Volume Worksheets 8th Grade

Volume worksheets are an essential tool for 8th-grade students who are looking to solidify their understanding of this important math concept. These worksheets provide a variety of exercises that help students practice and sharpen their skills in calculating the volume of various geometric shapes. From simple rectangular prisms to complex cylinders and cones, these worksheets offer a wide range of problems to challenge and engage students.

  8th Grade Math Volume Worksheets

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  8th Grade Math Practice Worksheets

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  8th Grade Math Worksheets Ratios

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  8th Grade Math Worksheets

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  Surface Area Worksheets 8th Grade

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  8th Grade Math Worksheets Algebra

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  Surface Area Worksheets 6th Grade

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  Surface Area Worksheets 8th Grade

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  8th Grade Math Worksheets Geometry

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  4th Grade Science Worksheets Density

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  7th Grade Math Worksheets

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  Surface Area and Volume Worksheet 8th Grade Math Practice

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  Surface Area and Volume Worksheets Grade 6

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  Surface Area Volume Word Problems Worksheets

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  8th Grade Math Word Problems

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What is the volume of a rectangular prism with a length of 6 cm, width of 4 cm, and height of 3 cm?

The volume of a rectangular prism is calculated by multiplying its length, width, and height. Therefore, for a rectangular prism with a length of 6 cm, width of 4 cm, and height of 3 cm, the volume would be 6 cm × 4 cm × 3 cm = 72 cubic centimeters.

Find the volume of a cylinder with a radius of 5 cm and height of 10 cm.

The volume of a cylinder is calculated using the formula V = ?r^2h, where r is the radius and h is the height. Plugging in the values of radius 5 cm and height 10 cm into the formula gives V = ?*(5 cm)^2*(10 cm) = 250? cm^3, which simplifies to approximately 785.4 cubic centimeters. Hence, the volume of the cylinder is 785.4 cubic centimeters.

Calculate the volume of a cone with a radius of 8 cm and height of 12 cm.

The volume of a cone can be calculated using the formula: V = (1/3) * ? * r^2 * h where r is the radius and h is the height. Substituting the values r = 8 cm and h = 12 cm into the formula, we get V = (1/3) * ? * (8 cm)^2 * 12 cm = 256? cm^3. Therefore, the volume of the cone is 256? cubic cm or approximately 804.25 cubic cm.

What is the volume of a sphere with a radius of 6 cm?

The volume of a sphere with a radius of 6 cm is 904.32 cubic centimeters.

Find the volume of a triangular prism with a base length of 5 cm, base width of 3 cm, and height of 7 cm.

The volume of a triangular prism can be calculated by multiplying the area of the base of the triangle (1/2 * base length * base width) by the height of the prism. In this case, the area of the base is 1/2 * 5 cm * 3 cm = 7.5 square cm. Multiplying the base area by the height of 7 cm gives a volume of 52.5 cubic cm for the triangular prism.

Calculate the volume of a pyramid with a base area of 25 square units and height of 9 units.

To calculate the volume of a pyramid, you can use the formula V = (1/3) * base area * height. Plugging in the values given, V = (1/3) * 25 * 9 = 75 cubic units. Therefore, the volume of the pyramid is 75 cubic units.

What is the volume of a cube with a side length of 10 units?

The volume of a cube with a side length of 10 units is 1000 cubic units. This is calculated by cubing the length of one side (10 x 10 x 10 = 1000).

Find the volume of a rectangular pyramid with a base length of 8 units, base width of 6 units, and height of 12 units.

To find the volume of a rectangular pyramid, use the formula V = (1/3) * base area * height. First, calculate the base area by multiplying the base length and width: 8 units * 6 units = 48 square units. Then, plug the base area and height into the formula: V = (1/3) * 48 square units * 12 units = 192 cubic units. Therefore, the volume of the rectangular pyramid is 192 cubic units.

Calculate the volume of a composite figure made up of a rectangular prism with a length of 7 units, width of 5 units, and height of 9 units, and a triangular prism with a base length of 4 units, base width of 6 units, and height of 8 units.

To find the volume of the composite figure, we need to calculate the volumes of the two individual components and then add them together. The volume of the rectangular prism is length x width x height = 7 x 5 x 9 = 315 cubic units. The volume of the triangular prism is 1/2 x base length x base width x height = 1/2 x 4 x 6 x 8 = 96 cubic units. Therefore, the total volume of the composite figure is 315 + 96 = 411 cubic units.

What is the volume of a rectangular prism with a length of 12 units, width of 9 units, and height of 4 units?

The volume of a rectangular prism is calculated by multiplying its length, width, and height. In this case, the volume of the rectangular prism with a length of 12 units, width of 9 units, and height of 4 units is 12 x 9 x 4 = 432 cubic units.