The length of the block is the length of the sides of three cubes from the prism shown.
![\begin{gathered} \text{Length of one side of cube =1cm} \\ \text{Length of the sides of three cubes=3}\ast1cm=3\operatorname{cm} \end{gathered}]()
Thus the length of the prism is 3cm.
The width of the block is the length of the sides of three cubes.
![\text{ wi}\differentialD tth\text{ of sides of three cubes}=3\ast1cm=3\operatorname{cm}]()
Width is 3 cm
Height is length of sides of 4 cubes.
![\text{Height =4}\ast1\operatorname{cm}=4\operatorname{cm}]()
B. Product of height , width and length is
![\text{lbh}=3\ast3\ast4=36\operatorname{cm}^3]()
C. There are 36 cubic centimeters in the block, since the volume or lbh is 36 cubic centimeters.