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What is the total area of a square pyramid with a slant height of 10 ft and a base of 81 ft?
7821 squared 61168041
What is the total area of a square pyramid with a slant height of 20 ft and a base of 81 ft?
1620 81 times 20 = 1620
What is the base area of a square pyramid when the side is 20 and height 25?
The base area would be 400 square units (m, ft, or whatever they gave you). You don't have to worry about the height because it is only the area of the base. The area of a square is s2, and 202 = 400.
The base of a pyramid with one fewer face than a square pyramid has a perimeter of 963 ft how long is one side of the base?
Either 231 ft, 263 ft, 311 ft, or 321 ft. :D
If the volume of this regular pyramid is 300 cu-bid ft and the height is 25ft what is the length of one of the sides of its square base?
To find the length of one side of the square base of a regular pyramid, we can use the formula for the volume of a pyramid: ( V = \frac{1}{3} \times \text{Base Area} \times \text{Height} ). Given that the volume ( V = 300 ) cu-ft and the height ( h = 25 ) ft, we can rearrange the formula to find the base area: [ \text{Base Area} = \frac{V \times 3}{h} = \frac{300 \times 3}{25} = 36 \text{ sq-ft}. ] Since the base is square, the area is also given by ( \text{side}^2 ), so ( \text{side}^2 = 36 ), which means the length of one side of the base is ( \sqrt{36} = 6 ) ft.
What is the volume of the square pyramid with base edges 24 ft and slant height 37 ft?
67
What is the volume of a square pyramid with base edges 8 ft and height of 6 ft?
Volume = 72 ft3
What is the total area of a square pyramid with a slant height of 10 ft and a base of 81 ft?
7821 squared 61168041
What is the volume of a pyramid with a 6 ft by 5 ft rectangular base and a height of base?
The height of the pyramid is not give in any meaningful way.
Find the volume of a square pyramid with base edges of 21 feet and a height of 18 feet?
Volume of this pyramid is (area of base) x (height) / 3. The area of the base (square) is (edge)2 So (21 ft)2 * (18 ft)/3 = 26586 cubic feet
What is the total area of a square pyramid with a slant height of 20 ft and a base of 81 ft?
1620 81 times 20 = 1620
Find the volume of a square pyramid with base edges of 27 feet and a height of 30 feet?
7290 ft. cubed
What is the base area of a square pyramid when the side is 20 and height 25?
The base area would be 400 square units (m, ft, or whatever they gave you). You don't have to worry about the height because it is only the area of the base. The area of a square is s2, and 202 = 400.
The great pyramid has a volume of84375000 cubic feet above ground at ground level the are of the base is about 562500 square feet what is the approximate height of the great pyramid?
2812500 ft high
The base of a pyramid with one fewer face than a square pyramid has a perimeter of 963 ft how long is one side of the base?
Either 231 ft, 263 ft, 311 ft, or 321 ft. :D
If the volume of this regular pyramid is 300 cu-bid ft and the height is 25ft what is the length of one of the sides of its square base?
To find the length of one side of the square base of a regular pyramid, we can use the formula for the volume of a pyramid: ( V = \frac{1}{3} \times \text{Base Area} \times \text{Height} ). Given that the volume ( V = 300 ) cu-ft and the height ( h = 25 ) ft, we can rearrange the formula to find the base area: [ \text{Base Area} = \frac{V \times 3}{h} = \frac{300 \times 3}{25} = 36 \text{ sq-ft}. ] Since the base is square, the area is also given by ( \text{side}^2 ), so ( \text{side}^2 = 36 ), which means the length of one side of the base is ( \sqrt{36} = 6 ) ft.
If the volume of this regular pyramid is 300 ft cu-bid what is the length of one of the sides of its square base?
To find the length of one side of the square base of a regular pyramid with a volume of 300 cubic feet, we use the formula for the volume of a pyramid: ( V = \frac{1}{3} \times \text{Base Area} \times \text{Height} ). Assuming the base is a square, the base area is ( s^2 ) (where ( s ) is the side length). However, without the height of the pyramid, we cannot directly calculate ( s ). If the height were known, we could rearrange the formula to solve for ( s ).
