Álgebra Exemplos

$\frac{4 x^{15} - 6 x^{2} - 5 x + 6}{x - 1}$

Etapa 1

Para calcular o resto, primeiro divida os polinômios.

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Etapa 1.1

Estabeleça os polinômios a serem divididos. Se não houver um termo para cada expoente, insira um com valor de $0$ .

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

Etapa 1.2

Divida o termo de ordem mais alta no dividendo $4 x^{15}$ pelo termo de ordem mais alta no divisor $x$ .

$4 x^{14}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

Etapa 1.3

Multiplique o novo termo do quociente pelo divisor.

$4 x^{14}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

Etapa 1.4

A expressão precisa ser subtraída do dividendo. Portanto, altere todos os sinais em $4 x^{15} - 4 x^{14}$ .

$4 x^{14}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

Etapa 1.5

Depois de alterar os sinais, some o último dividendo do polinômio multiplicado para encontrar o novo dividendo.

$4 x^{14}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

Etapa 1.6

Tire os próximos termos do dividendo original e os coloque no dividendo atual.

$4 x^{14}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

Etapa 1.7

Divida o termo de ordem mais alta no dividendo $4 x^{14}$ pelo termo de ordem mais alta no divisor $x$ .

$4 x^{14}$

$4 x^{13}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

Etapa 1.8

Multiplique o novo termo do quociente pelo divisor.

$4 x^{14}$

$4 x^{13}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

Etapa 1.9

A expressão precisa ser subtraída do dividendo. Portanto, altere todos os sinais em $4 x^{14} - 4 x^{13}$ .

$4 x^{14}$

$4 x^{13}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

Etapa 1.10

Depois de alterar os sinais, some o último dividendo do polinômio multiplicado para encontrar o novo dividendo.

$4 x^{14}$

$4 x^{13}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

Etapa 1.11

Tire os próximos termos do dividendo original e os coloque no dividendo atual.

$4 x^{14}$

$4 x^{13}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

Etapa 1.12

Divida o termo de ordem mais alta no dividendo $4 x^{13}$ pelo termo de ordem mais alta no divisor $x$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

Etapa 1.13

Multiplique o novo termo do quociente pelo divisor.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

Etapa 1.14

A expressão precisa ser subtraída do dividendo. Portanto, altere todos os sinais em $4 x^{13} - 4 x^{12}$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

Etapa 1.15

Depois de alterar os sinais, some o último dividendo do polinômio multiplicado para encontrar o novo dividendo.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

Etapa 1.16

Tire os próximos termos do dividendo original e os coloque no dividendo atual.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

Etapa 1.17

Divida o termo de ordem mais alta no dividendo $4 x^{12}$ pelo termo de ordem mais alta no divisor $x$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

Etapa 1.18

Multiplique o novo termo do quociente pelo divisor.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

Etapa 1.19

A expressão precisa ser subtraída do dividendo. Portanto, altere todos os sinais em $4 x^{12} - 4 x^{11}$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

Etapa 1.20

Depois de alterar os sinais, some o último dividendo do polinômio multiplicado para encontrar o novo dividendo.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

Etapa 1.21

Tire os próximos termos do dividendo original e os coloque no dividendo atual.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

Etapa 1.22

Divida o termo de ordem mais alta no dividendo $4 x^{11}$ pelo termo de ordem mais alta no divisor $x$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

Etapa 1.23

Multiplique o novo termo do quociente pelo divisor.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

Etapa 1.24

A expressão precisa ser subtraída do dividendo. Portanto, altere todos os sinais em $4 x^{11} - 4 x^{10}$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

Etapa 1.25

Depois de alterar os sinais, some o último dividendo do polinômio multiplicado para encontrar o novo dividendo.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

Etapa 1.26

Tire os próximos termos do dividendo original e os coloque no dividendo atual.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

Etapa 1.27

Divida o termo de ordem mais alta no dividendo $4 x^{10}$ pelo termo de ordem mais alta no divisor $x$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

Etapa 1.28

Multiplique o novo termo do quociente pelo divisor.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

Etapa 1.29

A expressão precisa ser subtraída do dividendo. Portanto, altere todos os sinais em $4 x^{10} - 4 x^{9}$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

Etapa 1.30

Depois de alterar os sinais, some o último dividendo do polinômio multiplicado para encontrar o novo dividendo.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

Etapa 1.31

Tire os próximos termos do dividendo original e os coloque no dividendo atual.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

Etapa 1.32

Divida o termo de ordem mais alta no dividendo $4 x^{9}$ pelo termo de ordem mais alta no divisor $x$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

Etapa 1.33

Multiplique o novo termo do quociente pelo divisor.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

Etapa 1.34

A expressão precisa ser subtraída do dividendo. Portanto, altere todos os sinais em $4 x^{9} - 4 x^{8}$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

Etapa 1.35

Depois de alterar os sinais, some o último dividendo do polinômio multiplicado para encontrar o novo dividendo.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

Etapa 1.36

Tire os próximos termos do dividendo original e os coloque no dividendo atual.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

Etapa 1.37

Divida o termo de ordem mais alta no dividendo $4 x^{8}$ pelo termo de ordem mais alta no divisor $x$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

