Finding the Distance Between Two Spheres in Three Dimensional Space

by admin|Published May 8, 2026

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Finding the Distance Between Two Spheres in Three Dimensional Space

This lesson focuses on using multivariable calculus and vector geometry techniques to determine the distance between two spheres in three dimensional space. Problems involving spheres are extremely common in calculus, physics, engineering, computer graphics, and higher dimensional geometry.

Standard Form of a Sphere

A sphere in three dimensions is typically written in the form:

$(x-h)^2+(y-k)^2+(z-l)^2=r^2$

The point $(h,k,l)$ represents the center of the sphere while $r$ represents the radius.

Determining the Centers and Radii

To find the distance between two spheres, the first step is rewriting each equation into standard sphere form. Once rewritten, the centers and radii become visible directly from the equation.

Distance Formula in Three Dimensions

$d=\sqrt{(x_2-x_1)^2+(y_2-y_1)^2+(z_2-z_1)^2}$

This formula measures the distance between the centers of the two spheres.

Finding the Distance Between the Surfaces

Once the center to center distance is known, the radii are subtracted to determine the shortest distance between the actual surfaces of the spheres.

$\text{Distance Between Surfaces}=d-r_1-r_2$

If the result is positive, the spheres are separated. If the result is zero, the spheres are tangent. If the result is negative, the spheres overlap one another.

Finding the Distance Between Two Spheres in Three Dimensional Space

Standard Form of a Sphere

Determining the Centers and Radii

Distance Formula in Three Dimensions

Finding the Distance Between the Surfaces

Main Takeaway

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