Convert \({20}~{cm}^{2}\) into \({mm}^{2}\).
\[{200}~{mm}^{2}\]
\[{400}~{mm}^{2}\]
\[{2,000}~{mm}^{2}\]
How many \({cm}^{3}\) are there in \({1}~{m}^{3}\)?
\[{100}\]
\[{10,000}\]
\[{1,000,000}\]
What is the volume in \(m^{3}\) of a cuboid with length \({50}~{cm}\) breadth \({4}~{m}\) and height \({3.25}~{m}\)?
\[{6.5}~{m}^{3}\]
\[{5.5}~{m}^{3}\]
\[{2.5}~{m}^{3}\]
Which of these statements is correct?
\[1,250\,mm^{2} = 1.25\,cm^{2}\]
\[1,250\,mm^{2} = 12.5\,cm^{2}\]
\[1,250\,mm^{2} = 125\,cm^{2}\]
What is \(4.6 m^{2}\) converted into \(cm^{2}\)?
\[46,000\,cm^{2}\]
\[4,600\,cm^{2}\]
\[460\,cm^{2}\]
If a rectangle measures \(6\,cm\) by \(12\,mm\) what would be the appropriate way to calculate the area?
Multiply the length by the breadth and then write your answer as a mix of \(cm\) and \(mm\).
Make the units the same, then multiply length by breadth to get the area.
Multiply length by breadth then pick which unit to show the answer in.
What is the area of the rectangle measuring \(6\,cm\) by \(12\,mm\)? Give your answer in \(cm^{2}\).
\[72\,cm^{2}\]
\[7.2\,cm^{2}\]
\[0.72\,cm^{2}\]
Find the area of a rectangle which has a length of \(62\,cm\) and a breadth of \(0.25\,m\).
\[15.5\,cm^{2}\]
\[1.55\,m^{2}\]
\[0.155\,m^{2}\]
Calculate the area of the triangle shown in \(m\) to two decimal places.
\[1.01\,m^{2}\]
\[0.73\,m^{2}\]
\[0.37\,m^{2}\]
Calculate the volume of this cuboid in \(cm\).
\[2,695,680\,cm^{3}\]
\[269,568\,cm^{3}\]
\[26,956.8\,cm^{3}\]