k−2+4=0⇒k=−13 ⇒x=23,y=23,z=−53