Answer:
4 inches
Step-by-step explanation:
Since the cardboard is being cut into square pieces this means that the 3D box is also going to be square. That also means that every single side will have the same length. Therefore, to calculate the length that would create a 64 cubic in box we simply find the cubic square root of 64... simply plug this into the calculator and you get the following...
[tex]\sqrt[3]{64}[/tex] = 4 inches.
Answer:
x = 4 in
Step-by-step explanation:
Volume of the open box is:
V(b) = 64 in³
And is equal to:
V(b) = L * w * h length * wide * heigh
According to the problem statement
x the side of the squares to be cut must be x ≤ 5
since 5 inches for x means no box at all
On the other hand, if we get factors for 64
64 = 2*2*2*2*2*2 or 64 = 8 * 4 * 2
Then values for x could be 4 and 2, evaluating x = 4
Then L = 16 one side of the box is 16 - 2*x = 8 in
The other w = 10 10 - 2*x = 2 in
And The volume is: V(b) = 8*2*4 = 64 in³
