\displaystyle-{28.} Explanation: As per the Remainder Theorem, when a poly. \displaystyle{P}{\left({y}\right)} is divided by \displaystyle{\left({y}-\alpha\right)}, the remainder is \displaystyle{P}{\left(\alpha\right)}. ...

The result of the division is \displaystyle{3}{y}-{8} Explanation: we make a long division \displaystyle{3}{y}^{{2}} \displaystyle+{4}{y} \displaystyle{\left({a}{a}\right)} \displaystyle-{32} ...

\displaystyle{2}{y}^{{3}}+{2}{y}^{{2}}-{y}-{1} Explanation: \displaystyle\ \text{ }\ \ \text{ }\ {2}{y}^{{3}}+{2}{y}^{{2}}-{y}-{1} \displaystyle{y}-{1}{\left|\overline{{\cancel{{{2}{y}^{{4}}}}+{0}{y}^{{3}}-{3}{y}^{{2}}+{0}{y}+{1}}}\right|} ...

The answer is \displaystyle={2}{y}+{5} Explanation: Let's do some simplification, some factorisation \displaystyle\frac{{{12}{y}^{{2}}+{36}{y}+{15}}}{{{6}{y}+{3}}}=\frac{{\cancel{{3}}{\left({4}{y}^{{2}}+{12}{y}+{5}\right)}}}{{\cancel{{3}}{\left({2}{y}+{1}\right)}}} ...

\displaystyle{5}{y}^{{2}}+\frac{{14}}{{3}} Explanation: Expression \displaystyle={\left({15}{y}^{{3}}+{14}{y}\right)}\div{3}{y} \displaystyle=\frac{{{15}{y}^{{3}}+{14}{y}}}{{{3}{y}}} \displaystyle=\frac{{{15}{y}^{{3}}}}{{{3}{y}}}+\frac{{{14}{y}}}{{{3}{y}}} ...

\displaystyle{h}^{{2}}-{4}{h}+{16}-\frac{{48}}{{{2}{h}+{3}}} Explanation: One way is to use the divisor as a factor in the numerator. \displaystyle\text{Consider the numerator} \displaystyle{\left({h}^{{2}}\right)}{\left({2}{h}+{3}\right)}{\left(-{3}{h}^{{2}}\right)}-{5}{h}^{{2}}+{22}{h} ...