Etapa 1.38

Multiplique o novo termo do quociente pelo divisor.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

Etapa 1.39

A expressão precisa ser subtraída do dividendo. Portanto, altere todos os sinais em $4 x^{8} - 4 x^{7}$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

Etapa 1.40

Depois de alterar os sinais, some o último dividendo do polinômio multiplicado para encontrar o novo dividendo.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

Etapa 1.41

Tire os próximos termos do dividendo original e os coloque no dividendo atual.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

Etapa 1.42

Divida o termo de ordem mais alta no dividendo $4 x^{7}$ pelo termo de ordem mais alta no divisor $x$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

Etapa 1.43

Multiplique o novo termo do quociente pelo divisor.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

Etapa 1.44

A expressão precisa ser subtraída do dividendo. Portanto, altere todos os sinais em $4 x^{7} - 4 x^{6}$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

Etapa 1.45

Depois de alterar os sinais, some o último dividendo do polinômio multiplicado para encontrar o novo dividendo.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

Etapa 1.46

Tire os próximos termos do dividendo original e os coloque no dividendo atual.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

Etapa 1.47

Divida o termo de ordem mais alta no dividendo $4 x^{6}$ pelo termo de ordem mais alta no divisor $x$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

Etapa 1.48

Multiplique o novo termo do quociente pelo divisor.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

Etapa 1.49

A expressão precisa ser subtraída do dividendo. Portanto, altere todos os sinais em $4 x^{6} - 4 x^{5}$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

Etapa 1.50

Depois de alterar os sinais, some o último dividendo do polinômio multiplicado para encontrar o novo dividendo.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

Etapa 1.51

Tire os próximos termos do dividendo original e os coloque no dividendo atual.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

Etapa 1.52

Divida o termo de ordem mais alta no dividendo $4 x^{5}$ pelo termo de ordem mais alta no divisor $x$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

Etapa 1.53

Multiplique o novo termo do quociente pelo divisor.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

Etapa 1.54

A expressão precisa ser subtraída do dividendo. Portanto, altere todos os sinais em $4 x^{5} - 4 x^{4}$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

Etapa 1.55

Depois de alterar os sinais, some o último dividendo do polinômio multiplicado para encontrar o novo dividendo.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

Etapa 1.56

Tire os próximos termos do dividendo original e os coloque no dividendo atual.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

Etapa 1.57

Divida o termo de ordem mais alta no dividendo $4 x^{4}$ pelo termo de ordem mais alta no divisor $x$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

Etapa 1.58

Multiplique o novo termo do quociente pelo divisor.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

$4 x^{4}$

$4 x^{3}$

Etapa 1.59

A expressão precisa ser subtraída do dividendo. Portanto, altere todos os sinais em $4 x^{4} - 4 x^{3}$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

$4 x^{4}$

$4 x^{3}$

Etapa 1.60

Depois de alterar os sinais, some o último dividendo do polinômio multiplicado para encontrar o novo dividendo.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

$4 x^{4}$

$4 x^{3}$

Etapa 1.61

Tire os próximos termos do dividendo original e os coloque no dividendo atual.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

$4 x^{4}$

$4 x^{3}$

$6 x^{2}$

Etapa 1.62

Divida o termo de ordem mais alta no dividendo $4 x^{3}$ pelo termo de ordem mais alta no divisor $x$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$4 x^{2}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

$4 x^{4}$

$4 x^{3}$

$6 x^{2}$

Etapa 1.63

Multiplique o novo termo do quociente pelo divisor.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$4 x^{2}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

$4 x^{4}$

$4 x^{3}$

$6 x^{2}$

$4 x^{3}$

$4 x^{2}$

Etapa 1.64

A expressão precisa ser subtraída do dividendo. Portanto, altere todos os sinais em $4 x^{3} - 4 x^{2}$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$4 x^{2}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

$4 x^{4}$

$4 x^{3}$

$6 x^{2}$

$4 x^{3}$

$4 x^{2}$

Etapa 1.65

Depois de alterar os sinais, some o último dividendo do polinômio multiplicado para encontrar o novo dividendo.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$4 x^{2}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

$4 x^{4}$

$4 x^{3}$

$6 x^{2}$

$4 x^{3}$

$4 x^{2}$

$2 x^{2}$

Etapa 1.66

Tire os próximos termos do dividendo original e os coloque no dividendo atual.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$4 x^{2}$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

$4 x^{4}$

$4 x^{3}$

$6 x^{2}$

$4 x^{3}$

$4 x^{2}$

$2 x^{2}$

$5 x$

Etapa 1.67

Divida o termo de ordem mais alta no dividendo $- 2 x^{2}$ pelo termo de ordem mais alta no divisor $x$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$4 x^{2}$

$2 x$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

$4 x^{4}$

$4 x^{3}$

$6 x^{2}$

$4 x^{3}$

$4 x^{2}$

$2 x^{2}$

$5 x$

Etapa 1.68

Multiplique o novo termo do quociente pelo divisor.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$4 x^{2}$

