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Question

Find the equation of the sphere with center (3,6,-4) and touching the plane 2x-2y-z-10=0?


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Solution

Step 1: Find the radius of the sphere

Let r is the radius of sphere

The radius of the sphere = Distance between the center of the sphere and the point at which the plane touches the sphere

Distance between a pointx1,y1,z1 and a plane(ax+by+cz+d=0) is given as

r=ax1+by1+cz1+da2+b2+c2

⇒ =2×3-2×6+4-1022+-22+1

⇒ =129

⇒ =123

⇒ r=4

Step 2: Solve for the equation of sphere using center radius form of equation

The equation of sphere is

x-a2+y-b2+z-c2=r2 where a,b,c are the co-ordinates of the center of the sphere

⇒ x-32+y-62+z+42=42

⇒x2+y2+z2−6x−12y+8z+45=0

Hence, the required equation of the sphere whose center is (3,6,-4) and r=4is x2+y2+z2−6x−12y+8z+45=0


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