Practice problems of the surface area of a cube - page 7 of 11
Number of problems found: 207
- Cube 6
The surface area of one wall cube is 1600 cm square. How many liters of water can fit into the cube? - Wallpaper 82866
How much dm² of wallpaper is needed to stick a box (without a lid) in the shape of a cube with an edge of 12 dm? - Calculate 82077
The surface of the cube is 150 dm². Calculate its volume. - Cube-shaped 68794
How much fabric will be needed to cover 12 cube-shaped seats with a 40cm edge?
- Circumference 4002
Calculate the diagonal of the cube, with the circumference of one of its walls being 48 cm. Determine its surface and its volume. - Surface and volume - cube
Find the surface and volume of a cube whose wall diagonal is 5 cm long. - Calculate
Calculate the surface of the cube if its volume is 64 cm³. - Body diagonal - cube
Calculate the surface and cube volume with a body diagonal 15 cm long. - Cube edge
Determine the cube's edges when the surface is equal to 37.5 cm square.
- Calculate 74674
Calculate a cube's surface area and edge if its volume equals 3375 cubic meters. - Calculate: 64984
The ABCDEFGH cube (sketch it) has a debt edge of 5 cm. Calculate: a) ABFE wall area b) Area of the ADHE wall c) the surface of the cube d) Cube volume - Centimeters 4081
Determine the wall and body diagonal of the cube, with the surface of one of its walls being 121 square centimeters. - Space diagonal
The space diagonal of a cube is 129.91 mm. Find the lateral area, surface area, and volume of the cube. - Cube
The sum of all cube edges is 30cm. Find the surface area of the cube.
- Body diagonal
Calculate the volume and surface of the cube if the diagonal body measures ten dm. - Area and percents
Find what percentage is a smaller cube surface when the wall's surface area decreases by 25%. - Cube 5
The surface area of one cube wall is 32 square centimeters. Determine the length of its edges, its surface, and volume. - Cube
Calculate the cube ABCDA'B'C'D's surface if the area of rectangle ACC'A' = 344 mm². - Center of the cube
The Center of the cube has a distance 16 cm from each vertex. Calculate the volume V and surface area S of the cube.
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