Answer:
[tex]\boxed{\sf \ \ 9x^2-18x-7 \ \ divided \ by \ (3x+1) \ is \ (3x-7) \ }[/tex]
Step-by-step explanation:
Hello,
let's find a and b reals so that
[tex]9x^2-18x-7=(3x+1)(ax+b)[/tex]
[tex](3x+1)(ax+b)=3ax^2+(3b+a)x+b[/tex]
we identify the terms in [tex]x^2[/tex]
9 = 3a
we identify the terms in x
-18 = 3b + a
we identify the constant terms
-7 = b
so ti goes with a = 9/3 = 3, b = -7
so we can write
[tex]9x^2-18x-7=(3x+1)(3x-7)[/tex]
so [tex]9x^2-18x-7 \ divided \ by \ (3x+1) \ is \ (3x-7)[/tex]
hope this helps
