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Part1

Volume of cylindrical container

V = $\\pi r^2h$

$\\pi \\times (\\frac{\\var{size1[0]}}{2})^2 \\times \\var{size2[0]} = \\var{ans1}$

Part2

Volume of conical container

V = $\\frac{1}{3}\\pi r^2h$

$\\frac{1}{3} \\times\\pi \\times (\\frac{\\var{size1[1]}}{2})^2 \\times \\var{size2[1]} = \\var{ans2}$

Part3

Volume of spherical container

V = $\\frac{4}{3}\\pi r^3$

$\\frac{4}{3} \\times\\pi \\times (\\frac{\\var{size1[2]}}{2})^3 = \\var{ans3}$

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Find the volume of a cylindrical container of height $\\var{size2[0]}cm$ and diameter $\\var{size1[0]}cm$.

[[0]] $cm^3$

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Don't forget to use the radius rather than the diameter.

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Calculate the volume of a conical container of perpendicular height $\\var{size2[1]}cm$ and diameter $\\var{size1[1]}cm$.

[[0]] $cm^3$

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Find the volume of a spherical container of diameter $\\var{size1[2]}cm$.

[[0]] $cm^3$

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Calculating the volumes of different containers

rebelmaths

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Solve the following volume questions to 2 decimal places.

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