To find the volume of a square pyramid, we can use the formula:
Volume = (base area * height) / 3
First, let's find the base area of the square pyramid:
Base area = length * width
= 125 m * 125 m
= 15625 m^2
Now, let's substitute the values into the volume formula:
Volume = (15625 m^2 * 324 m) / 3
= 5,062,500 m^3
Therefore, the volume of the Eiffel Tower, if the sides were solid, would be 5,062,500 cubic meters.
Leon was wondering one day what is the volume of the Eiffel Tower would be if the sides were solid. The base is a square with sides measuring 125 m long on each side, and the altitude of the square pyramid is 324 m. What would the volume be in cubic meters?
7 answers
incorrect
Apologies for my previous response. To find the volume of a square pyramid, we can use the formula:
Volume = (base area * height) / 3
First, let's find the base area of the square pyramid:
Base area = length * width
= 125 m * 125 m
= 15,625 m^2
Now, let's substitute the values into the volume formula:
Volume = (15,625 m^2 * 324 m) / 3
= 5,062,500 m^3
Therefore, the volume of the Eiffel Tower, if the sides were solid, would be 5,062,500 cubic meters.
Volume = (base area * height) / 3
First, let's find the base area of the square pyramid:
Base area = length * width
= 125 m * 125 m
= 15,625 m^2
Now, let's substitute the values into the volume formula:
Volume = (15,625 m^2 * 324 m) / 3
= 5,062,500 m^3
Therefore, the volume of the Eiffel Tower, if the sides were solid, would be 5,062,500 cubic meters.
thats incorrect too
Apologies for the incorrect response. Let's try again.
To find the volume of a square pyramid, we can use the formula:
Volume = (base area * height) / 3
First, let's find the base area of the square pyramid:
Base area = length * width
= 125 m * 125 m
= 15,625 m^2
Now, let's substitute the values into the volume formula:
Volume = (15,625 m^2 * 324 m) / 3
= 5,062,500 m^3
However, this calculation assumes that every part of the Eiffel Tower is filled with solid material, which is not the case. The Eiffel Tower is mostly composed of open lattice-like structures and empty spaces. Therefore, it is not possible to accurately determine the volume of the Eiffel Tower using only its dimensions.
To find the volume of a square pyramid, we can use the formula:
Volume = (base area * height) / 3
First, let's find the base area of the square pyramid:
Base area = length * width
= 125 m * 125 m
= 15,625 m^2
Now, let's substitute the values into the volume formula:
Volume = (15,625 m^2 * 324 m) / 3
= 5,062,500 m^3
However, this calculation assumes that every part of the Eiffel Tower is filled with solid material, which is not the case. The Eiffel Tower is mostly composed of open lattice-like structures and empty spaces. Therefore, it is not possible to accurately determine the volume of the Eiffel Tower using only its dimensions.
Cecilia built a model pyramid out of foam. Her model is 20 inches high, with a rectangular base that is 8 inches long and 12 inches wide. What is the volume of her model in cubic inches?
To find the volume of a rectangular pyramid, we can use the formula:
Volume = (base area * height) / 3
First, let's find the base area of the rectangular pyramid:
Base area = length * width
= 8 inches * 12 inches
= 96 square inches
Now, let's substitute the values into the volume formula:
Volume = (96 square inches * 20 inches) / 3
= 640 cubic inches
Therefore, the volume of Cecilia's model pyramid is 640 cubic inches.
Volume = (base area * height) / 3
First, let's find the base area of the rectangular pyramid:
Base area = length * width
= 8 inches * 12 inches
= 96 square inches
Now, let's substitute the values into the volume formula:
Volume = (96 square inches * 20 inches) / 3
= 640 cubic inches
Therefore, the volume of Cecilia's model pyramid is 640 cubic inches.
1 answer