For this case, we can model the problem as the volume of a sphere.
By definition, the volume of a sphere is:
[tex]V = (4/3) * (\pi) * (r ^ 3)
[/tex]
Where,
r: radius of the sphere.
Since we have 4 gumballs, then the total volume is:
[tex]Vt = 4V
Vt = (4) * (4/3) * (\pi) * (r ^ 3)[/tex]
Substituting values we have:
[tex]Vt = (4) * (4/3) * (3.14) * (6 ^ 3)
Vt = 3617.28 mm ^ 3[/tex]
Answer:
the total volume of all 4 gumballs is:
[tex]Vt = 3617.28 mm ^ 3[/tex]
