You first convert each mixed fraction to an improper fraction: Explanation: \displaystyle{1}+\frac{{5}}{{8}}={1}\times\frac{{8}}{{8}}+\frac{{5}}{{8}}=\frac{{{8}+{5}}}{{8}}=\frac{{13}}{{8}} \displaystyle{3}+\frac{{1}}{{5}}={3}\times\frac{{5}}{{5}}+\frac{{1}}{{5}}=\frac{{{15}+{1}}}{{5}}=\frac{{16}}{{5}} ...

Reciprocal of 8 X 9 = \displaystyle\frac{{1}}{{72}} . Explanation: \displaystyle{a}^{{n}}.{b}^{{n}}={\left({a}{b}\right)}^{{n}} Here n = \displaystyle-{1}

Since the 11/31 term makes no difference to the manipulation, let's ignore it and ask instead, "Why can I write 1/(3/11) as 11/3?" Division inverts multiplication, by definition: a*b=c implies c/b=a, ...

First, convert the fraction on the left from a mixed fraction to an improper fraction then multiply the two fractions. See full explanation below: Explanation: First, convert the mixed fraction \displaystyle{1}\frac{{1}}{{4}} ...

\displaystyle{1} \displaystyle\frac{{1}}{{5}}\times{3} \displaystyle\frac{{2}}{{3}} \displaystyle= \displaystyle{4} \displaystyle\frac{{2}}{{5}} Explanation: \displaystyle{1} ...

See a solution process below: Explanation: First, rewrite the expression as: \displaystyle\frac{{13}}{{15}}\times\frac{{60}}{{1}}\Rightarrow \displaystyle\frac{{13}}{{15}}\times\frac{{{15}\times{4}}}{{1}} ...