Cube - practice for 13 year olds - page 2 of 11
Number of problems found: 211
- Reduce of the volume
Calculate how many % reduce the volume of the cube is reduced the length of each edge by 10%. - Calculate 8327
Calculate the surface area of a cube with a volume of 262,144 cm³. - Calculate 7854
The surface of the cube is 61.44 cm². Calculate its volume. - Cube 6
The volume of the cube is 216 cm³. Calculate its surface area.
- Calculate 47773
Calculate the volume of a cube whose surface is 15,000 cm². Express the result in liters. - Perfect cubes
Suppose a number is chosen at random from the set (0,1,2,3,. .. ,202). What is the probability that the number is a perfect cube? - Area to volume
If the surface area of a cube is 486, find its volume. - Cube surface and volume
Find the surface of the cube with a volume of 27 dm³. - Cube walls
Find the cube's volume and surface area if the area of one of its walls is 40 cm².
- Big cube
Calculate the cube's surface, which is composed of 64 small cubes with an edge 1 cm long. - Cube surface area
The surface of the cube was originally 216 centimeters square. The surface of the cube has shrunk from 216 to 54 centimeters sq. Calculate how much percent the edge of the cube has decreased. - Cube and water
How many liters of water can fit into a cube with an edge length of 0.11 m? - Liters 44041
What is the length of the edge of a cube with a volume of V = 1728 liters? - Determine 6008
We will create a larger cube from 27 cubes with an edge of 2 cm. Determine the surface of the built cube.
- Area of a cube
Calculate the surface area of a cube if its volume is equal to 729 cubic meters. - Cubes
How many cubes with an edge length of 5 cm may fit in the cube with an inner edge of 0.4 m maximally? - Cube wall
The surface of the first cube wall is 64 m². The second cube area is 40% of the surface of the first cube. Find the length of the edge of the second cube (x). - Volume and area
What is a cube's volume with an area of 361 cm²? - Determine 7488
The lengths of the edges of the two cubes are in the ratio 2:3. Determine how many times the surface of the larger cube is larger than the surface of the smaller cube.
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