Volume of a Sphere – Formula Practice

Sphere with radius 4 cm. Volume?

Explanation

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The volume of a sphere is given by:

\[ V = \tfrac{4}{3}\pi r^3 \]

where \(r\) is the radius of the sphere.

A sphere is the 3D set of points equidistant from a center.
Its volume can be derived by integration in calculus or by geometric comparison with a cylinder and cone (Archimedes’ theorem).
The factor \(\tfrac{4}{3}\) ensures the formula fits these derivations.

Look for perfect ball shapes — e.g. footballs, oranges, marbles.

The volume of a sphere is \(\tfrac{4}{3}\pi r^3\). Cube the radius, multiply by \(\pi\), then scale by \(\tfrac{4}{3}\).

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Find the volume of a sphere with radius 3 cm.
1. \( r^3=27 \)
2. \( V=4/3 π×27=36π \)
Answer: 36π cm³
Find the volume of a sphere with radius 5 cm.
1. \( r^3=125 \)
2. \( V=4/3 π×125=500/3 π \)
Answer: 500/3 π cm³
Sphere with diameter 10 cm. Volume?
1. \( r=5 \)
2. \( r^3=125 \)
3. \( V=500/3 π \)
Answer: 500/3 π cm³
Sphere with radius 7 cm. Volume?
1. \( r^3=343 \)
2. \( V=4/3 π×343=1372/3 π \)
Answer: 1372/3 π cm³
Sphere with radius 1 cm. Volume?
1. \( r^3=1 \)
2. \( V=4/3 π \)
Answer: 4/3 π cm³
Find volume of sphere radius 12 cm.
1. \( r^3=1728 \)
2. \( V=4/3 π×1728=2304π \)
Answer: 2304π cm³
Sphere radius 10 cm. Volume?
1. \( r^3=1000 \)
2. \( V=4/3 π×1000=4000/3 π \)
Answer: 4000/3 π cm³
Sphere diameter 18 cm. Volume?
1. \( r=9 \)
2. \( r^3=729 \)
3. \( V=4/3 π×729=972π \)
Answer: 972π cm³
Sphere radius 2.5 cm. Volume?
1. \( r^3=15.625 \)
2. \( V=4/3 π×15.625=20.833...π \)
Answer: 20.833π cm³
General: radius r. Volume?
1. \( V=4/3 πr^3 \)
Answer: \( 4/3 πr^3 \)