Explanation:
The expression is given below as
[tex]\frac{12x^2-27}{6x^2+33x+36}[/tex]
Step 1:
Simplify both the numerator and denominator
[tex]\begin{gathered} \frac{12x^{2}-27}{6x^{2}+33x+36} \\ 12x^2-27=3(4x^2-9)=3(2x-3)(2x+3) \\ 6x^2+33x+36=3(2x^2+11x+12) \\ 3(2x^2+11x+12)=3(2x^2+8x+3x+12) \\ 3(2x^2+11x+12)=3(2x(x+4)+3(x+4) \\ 3(2x^2+11x+12)=3(2x+3)(x+4) \end{gathered}[/tex]
By rewritng the expression , we will have
[tex]\begin{gathered} \frac{12x^{2}-27}{6x^{2}+33x+36}=\frac{3(2x+3)(2x-3)}{3(x+4)(2x+3)} \\ \frac{12x^{2}-27}{6x^{2}+33x+36}=\frac{2x-3}{x+4} \end{gathered}[/tex]
Hence,
The simplified expression will be
[tex]\frac{2x-3}{x+4}[/tex]
The variable restriction of the original expression will be
[tex]\begin{gathered} 3(2x+3)(x+4)=0 \\ 2x+3=0,x+4=0 \\ 2x=-3,x=-4 \\ x=-\frac{3}{2},x=-4 \end{gathered}[/tex]
Hence,
The variable restriction for the original expression will be
[tex]x\ne-\frac{3}{2},-4[/tex]
