The height of a sphere is the same as its diameter, and the formula for volume of a sphere is (4/3) x pi X radius cubed. The radius is half the diameter, and in this instance the formula yields about 113.0973355 cubic inches if the value 6 is considered exact, otherwise 1.1 X 102 cubic centimeters to the justified number of significant digits.
The formula for calculating the volume of a sphere is: Volume 4/3 * π * r3. Note that the given height of the sphere 6cm is equal to the diameter of the sphere. The formula requires a radius or half the diameter. Therefore, the Volume 4/3 * 3.14 * (3 * 3 * 3 or 27) = 113.0399 or 113.04 cubic centimeters.Note that the given unit of measurement is in centimeters. You cannot just change the unit of measurement to inches and back to centimeters. The above calculation is also a few hundredths off.
Vol = 4/3*pi*r3 so given the volume, you can calculate the radius. Height of sphere = 2*radius.
Multiply the base*height*width.
The radius of a sphere is 1/2 of its height.
Length will equal the volume divided by the other two numbers.
length times with times height
Vol = 4/3*pi*r3 so given the volume, you can calculate the radius. Height of sphere = 2*radius.
The answer will depend on the shape that you are considering.
Multiply the base*height*width.
The radius of a sphere is 1/2 of its height.
The volume of a sphere is the amount of space it occupies. Given a sphere's radius, r, the volume is 4/3 ∏r3
Length will equal the volume divided by the other two numbers.
length times with times height
Since the formula for the volume of a cylinder is PI time the radius squared times the height we can calculate the height from the other two values. The height is the volume divide by PI times the radius squared.
The volume of a sphere is given by the formula V =⁴⁄ ₃πr3The volume of a sphere with radius 7cm = ⁴⁄ ₃π73 = 1436.76 cm3 (to 2 dps)
For a given area, the biggest volume you can enclose is a sphere. A sphere has the best volume-to-area ratio.
The volume (V) of a sphere is given by the formula V = 4/3π r3.
Cube: If the length of each side of the cube is represented by "s," then the volume is given by V = s³. Rectangular Prism: If the length, width, and height of the rectangular prism are represented by "l," "w," and "h" respectively, then the volume is given by V = lwh. Cylinder: If the radius of the circular base of the cylinder is represented by "r" and the height of the cylinder is represented by "h," then the volume is given by V = πr²h. Sphere: If the radius of the sphere is represented by "r," then the volume is given by V = (4/3)πr³. T