The volume of the rectangular prism is calculated using the formula V = l × w × h. With the given dimensions (length = 88m, width = 55m, height = 33m), the volume is 160,380 cubic meters.
To calculate the volume of the rectangular prism for the community center, we use the formula for the volume of a rectangular prism (V), which is the product of its length (l), width (w), and height (h): V = l × w × h. Given the dimensions of the prism as a length of 88 meters, a width of 55 meters, and a height of 33 meters, the equation to determine the volume would be:
V = 88 m × 55 m × 33 m.
Therefore, to find the volume, you multiply these three dimensions:
V = 88 × 55 × 33 = 160,380 m³
So, the community center will have a volume of 160,380 cubic meters (m³), which represents the total space available inside the structure.
The probable question may be:
In a town planning project, community members are working on designing a rectangular prism structure for a community center. The prism has a length of 88 meters, a width of 55 meters, and a height of 33 meters.
Given this, create a straightforward equation to determine the volume of the prism. Imagine the prism as a giant bookshelf where books of knowledge are stored, and each dimension represents the number of different types of books placed on each shelf. Express the equation using the side lengths.
Additional Information:
The rectangular prism is envisioned as a multifunctional space where community members can gather for various activities. The length of 88 meters is akin to the length of a standard school bus. The width of 55 meters is about the size of a small room, providing ample space for collaborative projects. Finally, the height of 33 meters gives the prism a cozy, yet open atmosphere, resembling the dimensions of a comfortable living room.