\displaystyle{x}={1} Explanation: \displaystyle{2}^{{x}}\cdot{5}={10}^{{x}} or \displaystyle\frac{{2}^{{x}}}{{{10}^{{x}}}}{5}={1} or \displaystyle{5}{\left(\frac{{2}}{{10}}\right)}^{{x}}={1} ...

See a solution process below: Explanation: First, multiply the \displaystyle{x} terms within the parenthesis using this rule for exponents: \displaystyle{x}^{{{a}}}\times{x}^{{{b}}}={x}^{{{\left({a}\right)}+{\left({b}\right)}}} ...

You must "undo" the order of operations in reverse! Explanation: Step 1: Divide both sides by 5: \displaystyle{18}^{{{6}{x}}}={\left(\frac{{26}}{{5}}\right)} Step 2: Apply properties of ...

Wataru Sep 20, 2014 The derivative of \displaystyle{f{{\left({x}\right)}}}={x}^{{2}}\cdot{10}^{{{2}{x}}} is \displaystyle{f}'{\left({x}\right)}={2}{x}{\left({1}+{x}{\ln{{10}}}\right)}{10}^{{{2}{x}}} ...

\displaystyle{x}=-{6} Explanation: \displaystyle{3}^{{6}}\cdot{3}^{{x}}={1} or \displaystyle{3}^{{6}}\cdot{3}^{{x}}={3}^{{0}} or \displaystyle{3}^{{{x}+{6}}}={3}^{{0}} or \displaystyle{x}+{6}={0} ...

\displaystyle{y}={0} is the asymptote Explanation: As \displaystyle{x} is made to approach \displaystyle-\infty also \displaystyle{y} approach the value zero. So, the graph approaches ...