We need to determine the volume of each of the given rectangular prisms.
We know that the volume V of a rectangular prism with dimensions a, b, and c is given by:
[tex]V=a\cdot b\cdot c[/tex]
Thus, to find the volume of each rectangular prism, we need to multiply its dimensions.
We obtain:
[tex]\begin{gathered} 4in,3in,6in\Rightarrow V=4in\cdot3in\cdot6in=(4\cdot3\cdot6)(in\cdot in\cdot in)=72in^{3} \\ \\ 6in,3in,2in\Rightarrow V=6in\cdot3in\cdot2in=(6\cdot3\cdot2)in^{3}=36in^{3} \\ \\ 4in,5in,4in\Rightarrow V=4in\cdot5in\cdot4in=(4\cdot5\cdot4)_{}in^{3}=80in^{3} \\ \\ 2in,9in,3in\Rightarrow V=2in\cdot9in\cdot3in=(2\cdot9\cdot3)in^{3}=54in^{3} \end{gathered}[/tex]
Therefore, dragging each volume to its respective place, we obtain:
