Explanation:
Linear escale factor 1.
In this case the original volume of the parallelepiped is:
[tex]Volume=4*2*3=24\text{ u}^3[/tex]
24 cubic units and the new volume must be:
[tex]NewVolume=\left(4*1\right)\left(2*1\right)\left(3*1\right)=24u^3[/tex]
So in this case the ratio of volumes is 1:1
Linear escale factor 2.
In this case the original volume of the parallelepiped is the same: 24 cubic units.
The new voume must be:
[tex]NewVolume=\left(4*2\right)\left(2*2\right)\left(3*2\right)=8*4*6=192u^3[/tex]
So in this case the ratio of volumes is 24:192, that is 1:8
Linear escale factor 3.
In this case the original volume of the parallelepiped is the same: 24 cubic units.
The new voume must be:
[tex]NewVolume=(4\times3)(2\times3)(3\times3)=12*6*9=648u^3[/tex]
So in this case the ratio of volumes is 24:648, that is 1:27
Linear escale factor 4.
In this case the original volume of the parallelepiped is the same: 24 cubic units.
The new voume must be:
[tex]NewVolume=(4\times4)(2\times4)(3\times4)=16\times8\times12=1536u^3[/tex]
So in this case the ratio of volumes is 24:1536, that is 1:64
Linear escale factor r.
In this case the original volume of the parallelepiped is the same: 24 cubic units.
The new voume must be:
[tex]NewVolume=(4*r)(2*r)(3*r)=4r\times2r\times3r=24r^3\text{ }u^3[/tex]
So in this case the ratio of volumes is 24:24r^3, that is:
[tex]1:r^3[/tex]
