The rule of the volume of the rectangular prism is
[tex]V=L\times W\times H[/tex]
L is the length
W is the width
H is the height
From the attached picture we can see
L = (2x - 3)
W = (x + 1)
H = (3x + 4)
We will substitute them in the rule above
[tex]V=(2x-3)(x+1)(3x+4)[/tex]
We will multiply the first 2 brackets, then multiply the answer by the 3rd bracket
[tex]\begin{gathered} (2x-3)(x+1)=(2x)(x)+(2x)(1)+(-3)(x)+(-3)(1) \\ (2x-3)(x+1)=2x^2+2x-3x-3 \\ (2x-3)(x+1)=2x^2-x-3 \end{gathered}[/tex]
Multiply this answer by the 3rd bracket
[tex]\begin{gathered} (2x^2-x-3)(3x+4)= \\ \left(2x^2\right)\left(3x\right)+\left(2x^2\right)\left(4\right)+\left(-x\right)(3x)+(-x)(4)+(-3)(3x)+(-3)(4)= \\ 6x^3+8x^2-3x^2-4x-9x-12= \\ 6x^3+5x^2-13x-12 \end{gathered}[/tex]
Then the volume of the prism is
[tex]V=6x^3+5x^2-13x-12[/tex]
The answer is the 2nd choice
