将 $$$x^{3}$$$ 除以 $$$x - 1$$$
您的输入
使用长除法计算$$$\frac{x^{3}}{x - 1}$$$。
解答
将题目写成特殊格式(缺失项写为零系数):
$$$\begin{array}{r|r}\hline\\x-1&x^{3}+0 x^{2}+0 x+0\end{array}$$$
步骤 1
将被除式的首项除以除式的首项: $$$\frac{x^{3}}{x} = x^{2}$$$.
将计算结果写在表格的上部。
将其乘以除数:$$$x^{2} \left(x-1\right) = x^{3}- x^{2}$$$。
从得到的结果中减去被除数:$$$\left(x^{3}\right) - \left(x^{3}- x^{2}\right) = x^{2}$$$
$$\begin{array}{r|rrrr:c}&{\color{Violet}x^{2}}&&&&\\\hline\\{\color{Magenta}x}-1&{\color{Violet}x^{3}}&+0 x^{2}&+0 x&+0&\frac{{\color{Violet}x^{3}}}{{\color{Magenta}x}} = {\color{Violet}x^{2}}\\&-\phantom{x^{3}}&&&&\\&x^{3}&- x^{2}&&&{\color{Violet}x^{2}} \left(x-1\right) = x^{3}- x^{2}\\\hline\\&&x^{2}&+0 x&+0&\end{array}$$步骤 2
将所得余式的首项除以除式的首项: $$$\frac{x^{2}}{x} = x$$$
将计算结果写在表格的上部。
将其乘以除数:$$$x \left(x-1\right) = x^{2}- x$$$。
从得到的结果中减去余数:$$$\left(x^{2}\right) - \left(x^{2}- x\right) = x$$$
$$\begin{array}{r|rrrr:c}&x^{2}&{\color{Fuchsia}+x}&&&\\\hline\\{\color{Magenta}x}-1&x^{3}&+0 x^{2}&+0 x&+0&\\&-\phantom{x^{3}}&&&&\\&x^{3}&- x^{2}&&&\\\hline\\&&{\color{Fuchsia}x^{2}}&+0 x&+0&\frac{{\color{Fuchsia}x^{2}}}{{\color{Magenta}x}} = {\color{Fuchsia}x}\\&&-\phantom{x^{2}}&&&\\&&x^{2}&- x&&{\color{Fuchsia}x} \left(x-1\right) = x^{2}- x\\\hline\\&&&x&+0&\end{array}$$步骤 3
将所得余式的首项除以除式的首项: $$$\frac{x}{x} = 1$$$
将计算结果写在表格的上部。
将其乘以除数:$$$1 \left(x-1\right) = x-1$$$。
从得到的结果中减去余数:$$$\left(x\right) - \left(x-1\right) = 1$$$
$$\begin{array}{r|rrrr:c}&x^{2}&+x&{\color{Green}+1}&&\\\hline\\{\color{Magenta}x}-1&x^{3}&+0 x^{2}&+0 x&+0&\\&-\phantom{x^{3}}&&&&\\&x^{3}&- x^{2}&&&\\\hline\\&&x^{2}&+0 x&+0&\\&&-\phantom{x^{2}}&&&\\&&x^{2}&- x&&\\\hline\\&&&{\color{Green}x}&+0&\frac{{\color{Green}x}}{{\color{Magenta}x}} = {\color{Green}1}\\&&&-\phantom{x}&&\\&&&x&-1&{\color{Green}1} \left(x-1\right) = x-1\\\hline\\&&&&1&\end{array}$$由于余式的次数小于除式的次数,故除法完成。
所得表格再次显示如下:
$$\begin{array}{r|rrrr:c}&{\color{Violet}x^{2}}&{\color{Fuchsia}+x}&{\color{Green}+1}&&\text{提示}\\\hline\\{\color{Magenta}x}-1&{\color{Violet}x^{3}}&+0 x^{2}&+0 x&+0&\frac{{\color{Violet}x^{3}}}{{\color{Magenta}x}} = {\color{Violet}x^{2}}\\&-\phantom{x^{3}}&&&&\\&x^{3}&- x^{2}&&&{\color{Violet}x^{2}} \left(x-1\right) = x^{3}- x^{2}\\\hline\\&&{\color{Fuchsia}x^{2}}&+0 x&+0&\frac{{\color{Fuchsia}x^{2}}}{{\color{Magenta}x}} = {\color{Fuchsia}x}\\&&-\phantom{x^{2}}&&&\\&&x^{2}&- x&&{\color{Fuchsia}x} \left(x-1\right) = x^{2}- x\\\hline\\&&&{\color{Green}x}&+0&\frac{{\color{Green}x}}{{\color{Magenta}x}} = {\color{Green}1}\\&&&-\phantom{x}&&\\&&&x&-1&{\color{Green}1} \left(x-1\right) = x-1\\\hline\\&&&&1&\end{array}$$因此,$$$\frac{x^{3}}{x - 1} = \left(x^{2} + x + 1\right) + \frac{1}{x - 1}$$$。
答案
$$$\frac{x^{3}}{x - 1} = \left(x^{2} + x + 1\right) + \frac{1}{x - 1}$$$A