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Question

A line passes through the centre of a sphere whose radius is 5 and one of the intercept points is (1,−2,2). If the equation of the line is
x1=y−2=z2
,then the equation of the sphere can be

A
x2+y2+z2163x+323y323z=39
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B
x2+y2+z2+43x83y+83z21=0
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C
x2+y2+z2+163x323y+323z=39
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D
x2+y2+z2163x+323y323z=39
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Solution

The correct option is B x2+y2+z2+43x83y+83z21=0
Since line passes through the centre,
x1=y2=z2=1So, any point on the line can be represented as (t,2t,2t).
Let's assume that this point is the centre of the sphere, then according to the question, radius of sphere is 5. So,
(t1)2+(2t+2)2+(2t2)2 =5(t1)2+4(t1)2+4(t1)2=59(t1)2=53(t1)=5, 3(1t)=5t=83, 23
So the coordinates of center of the sphere can be (83,163,163) or (23, 43, 43).
The equation of the sphere in the first case is
(x83)2+(y+163)2+(z163)2=52x2+y2+z2163x+323y323z=39
The equation of the sphere in the second case is
(x+23)2+(y43)2+(z+43)2=52x2+y2+z2+43x83y+83z21=0


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