Answer:
B.[tex](9x^{2}+2x-7)(x)+(9x^{2}+2x-7)(-4)[/tex]
Step-by-step explanation:
Given two expressions between parentheses that are multiplying between them, we can find the equivalent expression if we distribute the terms between them. For example :
The expression [tex](a+b).(c+d)[/tex] is equivalent to
[tex](a+b).(c+d)=ac+ad+bc+bd[/tex] because we multiply the first element of the first expression (a+b) by the first element of the second expression (c+d) and then we sum the product between the first element of the expression (a+b) and the second element of the second expression (c+d).Then, we sum the product of the second element of the expression (a+b) and the first element of (c+d) and finally we sum the product of the second element of (a+b) and the second element of (c+d) in order to find the equivalent expression of (a+b).(c+d).
In the exercise :
[tex](9x^{2}+2x-7).(x-4)=(9x^{2})x+(9x^{2})(-4)+(2x)x+(2x)(-4)+(-7)x+(-7)(-4)[/tex]
Rearranging the expression we obtain :
[tex](9x^{2})x+(2x)x+(-7)x+(9x^{2})(-4)+(2x)(-4)+(-7)(-4)[/tex]
Factoring the expression :
[tex](9x^{2}+2x-7)(x)+(9x^{2}+2x-7)(-4)[/tex]
The correct answer is B.
