\displaystyle\frac{{{s}^{{4}}{t}^{{4}}}}{{{r}^{{5}}}} Explanation: Using the \displaystyle\text{rules of indices} \displaystyle•{a}^{{-{{m}}}}\Leftrightarrow\frac{{1}}{{a}^{{m}}} \displaystyle•\frac{{a}^{{m}}}{{a}^{{n}}}={a}^{{{m}-{n}}} ...

\displaystyle{\left(\frac{{1}}{{3}}{t}-\frac{{1}}{{9}}+{\left[{\left(.\right)}\frac{{{31}{t}+{92}}}{{{27}{t}^{{2}}+{9}{t}-{90}}}{\left(.\right)}\right]}\right.} Explanation: Write \displaystyle{t}^{{3}}+{8}\ \text{ as }\ {t}^{{3}}+{0}{t}^{{2}}+{0}{t}+{8} ...

\displaystyle\frac{{{16}{s}^{{20}}}}{{{t}^{{48}}}} Explanation: Refer below for the laws of indices which are used in this answer: Before we start simplifying inside the bracket, lets do ...

\displaystyle\frac{{4}}{{49}} Explanation: To solve this we just have to plug in 2 for t: \displaystyle{\left(\frac{{{t}^{{2}}-{2}}}{{{t}^{{3}}-{3}{t}+{5}}}\right)}^{{2}}\Rightarrow{\left(\frac{{{2}^{{2}}-{2}}}{{{2}^{{3}}-{3}{\left({2}\right)}+{5}}}\right)}^{{2}}={\left(\frac{{2}}{{7}}\right)}^{{2}}=\frac{{4}}{{49}} ...

See a solution process below: Explanation: First, rewrite the expression as: \displaystyle\frac{{18}}{{-{{3}}}}{\left(\frac{{r}^{{4}}}{{r}^{{2}}}\right)}{\left(\frac{{s}^{{5}}}{{s}}\right)}{\left(\frac{{t}^{{6}}}{{t}^{{3}}}\right)}\Rightarrow ...

r3s3t3-27a3/8 Final result : (2rst - 3a) • (4r2s2t2 + 6rsta + 9a2) ————————————————————————————————————— 8 Step by step solution : Step  1  : a3 Simplify —— 8 Equation at the end of step  1  : a3 ...