\displaystyle{15}\cdot{10}^{{6}} Explanation: First of all, since the multiplication is commutative, you can deal with numbers and powers of ten separately: \displaystyle{5}\times{10}^{{7}}{\frac{{{9}\times{10}^{{-{3}}}}}{{{3}\times{10}^{{-{2}}}}}}={5}\cdot\frac{{9}}{{3}}\times{10}^{{7}}{\frac{{{10}^{{-{3}}}}}{{{10}^{{-{2}}}}}} ...

See a solution process below: Explanation: First, rewrite the expression as: \displaystyle{\left(\frac{{1.6}}{{2.18}}\right)}\times{\left(\frac{{10}^{{-{{3}}}}}{{10}^{{-{{3}}}}}\right)}\Rightarrow\frac{{1.6}}{{2.18}}\times{1}\Rightarrow{0.7339} ...

\displaystyle\frac{{25}}{{21}} Explanation: The numerator and denominator need to be simplified. Identify the separate terms first. \displaystyle\frac{{{\left({10}^{{2}}\right)}-{\left({2}\times{3}^{{3}}\right)}-{\left({4}\right)}}}{{{\left({2}\times{5}\right)}+{\left({8}\times{2}^{{2}}\right)}}} ...

One way is to put them all into scientific notation and rank by the exponent. Explanation: \displaystyle{8.01}\times{10}^{{2}},{1}\times{10}^{{−{1}}},{1}\times{10}^{{5}},{5.0}\times{10}^{{-{{1}}}},{3.79}\times{10}^{{0}} ...

See a solution process below: Explanation: First, rewrite the expression as: \displaystyle{\left(\frac{{6.25}}{{1.25}}\right)}\times{\left(\frac{{10}^{{-{{4}}}}}{{10}^{{2}}}\right)}\Rightarrow{5}\times{\left(\frac{{10}^{{-{{4}}}}}{{10}^{{2}}}\right)} ...

\displaystyle{8.5}\times{10}^{{-{13}}} Explanation: \displaystyle\frac{{1.445}}{{1.700}}\times\frac{{10}^{{-{7}}}}{{10}^{{5}}} \displaystyle\frac{{1.445}}{{1.700}}\times{10}^{{-{12}}} ...