Resposta:
c) 180
Explicação passo a passo:
x(2x+1)¹⁰
termo geral da expansão binomial:
Para [tex](a+b)^{n}[/tex]:
[tex]T_{k+1} = (\left \ {{n} \atop {k}} \right. )a^{n-k} b^{k}[/tex]
[tex]T_{k+1} = x.(\left \ {{10} \atop {k}} \right. )(2x)^{10-k} .(1)^{k}[/tex]
[tex]T_{k+1} = x.(\left \ {{10} \atop {k}} \right. )(2)^{10-k}.(x)^{10-k} .1[/tex]
[tex]T_{k+1} = (\left \ {{10} \atop {k}} \right. )(2)^{10-k}.(x)^{11-k}[/tex]
Para x³:
11 - k = 3
k = 11 - 3
k = 8
[tex]T_{8+1} = (\left \ {{10} \atop {8}} \right. )(2)^{10-8}.(x)^{11-8}[/tex]
[tex]T_{9} = (\left \ {{10} \atop {8}} \right. )2^{2}.x^{3}[/tex]
[tex]T_{9} = \frac{10!}{8!.2!}. 2^{2}.x^{3}[/tex]
[tex]T_{9} = \frac{10!}{8!.2!}. 4.x^{3}[/tex]
[tex]T_{9} = 45. 4.x^{3}[/tex]
[tex]T_{9} = 180x^{3}[/tex]
Para ax³:
a = coeficiente.
a = 180
