A monument has a base and a statue. The base is a rectangular prism that measures 4 feet by 6 feet by 2 feet. The statue is a cube with edges that are 2 feet long. What is the volume of the monument?
COVID IS TERRIBLE
(6×4×2)×2=96 cubic feet
So find the volume of the separate shapes. For rectangular prisms (which includes cubes), multiply width by height by length. So multiply 4 by 6 by 2. And for the cube, multiply 2 by 2 by 2. Then, to find the total volume, add the two together.
48+8=56
To find the volume of the monument, we need to calculate the volume of both the base and the statue, and then add them together.
Let's start with the base. The base is in the shape of a rectangular prism, which means we need to multiply its length, width, and height to find its volume. In this case, the length is 4 feet, the width is 6 feet, and the height is 2 feet.
So, the volume of the base is:
Volume of base = length × width × height = 4 feet × 6 feet × 2 feet = 48 cubic feet.
Next, let's calculate the volume of the statue. The statue is in the shape of a cube, so we can find its volume by cubing the length of one edge. In this case, the length of each edge is 2 feet.
Therefore, the volume of the statue is:
Volume of statue = length of edge × length of edge × length of edge = 2 feet × 2 feet × 2 feet = 8 cubic feet.
Finally, to find the total volume of the monument, we add the volume of the base and the volume of the statue:
Total volume of the monument = Volume of base + Volume of statue
Total volume of the monument = 48 cubic feet + 8 cubic feet = 56 cubic feet.
So, the volume of the monument is 56 cubic feet.
the formula for Volume is...
V=l*w*h
6x4
2x2
Then add the answers and you have the volume
It is 96 cubic feet