Answer:
[tex]\boxed {\boxed {\sf (4x-9)(x-1)}}[/tex]
Step-by-step explanation:
There are many ways to factor a trinomial like the one given, but I am going to use the AC Method.
[tex]4x^2 -13x+9[/tex]
This trinomial is in standard form, with the highest exponent listed first or (ax² +bx +c). If we match the value in the trinomial with the corresponding variable we see that:
First, we find the product of a and c.
Next, we find what numbers multiply to 36 or (a*c) and add to b or -13. Remember that 2 negative numbers multiply to be a positive number. We will use -4 and -9.
- -4 * -9 = 36
- -4 + -9 = -13
Break up the second term of the trinomial into the 2 new numbers.
[tex]4x^2 -4x -9x+9[/tex]
Create 2 binomials.
[tex](4x^2-4x) + (-9x+9)[/tex]
Factor the greatest common factor out of both binomials. For the first, the GCF is 4x. For the second, the GCF is -9.
[tex]4x(x-1) + (-9x+9)[/tex]
[tex]4x(x-1)+ -9 (x-1)[/tex]
Both terms contain the binomial (x-1), so we can factor it out.
[tex](4x-9)(x-1)[/tex]
The trinomial 4x²-13x+9 is (4x-9)(x-1) when factored completely.
