Divide using synthetic division $$ ( x^{6}+7x-1 ) \div ( -3x+1 ) $$
Answer
The synthetic division table is:
$$ \begin{array}{c|rrrrrrr}-1&1&0&0&0&0&7&-1\\& & -1& 1& -1& 1& -1& \color{black}{-6} \\ \hline &\color{blue}{1}&\color{blue}{-1}&\color{blue}{1}&\color{blue}{-1}&\color{blue}{1}&\color{blue}{6}&\color{orangered}{-7} \end{array} $$The solution is:
$$ \frac{ x^{6}+7x-1 }{ x+1 } = \color{blue}{x^{5}-x^{4}+x^{3}-x^{2}+x+6} \color{red}{~-~} \frac{ \color{red}{ 7 } }{ x+1 } $$Explanation
Step 1 : Write down the coefficients of the dividend into division table. Put the zero from $ x + 1 = 0 $ ( $ x = \color{blue}{ -1 } $ ) at the left.
$$ \begin{array}{c|rrrrrrr}\color{blue}{-1}&1&0&0&0&0&7&-1\\& & & & & & & \\ \hline &&&&&&& \end{array} $$Step 1 : Bring down the leading coefficient to the bottom row.
$$ \begin{array}{c|rrrrrrr}-1&\color{orangered}{ 1 }&0&0&0&0&7&-1\\& & & & & & & \\ \hline &\color{orangered}{1}&&&&&& \end{array} $$Step 2 : Multiply by the number on the left, and carry the result into the next column: $ \color{blue}{ -1 } \cdot \color{blue}{ 1 } = \color{blue}{ -1 } $.
$$ \begin{array}{c|rrrrrrr}\color{blue}{-1}&1&0&0&0&0&7&-1\\& & \color{blue}{-1} & & & & & \\ \hline &\color{blue}{1}&&&&&& \end{array} $$Step 3 : Add down last column: $ \color{orangered}{ 0 } + \color{orangered}{ \left( -1 \right) } = \color{orangered}{ -1 } $
$$ \begin{array}{c|rrrrrrr}-1&1&\color{orangered}{ 0 }&0&0&0&7&-1\\& & \color{orangered}{-1} & & & & & \\ \hline &1&\color{orangered}{-1}&&&&& \end{array} $$Step 4 : Multiply by the number on the left, and carry the result into the next column: $ \color{blue}{ -1 } \cdot \color{blue}{ \left( -1 \right) } = \color{blue}{ 1 } $.
$$ \begin{array}{c|rrrrrrr}\color{blue}{-1}&1&0&0&0&0&7&-1\\& & -1& \color{blue}{1} & & & & \\ \hline &1&\color{blue}{-1}&&&&& \end{array} $$Step 5 : Add down last column: $ \color{orangered}{ 0 } + \color{orangered}{ 1 } = \color{orangered}{ 1 } $
$$ \begin{array}{c|rrrrrrr}-1&1&0&\color{orangered}{ 0 }&0&0&7&-1\\& & -1& \color{orangered}{1} & & & & \\ \hline &1&-1&\color{orangered}{1}&&&& \end{array} $$Step 6 : Multiply by the number on the left, and carry the result into the next column: $ \color{blue}{ -1 } \cdot \color{blue}{ 1 } = \color{blue}{ -1 } $.
$$ \begin{array}{c|rrrrrrr}\color{blue}{-1}&1&0&0&0&0&7&-1\\& & -1& 1& \color{blue}{-1} & & & \\ \hline &1&-1&\color{blue}{1}&&&& \end{array} $$Step 7 : Add down last column: $ \color{orangered}{ 0 } + \color{orangered}{ \left( -1 \right) } = \color{orangered}{ -1 } $
$$ \begin{array}{c|rrrrrrr}-1&1&0&0&\color{orangered}{ 0 }&0&7&-1\\& & -1& 1& \color{orangered}{-1} & & & \\ \hline &1&-1&1&\color{orangered}{-1}&&& \end{array} $$Step 8 : Multiply by the number on the left, and carry the result into the next column: $ \color{blue}{ -1 } \cdot \color{blue}{ \left( -1 \right) } = \color{blue}{ 1 } $.
$$ \begin{array}{c|rrrrrrr}\color{blue}{-1}&1&0&0&0&0&7&-1\\& & -1& 1& -1& \color{blue}{1} & & \\ \hline &1&-1&1&\color{blue}{-1}&&& \end{array} $$Step 9 : Add down last column: $ \color{orangered}{ 0 } + \color{orangered}{ 1 } = \color{orangered}{ 1 } $
$$ \begin{array}{c|rrrrrrr}-1&1&0&0&0&\color{orangered}{ 0 }&7&-1\\& & -1& 1& -1& \color{orangered}{1} & & \\ \hline &1&-1&1&-1&\color{orangered}{1}&& \end{array} $$Step 10 : Multiply by the number on the left, and carry the result into the next column: $ \color{blue}{ -1 } \cdot \color{blue}{ 1 } = \color{blue}{ -1 } $.
$$ \begin{array}{c|rrrrrrr}\color{blue}{-1}&1&0&0&0&0&7&-1\\& & -1& 1& -1& 1& \color{blue}{-1} & \\ \hline &1&-1&1&-1&\color{blue}{1}&& \end{array} $$Step 11 : Add down last column: $ \color{orangered}{ 7 } + \color{orangered}{ \left( -1 \right) } = \color{orangered}{ 6 } $
$$ \begin{array}{c|rrrrrrr}-1&1&0&0&0&0&\color{orangered}{ 7 }&-1\\& & -1& 1& -1& 1& \color{orangered}{-1} & \\ \hline &1&-1&1&-1&1&\color{orangered}{6}& \end{array} $$Step 12 : Multiply by the number on the left, and carry the result into the next column: $ \color{blue}{ -1 } \cdot \color{blue}{ 6 } = \color{blue}{ -6 } $.
$$ \begin{array}{c|rrrrrrr}\color{blue}{-1}&1&0&0&0&0&7&-1\\& & -1& 1& -1& 1& -1& \color{blue}{-6} \\ \hline &1&-1&1&-1&1&\color{blue}{6}& \end{array} $$Step 13 : Add down last column: $ \color{orangered}{ -1 } + \color{orangered}{ \left( -6 \right) } = \color{orangered}{ -7 } $
$$ \begin{array}{c|rrrrrrr}-1&1&0&0&0&0&7&\color{orangered}{ -1 }\\& & -1& 1& -1& 1& -1& \color{orangered}{-6} \\ \hline &\color{blue}{1}&\color{blue}{-1}&\color{blue}{1}&\color{blue}{-1}&\color{blue}{1}&\color{blue}{6}&\color{orangered}{-7} \end{array} $$Bottom line represents the quotient $ \color{blue}{ x^{5}-x^{4}+x^{3}-x^{2}+x+6 } $ with a remainder of $ \color{red}{ -7 } $.