See a solution process below: Explanation: First, cancel common terms in the numerator and denominator: \displaystyle\frac{{\cancel{{{\left({15}\right)}}}}}{{{\left(\cancel{{{\left({4}\right)}}}\right)}{\left(\cancel{{{\left({x}^{{2}}\right)}}}\right)}{x}}}\times\frac{{{\left(\cancel{{{\left({28}\right)}}}\right)}{7}{\left(\cancel{{{\left({x}\right)}}}\right)}}}{{{\left(\cancel{{{\left({45}\right)}}}\right)}{3}}}\Rightarrow\frac{{7}}{{{3}{x}}}

\displaystyle\frac{{9}}{{x}^{{2}}} Explanation: Since we are multiplying 2 fractions we can cancel \displaystyle\ \text{ common factors} between the numerators and denominators. Remember ...

\displaystyle\frac{{x}}{{5}} Explanation: Multiply the top and bottom together, so \displaystyle\frac{{12}}{{{5}{x}}}\times\frac{{x}^{{3}}}{{{12}{x}}}=\frac{{{12}\times{x}^{{3}}}}{{{5}{x}\times{12}{x}}}=\frac{{{12}{x}^{{3}}}}{{{60}{x}^{{2}}}} ...

It is sufficient to find the minimum of f(x) = \frac{1.15^x}{x} Clearly because you have x in the exponent on the numerator and a polynomial in x on the denominator, f(x) is going to start ...

Original Equation: (3^x)*{8^(x/(x+1))}=36 8=3^( (log8) / (log3) ) Substituting this and using the laws of indices, the equation becomes 3^[x+{(log8/log3) * (x/(x+1))}] = 36 But 3 ^ [(log ...

\displaystyle{\left(\Rightarrow\frac{{4}}{{x}}\right.} Explanation: \displaystyle{\left(\frac{{{8}{x}}}{{{2}{x}+{6}}}\right)}\cdot{\left(\frac{{{x}+{3}}}{{x}^{{2}}}\right)} \displaystyle\Rightarrow\frac{{\cancel{{2}}\cdot{4}{x}\cdot\cancel{{{x}+{3}}}}}{{\cancel{{2}}\cdot\cancel{{{x}+{3}}}\cdot{x}^{{2}}}} ...