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V = S3 Given V = 64 Cm3.

The side length of a cube =. [given] ⇒ a = 4 now, surface area of the. Then, volume of cube = a 3 = 64.

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We know that the volume of a cube = s 3 (where 's' is the side length of a cube). We know that, volume = s^3 volume = 64cm^3 s^3 = 64 s = cube root of 64 s= 4 cm therefore, the side of the cube is 4 cm. Solution the volume of a cube is 64 cm 3.

A Conical Vessel Has Base Radius 31 Cm And Height 45 Cm.

[ s = \sqrt [3] {64} ].

Understand The Volume Of A Cube:

Find the volume ( in cm3) of water in the vessel. Water is poured into the vessel until it is 2/3 full. [ s = \sqrt [3] {64} ].

The Length Of Each Side Of The Cube Is 4 Cm.

Step 2 take the cube root of both sides to solve for s: To find the surface area of a cube when the volume is given, we can follow these steps: The side length of a cube can be found by taking the cube root of its volume.

Solution The Volume Of A Cube Is 64 Cm 3.

V = s3 given v = 64 cm3. The side length of a cube =. Its surface area is 96 cm2.

Here We Are Given That.

A conical vessel has base radius 31 cm and height 45 cm. We know that the volume of a cube = s 3 (where 's' is the side length of a cube). Where a is the length of one side of the cube.

Let The Side Of The Cube Be A.

Recall the formula for the volume of a cube, which is $$v = a^ {3}$$v = a3, where $$v$$v is the volume and $$a$$a is the length of the edge. We know that, volume = s^3 volume = 64cm^3 s^3 = 64 s = cube root of 64 s= 4 cm therefore, the side of the cube is 4 cm. The volume of a cube is given by the equation, v = a³ where 'a' is the side of the cube.