1 liter
The volume of cylinder 1' high x 1' diameter is: 0.785 cubic feet.
high mountain......
The volume is 3*5*2 = 30 cubic metres.
A can of tennis balls is a cylinder. The formula for the volume of a cylinder is V = pr2 h therefore to find the volume: V = p(1.5)2 (8) V=18p
600 cubic cm
If you mean a cubical container, yes - that would be exactly one liter.
339.29
The correct spelling is "loudly" (high volume).
The volume of any rectangular prism, inclucing a square container, is:.length x width x height.For example, a box that is 4" long by 4" wide and 3" high would have a volume of 48 cubic inches.
Basic mental arithmetic... 132 cm3
250pi/4
"40*40*40 = 64000". This answer only applies if the asker is looking for the exact volume of a container that is actually 40 feet in height, length, and width.If, in fact, you are searching for the volume of a 40 Foot High Cube Shipping Container as I was, the correct interior volume of this device is: 2,694 ft3 / 76.3 m3.
A liter is a measure of volume; we need to calculate the volume of the tank. For this we need to have all three measurements of the tank.
Solids: they have fixed shape and fixed volume. They cannot be compressed much. They cannot flow. They do not fill their container completely. They have high density. They are heavy. Liquids: they have fixed volume but not fixed shape they take the shape of their container. They cannot be compressed much. They can flow. They do not fill their container completely. They have moderate to high density. Gases: they do not have fixed shape and volume. They can be compressed easily. They can flow. They fill their container completely. They have very low density.
No, because the gas is in a rigid steel container, its volume cannot increase as the temperature increases (assuming the steel does not deform). Instead, the pressure of the gas inside the container will increase. Of course, if the pressure is high enough, the container will explode, lowering the pressure and causing the gas to expand.
Cold water with high salinity takes up more volume than warm water than low salinity
It's not stated in the problem, but I'm going to assume that Container 1 is full of milk, and that milk is being poured into Container 2. The volume of Container 1 is (1/3)*pi*h*r2. We know r=4 and h=9, so the volume is 48*pi cubic units. The volume of Container 2 is pi*h*r2. We know r=5, so the volume becomes pi*h*25. We want to find h so that the volume of Container 2 is the same as the volume of Container 2, or: pi*h*25 = 48*pi, or h = 48/25 = 1 23/25 units.