Answer:
Solving the expression: [tex]4(8(a+g)+2z)[/tex] we get [tex]\mathbf{32a+32g+8z}[/tex]
Step-by-step explanation:
We need to solve the expression: [tex]4(8(a+g)+2z)[/tex]
First we will multiply 8 with terms inside the bracket
[tex]4(8(a+g)+2z) \\=4(8a+8g+2z)[/tex]
The terms inside the bracket are not like terms so, we will simply multiply 4 with terms inside the bracket.
[tex]=4(8a+8g+2z)\\=32a+32g+8z[/tex]
So, solving the expression: [tex]4(8(a+g)+2z)[/tex] we get [tex]\mathbf{32a+32g+8z}[/tex]
