A magician is preparing for a show and has just ordered a cubic vault for a trick. On the vault's description only it says the vault has a volume of 64 cubic feet. What are the side lengths of this vault?
To find the side lengths of the cubic vault, we need to find the cube root of its volume.
Let's use the formula: side length = cubic root of volume.
The volume of the vault is given as 64 cubic feet.
Taking the cubic root of 64:
∛64 = 4
Therefore, the side lengths of the vault are 4 feet each.
To find the side lengths of the cubic vault, we need to find the cube root of its volume. The cube root will give us the length of each side.
The volume of the vault is given as 64 cubic feet.
So, to find the side lengths, we take the cube root of 64:
∛64 = 4
Therefore, each side of the vault measures 4 feet.
To find the side lengths of the cubic vault, we need to determine the length of each side. Since the volume of a cube is given, we can use the formula:
Volume = Side length^3
In this case, the volume is given as 64 cubic feet. Plugging this value into the formula, we have:
64 = Side length^3
To find the side length, we can take the cube root of both sides of the equation. The cube root of 64 is 4, so:
Side length = 4
Therefore, the side lengths of the vault are all 4 feet.