Microsoft Math Solver

Noah G Nov 14, 2016 We have that \displaystyle{16}={2}^{{4}} , or \displaystyle{2}\times{2}\times{2}\times{2} . Writing in logarithms, we have: \displaystyle{{\log}_{{7}}{\left({16}\right)}}={{\log}_{{7}}{\left({2}\times{2}\times{2}\times{2}\right)}} ...

\displaystyle{{\log}_{{3}}{27}}+{6}{{\log}_{{3}}{9}}={\left({15}\right)} Explanation: Always remember when dealing with log functions \displaystyle{\left(\text{XXX}\right)}{{\log}_{{b}}{a}}={c}\Leftrightarrow{b}^{{c}}={a} ...

\displaystyle{{\log}_{{3}}{\left({3}\right)}}+{{\log}_{{2}}{\left({64}\right)}}={7} Explanation: We use identities \displaystyle{{\log}_{{a}}{a}}={1} and \displaystyle{{\log}_{{a}}{\left({a}^{{m}}\right)}}={m} ...

\displaystyle{{\log}_{{5}}{75}}-{{\log}_{{5}}{3}}={2} Explanation: Remember that \displaystyle{{\log}_{{a}}{b}}-{{\log}_{{a}}{c}}={{\log}_{{a}}{\left(\frac{{b}}{{c}}\right)}} \displaystyle\therefore{{\log}_{{5}}{75}}-{{\log}_{{5}}{3}}={{\log}_{{5}}{\left(\frac{{75}}{{3}}\right)}}={{\log}_{{5}}{25}} ...

\displaystyle{{\log}_{{2}}{12}}-{{\log}_{{2}}{3}}={2} Explanation: \displaystyle{{\log}_{{2}}{12}}-{{\log}_{{2}}{3}}={{\log}_{{2}}{\left(\frac{{12}}{{3}}\right)}}={{\log}_{{2}}{4}}={2}

Your answer is correct since \log (\log (10000)) = \log (\log (10^4)) = \log(4\log(10)) = \log 4