Respuesta :
We need to facto the trinomial:
[tex]81a^2+153a-18[/tex]Notice that the first term can be factored as:
[tex](9a)(9a)[/tex]Thus, one possible way of factoring the trinomial is:
[tex](9a+?)(9a+??)[/tex]When we multiply the terms represented by "?" and "??", we need to obtain -18. Thus, we need to factor -18 and try each pair of possible factors.
We have:
[tex]\text{factors of -18: }\pm1,\pm2,\pm3,\pm6,\pm18[/tex]Notice that:
[tex]\begin{gathered} (9a+?)(9a+??)=81a^2+9a(?)+9a(??)+(?)(??) \\ \\ (9a+?)(9a+??)=81a^2+9a(?+??)+(?)(??) \end{gathered}[/tex]Then, the pair of factors of -18 must satisfy:
[tex]\begin{gathered} (?)(??)=-18 \\ \\ 9a(?+??)=153a \\ 9(?+??)=153 \\ (?+??)=\frac{153}{9} \\ (?+??)=17 \end{gathered}[/tex]One possible pair of factors of -18, whose sum is 17, is: -1 and 18.
Using those numbers, we obtain:
[tex]\begin{gathered} (9a+?)(9a+??) \\ \\ (9a-1)(9a+18) \\ \\ 81a^2+9\cdot18a-9a-18 \\ \\ 81a^2+162a-9a-18 \\ \\ 81a^2+153a-18 \end{gathered}[/tex]Then, we see that:
[tex](9a-1)(9a+18)[/tex]is a way of factoring the given trinomial. Notice, though, that terms of the second factor can both be divided by 9. Then, we can write the expression as:
[tex]9a+18=9(a+2)[/tex]Then, the trinomial can be factored as:
[tex]9(9a-1)(a+2)[/tex]