A circle
They are spheres. They cannot therefore have different geometrical properties. To alter surface to volume ratios you would need to alter the shape. The study of mathematical shapes is called topology.
The depth would have to have a value of 1. For example, a slab 60" long by 24" wide by 1" deep would have the same surface area as volume. Examples: Area = LxW (60x24=1440 sq inches). Volume = LXWXD (60x24x1=1440 cubic inches). In this case, the volume has the same value as the surface area
A cone would fit the given description
To calculate the surface area of a brick, you would find the surface area for each of the 6 sides, then add them together. To find the surface area of one of the faces/sides, you would multiply the length of the face in question by the width of that same face. If this is a regular brick, then the sides should match up, meaning if you do one side, then the opposite side should be the same surface area. To find the volume, you multiply the height of the brick by the length of the brick by the width of the brick.
A cube has 6 faces of equal area. Area of each face would then be: 294 / 6 = 49 cm2. Each face is a square with edge of length equal to square root of its surface: a = sqrt(49) = 7 cm. Volume of cube is V = a3. For a = 7 cm, it would be V = 343 cm3.
The answer will depend on shape in question.
Surface tension is in equilibrium. The shape of a sphere has the highest volume to surface area to radius ratio. This shape is the lowest energy level a volume of liquid can have. Deforming it into another shape would involve an increase in surface area and an increase in the average radius.
the davantage is the surface area to volume ratio of its morphology
A living cell is not a simple geometric shape like a sphere or a cube. What sort of weird cell shape might increase the ratio of surface area to volume Would you be able to test this more complex shape?
They are spheres. They cannot therefore have different geometrical properties. To alter surface to volume ratios you would need to alter the shape. The study of mathematical shapes is called topology.
It is not possible to have a sphere with a surface are of 300 metres squared and a volume of 500 metres cubed. A surface area of 300 sq metres would imply a volume of 488.6 cubic metres or a shape that is non-spherical!
How does the surface-to-volume ratio change each time you cut the value of "s" in half? 4mm 96mm2 64mm3 1.5 to 1 2.0mm 24mm2 8mm3 3 to 1 1.0mm 6mm2 1mm3 6 to 1 0.50mm 1.5mm2 .125mm3 12 to 1 0.25mm .375mm2 .016mm3 24 to 1
A liquid or semi-liquid without a container in microgravity takes on the shape that has the least amount of surface area compared to the volume. That would be a sphere. Now, if it is turning there will be a slight bulge at the equator of the ball, which there is.
They are spheres. They cannot therefore have different geometrical properties. To alter surface to volume ratios you would need to alter the shape. The study of mathematical shapes is called topology.
If the cell's surface-to-volume ratio got too small as a result of the volume increasing faster than the surface area, the cell would no tbe able to get the nutrients it needs to survive and would die.
1. cells shape depends on the specific functions the cells do . 2. a material known as cytoskeleton made of protein filaments . By - Sudarshan Rawat , N .Delhi 09868876602 E Mail- rawat.sudarshan@gmail.com
The cell's ratio of surface area to volume would decrease if its volume increases more rapidly than its surface area.