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How many small cubes are needed to completely fill the right rectangular prism?
To determine how many small cubes are needed to fill a right rectangular prism, you first need to calculate the volume of the prism by multiplying its length, width, and height. Then, calculate the volume of one small cube by cubing its side length. Finally, divide the volume of the prism by the volume of the small cube to find the total number of cubes required.
Total surface area of two identical cubes?
(surface area of cube 1 or 2 (either)) times 2 = (total surface area of two identical cubes)
Total volume of two cubes with the length of an edge of 5 ft?
The total volume of two cubes that each have edge lengths of 5 feet is: 250 cubic feet.
What is the volume or equivalent thereof of a tesseract with side equals s and what is its the total volume of its surface cubes?
The 3D volume is 8s^3. The 4d "Volume" is s^4. Btw, why do you need to know this. It took me years to figure this, and more, on my own...
Do Cutting a larger cube into smaller cubes changes the surface-area-to-volume ratio?
Each cut exposes new surface (that was previously in the interior of the cube) without changing the total volume, so yes. If you have two numbers, and one of them changes when the other doesn't, the ratio between the two numbers will change.
