Answer:
The correct option is 2.
Step-by-step explanation:
Given information: Height of both prism are same.
Right rectangular prism has base dimensions of 3 inches by 12 inches.
Volume of a right rectangular prism:
[tex]V=Bh[/tex]
where, B is base area and h is height of the prism.
The volume of right rectangular prism is
[tex]V=(3\times 12)\times h=36h[/tex]
Therefore the volume of right rectangular prism is 36h cubic inches.
An oblique rectangular prism has base dimensions of 4 inches by 9 inches.
Volume of a oblique rectangular prism:
[tex]V=Bh[/tex]
where, B is base area and h is height of the prism.
The volume of right rectangular prism is
[tex]V=(4\times 9)\times h=36h[/tex]
Therefore the volume of oblique rectangular prism is 36h cubic inches.
The volumes are equal, because the heights are equal and the horizontal cross-sectional areas at every level are also equal.
Option 2 is correct .
Answer:
B) The volumes are equal, because the heights are equal and the horizontal cross-sectional areas at every level are also equal.
Step-by-step explanation:
