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Answer

a) \({8~cm}^3\)

b) There are two layers of nine cubes, so the volume is \({18~cm}^3\).

Answer

\({11~cm^3}\)

Answer

The volume is \(\text{48 cm}^3\)

Remember that \(volume = length \times width \times height\), so in this example the volume is \({4~cm}\times{2~cm}\times{6~cm}={48}~cm^{3}\).

Answer

a) \(volume = area~of~triangle \times length\) \(=(\frac{1}{2}\times{2~cm}\times{5~cm})\times{4~cm}\)

\(= \text{20 cm}^3\)

b) The area of the cross section is \(\text{5 cm}^2\) and the length is \(\text{8 cm}\), so the volume is \({5~cm}^{2}\times{8~cm}={40~cm}^{3}\).

Remember that the volume is:

\(the~area~of~the~cross~section\times the~length\)

Answer

Each cube is \({1}~{cm}^{3}\) so the total volume is \({16}~{cm}^{3}\).

Answer

Two layers of \({9}~{cm}^{3}\) gives a total of \({18}~{cm}^{3}\)

Answer

The volume of a cube \(={length}\times{width}\times{height}\), so \({3}~{cm}\times{3}~{cm}\times{3}~{cm}={27}~{cm}^{3}\).

Answer

The volume of a cuboid \(={length}\times{width}\times{height}\), so \({9}~{cm}\times{13}~{cm}\times{6}~{cm}={162}~{cm}^{3}\).

Answer

The volume of a cuboid \(={length}\times{width}\times{height}\), so \({8}~{cm}\times{14}~{cm}\times{5}~{cm}={560}~{cm}^{3}\).

Answer

\({Length}={volume~of~cuboid}\div{({width}\times{height})}\), so \({200}~{cm}^{3}\div({10}~{cm}\times{5}~{cm})={4}~{cm}\).

Answer

When rearranging remember that \({height}={volume~of~cuboid}\div{({length}\times{width})}\), so \({504}~{cm}^{3}\div{({9}~{cm}\times{8}~{cm})}={7}~{cm}\).

Answer

The \(\text{volume~of~a~prism}=\text{area~of~cross-section}\times\text{length}\), so \({16}~{cm}^{2}\times{8}~{cm}={128}~{cm}^{3}\).

Answer

The \(\text{volume~of~a~prism}=\text{area~of~cross-section}\times\text{length}\), so \({(\frac{1}{2}\times{7}~{cm}\times{5}~{cm})}\times{12}~{cm}={210}~{cm}^{3}\).

Answer

When rearranging remember that the \(\text{area~of~a~cross-section}=\text{volume~of~prism}\div\text{length}\), so \({432}~{cm}^{3}\div{9}~{cm}={48}~{cm}^{2}\).