$2 x$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

$4 x^{4}$

$4 x^{3}$

$6 x^{2}$

$4 x^{3}$

$4 x^{2}$

$2 x^{2}$

$5 x$

$2 x^{2}$

$2 x$

Etapa 1.69

A expressão precisa ser subtraída do dividendo. Portanto, altere todos os sinais em $- 2 x^{2} + 2 x$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$4 x^{2}$

$2 x$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

$4 x^{4}$

$4 x^{3}$

$6 x^{2}$

$4 x^{3}$

$4 x^{2}$

$2 x^{2}$

$5 x$

$2 x^{2}$

$2 x$

Etapa 1.70

Depois de alterar os sinais, some o último dividendo do polinômio multiplicado para encontrar o novo dividendo.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$4 x^{2}$

$2 x$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

$4 x^{4}$

$4 x^{3}$

$6 x^{2}$

$4 x^{3}$

$4 x^{2}$

$2 x^{2}$

$5 x$

$2 x^{2}$

$2 x$

$7 x$

Etapa 1.71

Tire os próximos termos do dividendo original e os coloque no dividendo atual.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$4 x^{2}$

$2 x$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

$4 x^{4}$

$4 x^{3}$

$6 x^{2}$

$4 x^{3}$

$4 x^{2}$

$2 x^{2}$

$5 x$

$2 x^{2}$

$2 x$

$7 x$

$6$

Etapa 1.72

Divida o termo de ordem mais alta no dividendo $- 7 x$ pelo termo de ordem mais alta no divisor $x$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$4 x^{2}$

$2 x$

$7$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

$4 x^{4}$

$4 x^{3}$

$6 x^{2}$

$4 x^{3}$

$4 x^{2}$

$2 x^{2}$

$5 x$

$2 x^{2}$

$2 x$

$7 x$

$6$

Etapa 1.73

Multiplique o novo termo do quociente pelo divisor.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$4 x^{2}$

$2 x$

$7$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

$4 x^{4}$

$4 x^{3}$

$6 x^{2}$

$4 x^{3}$

$4 x^{2}$

$2 x^{2}$

$5 x$

$2 x^{2}$

$2 x$

$7 x$

$6$

$7 x$

$7$

Etapa 1.74

A expressão precisa ser subtraída do dividendo. Portanto, altere todos os sinais em $- 7 x + 7$ .

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$4 x^{2}$

$2 x$

$7$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

$4 x^{4}$

$4 x^{3}$

$6 x^{2}$

$4 x^{3}$

$4 x^{2}$

$2 x^{2}$

$5 x$

$2 x^{2}$

$2 x$

$7 x$

$6$

$7 x$

$7$

Etapa 1.75

Depois de alterar os sinais, some o último dividendo do polinômio multiplicado para encontrar o novo dividendo.

$4 x^{14}$

$4 x^{13}$

$4 x^{12}$

$4 x^{11}$

$4 x^{10}$

$4 x^{9}$

$4 x^{8}$

$4 x^{7}$

$4 x^{6}$

$4 x^{5}$

$4 x^{4}$

$4 x^{3}$

$4 x^{2}$

$2 x$

$7$

$x$

$1$

$4 x^{15}$

$0 x^{14}$

$0 x^{13}$

$0 x^{12}$

$0 x^{11}$

$0 x^{10}$

$0 x^{9}$

$0 x^{8}$

$0 x^{7}$

$0 x^{6}$

$0 x^{5}$

$0 x^{4}$

$0 x^{3}$

$6 x^{2}$

$5 x$

$6$

$4 x^{15}$

$4 x^{14}$

$0 x^{13}$

$4 x^{14}$

$4 x^{13}$

$0 x^{12}$

$4 x^{13}$

$4 x^{12}$

$0 x^{11}$

$4 x^{12}$

$4 x^{11}$

$0 x^{10}$

$4 x^{11}$

$4 x^{10}$

$0 x^{9}$

$4 x^{10}$

$4 x^{9}$

$0 x^{8}$

$4 x^{9}$

$4 x^{8}$

$0 x^{7}$

$4 x^{8}$

$4 x^{7}$

$0 x^{6}$

$4 x^{7}$

$4 x^{6}$

$0 x^{5}$

$4 x^{6}$

$4 x^{5}$

$0 x^{4}$

$4 x^{5}$

$4 x^{4}$

$0 x^{3}$

$4 x^{4}$

$4 x^{3}$

$6 x^{2}$

$4 x^{3}$

$4 x^{2}$

$2 x^{2}$

$5 x$

$2 x^{2}$

$2 x$

$7 x$

$6$

$7 x$

$7$

$1$

Etapa 1.76

A resposta final é o quociente mais o resto sobre o divisor.

$4 x^{14} + 4 x^{13} + 4 x^{12} + 4 x^{11} + 4 x^{10} + 4 x^{9} + 4 x^{8} + 4 x^{7} + 4 x^{6} + 4 x^{5} + 4 x^{4} + 4 x^{3} + 4 x^{2} - 2 x - 7 - \frac{1}{x - 1}$

Etapa 2

Como o último termo na expressão resultante é uma fração, o numerador da fração é o resto.

$- 1$