\displaystyle{k}=-{5} Explanation: We need that \displaystyle\frac{{{x}^{{2}}+{k}{x}-{6}}}{{{x}+{1}}}={q}{\left({x}\right)} with \displaystyle{q}{\left({x}\right)} a polynomial. Also ...

The remainder is \displaystyle{\left({90}\right)} and the quotient is \displaystyle={x}^{{3}}-{3}{x}^{{2}}+{9}{x}-{27} Explanation: Let's perform the synthetic division \displaystyle{\left({a}{a}\right)} ...

\displaystyle{\left({x}^{{3}}-{2}{x}^{{2}}+{4}{x}-{8}\right)} Explanation: \displaystyle-{2}{\left({a}{a}\right)}{\mid}{\left({a}{a}{a}\right)}{1}{\left({a}{a}{a}\right)}{0}{\left({a}{a}{a}\right)}{0}{\left({a}{a}{a}\right)}{0}{\left({a}{a}\right)}-{16} ...

\displaystyle\frac{{2}}{{7}} Explanation: Replace all the instances of \displaystyle{x} with the number 7: \displaystyle\frac{{24}}{{{2}^{{2}}{x}{\left({x}-{4}\right)}}}=\frac{{24}}{{{4}\cdot{7}{\left({7}-{4}\right)}}}=\frac{{24}}{{{28}\cdot{3}}}=\frac{{24}}{{84}} ...

The remainder is \displaystyle={9} and the quotient is \displaystyle={2}{x}^{{2}}+{2} Explanation: Let's do the long division \displaystyle{\left({a}{a}{a}{a}\right)} \displaystyle{2}{x}^{{4}} ...

As Gerry Myerson says, division in general has a remainder . You don't have \text{dividend} \div \text{divisor} = \text{quotient}\tag1 unless the remainder is zero. In general, what you have is ...