1728 ft cubed
A 28 meter square is 28 times 28 meters or 784 square meters. If it is one tenth of a meter (10 cm) deep, it has a volume of 78.4 cubic metersIf you mean 28 square meters (like a pool 4 meters by 7 meters) then the volume one tenth of a meter deep is 2.8 cubic meters.
What is the answer for rounding 14389 to the nearest thousands
Assuming one the depth varies along the 30 m length; the volume of water would be approx. 630 metercube or 22251.5 ft-cube or 166463 gallons. Hope it'll help.
One cubic meter cannot be "converted" to a square measure unless we know how "deep" it is being spread. For example, if it is one meter deep, then it would cover one square meter; but if it is two meters deep, then it would cover half that area. If it were, say, 1 cm deep, then it could cover a million square centimeters (100 x 100 x 100).
1728 ft cubed
A 28 meter square is 28 times 28 meters or 784 square meters. If it is one tenth of a meter (10 cm) deep, it has a volume of 78.4 cubic metersIf you mean 28 square meters (like a pool 4 meters by 7 meters) then the volume one tenth of a meter deep is 2.8 cubic meters.
Volume = pi * radius^2 * height
A rectangular prisms volume is calculated by L x W x H = V, so by rearranging that equation to find "H" we get V / (L x W) = H. 375 / ( 10 x 5 ) = 375 / 50 = 7.5 meters The pool is 7.5 meters deep.
A cubic meter is a unit of volume equal to the volume of a cube measuring 1 meter on each side. It is commonly used to measure the volume of solids and liquids.
The volume is 0.7854 m3
the formula is pi x r2 x h So, 3.14159 x 292 x 0.5 = 1321m3
What is the answer for rounding 14389 to the nearest thousands
3 meters is about 10 feet.
m3 is a cubic meter. It is the volume equivalent of a cube 1 meter wide by 1 meter deep by 1 meter tall. 1 m3 is equivalent to 1000 liters.
The volume of water the tub can hold is 1 meter deep by 1 meter wide by 2 meters long, which equals 2 cubic meters. 1 cubic meter of water weighs approximately 1000 kg, so the total weight of water in the tub would be 2000 kg. Therefore, the floor would need to support an additional 2000 kg of weight when the tub is filled with water.
890.19m3