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They are both 3 dimensional shapes

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Q: How are cube and sphere the same?
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Related questions

What is the side length of a cube that has the same volume of a sphere with the radius of 1?

The side length of a cube that has the same volume of a sphere with the radius of 1 is: 1.61 units.


What has more surface area a sphere or a cube?

A sphere has less surface with the same diameter.


If you have a cube and a sphere that weigh the same but only the cube will float what does that tell you about the volume?

The cube has a larger volume.


A sphere of radius r is inscribed in a cube what is the volume enclosed between the cube and sphere?

volume of the cube - volume of the sphere = volume enclosed between the cube and sphere


Can the surface to volume ratio of a sphere be the same as a cube?

No. The surface to volume ratio of a sphere is always smaller than that of a cube. This is because the sphere has the smallest surface area compared to its volume, while the cube has the largest surface area compared to its volume.


How would the densities of the sphere and cube have compared if the masses of the cube and sphere had been the same but the volume of the cube had been greater?

Density = Mass/Volume, whatever the shape. So, if the masses are the same, the density is greater when the volume id smaller. Thus the sphere, with the smaller volume has the greater density.


A shape having the same dimensions of length height and width?

Cube, equilateral pyramid, and sphere.


How are a cube and a sphere different?

a cube and a sphere are different because is more of a square shape and a sphere is cylindrical


Square is to cube as circle is to?

Square is to cube as circle is to.......sphere


What is bigger the surface area of a sphere or the surface area of a cube if they have the same volume?

surface area of sphere = 4πR2 volume of sphere = 4/3πR3 surface area of cube = 6s2 volume of cube = s3 since volumes are equal then s3 = 4/3πR3 s = [cube root (4/3π)] R surface area ofcube = 6 (cube root( 4/3π) times R)2 surface area sphere = 4πR2= 12.56 R2 surface area cube = 15.44 R2 So a sphere has less surface area than a cube with the same volume. Where R= radius of the sphere s=length of side of the cube Sorry,calculation above is now corrected - same equations, earlier made math error - cube has more surface area as you can see


What is the diameter of a copper sphere that has the same mass as a 8.00 8.00 8.00 cube of aluminum?

The diameter of the sphere is 19.6 cm.


How would the density of a sphere and cube compare if the mass of the cube and sphere are the same but the volume of the cube is greater?

If the same mass is contained in a greater volume, that means that the mass is spread thinner, so there's "less mass in each little piece of volume". That's the same as saying "lower density".