Question
Calculate the volume of the cereal box.
![](data:image/png;base64,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)
- 230 in3
- 97 in3
- 132 in3
- 288 in3
Hint:
Volume is a measure of occupied three-dimensional space.
The correct answer is: 288 in3
Volume= length × width × height
= 8 × 3 × 12
= 288 cubic in.
Hence, the correct option is D.
Volume = area of base × height.
Related Questions to study
A suitcase has a dimension of 4 × 6 × 7 feet. If the clothing that goes inside of it has a total volume of 160 cubic feet, will there be enough room to fit all of the clothing?
Volume= area of base × height.
A suitcase has a dimension of 4 × 6 × 7 feet. If the clothing that goes inside of it has a total volume of 160 cubic feet, will there be enough room to fit all of the clothing?
Volume= area of base × height.
"B" in the volume formula V = B × h stand for is ______.
Volume = Area of base × corresponding height.
"B" in the volume formula V = B × h stand for is ______.
Volume = Area of base × corresponding height.
Identify the label would NOT work for volume
The SI unit of volume is m³.
Identify the label would NOT work for volume
The SI unit of volume is m³.
Identify the formulas used to find the volume of a rectangular prism.
A rectangular prism is a polyhedron that has two pairs of congruent and parallel bases. It has 6 faces (all are rectangular),12 sides, and 8 vertices. As the rectangular prism is a three-dimensional shape (3D shape), the unit that is used to express the volume of the rectangular prism is cm3, m3 and so on.
Identify the formulas used to find the volume of a rectangular prism.
A rectangular prism is a polyhedron that has two pairs of congruent and parallel bases. It has 6 faces (all are rectangular),12 sides, and 8 vertices. As the rectangular prism is a three-dimensional shape (3D shape), the unit that is used to express the volume of the rectangular prism is cm3, m3 and so on.
Volume means …
The SI unit of volume is m³.
Volume means …
The SI unit of volume is m³.
A water tank has a 10 feet long, 20 feet wide, and 5 feet depth. Find the volume of the water tank.
The volume of a cuboid formula is given by, The volume of a cuboid = Length × Width × Height Cubic units.
A water tank has a 10 feet long, 20 feet wide, and 5 feet depth. Find the volume of the water tank.
The volume of a cuboid formula is given by, The volume of a cuboid = Length × Width × Height Cubic units.
A garden box has a base with an area of 48 sq. cm. The height of the garden box is 6 cm. Find the volume of the garden box.
A garden box has a base with an area of 48 sq. cm. The height of the garden box is 6 cm. Find the volume of the garden box.
Identify label would NOT be appropriate for volume
The SI unit of volume is m³.
Identify label would NOT be appropriate for volume
The SI unit of volume is m³.