Answer:
Choice A) a² - 9a - 11.
Step-by-step explanation:
Separate the terms by the power of the variable, [tex]a[/tex].
Terms with power 2 on [tex]a[/tex]:
Terms with power 1 on [tex]a[/tex]:
Terms with power 0 on [tex]a[/tex], which are also known as constant terms:
Apply the distributive property of multiplication in reverse. In other words, factor out terms with the same power and add the coefficients.
Terms with power 2 on [tex]a[/tex]:
[tex]6a^{2} + (-5a^{2}) = (6 + (-5))a^{2} = a^{2}[/tex].
Terms with power 1 on [tex]a[/tex]:
[tex]-17 a + 8a = ((-17) + 8)a = -9a[/tex].
Constant terms:
[tex](-9) + (-2) = -11[/tex].
Add the sum of the individual terms to find the sum of the two polynomials:
[tex]a^{2} + (- 9a) +(- 11) = a^{2}-9a -11[/tex].
