\displaystyle{x}={\frac{{{\log{{5}}}}}{{{2}{\left({\log{{5}}}-{\log{{7}}}\right)}}}} Explanation: \displaystyle{{\log{{5}}}^{{{2}{x}-{1}}}=}{{\log{{7}}}^{{{2}{x}}}} \displaystyle{\left({2}{x}-{1}\right)}{\log{{5}}}={2}{x}{\log{{7}}} ...

We could write from top to bottom like this: 5^(x-1) = 5^x - 5 5^x * 5^(-1) = 5^x - 5 (5^x)/5 = 5^x - 5 5^x = 5*(5^x - 5) 5^x = 5*5^x - 25 25 = 5*5^x - 5^x (As moving 25 to the left side and 5^x ...

12x-9x2=-2 Two solutions were found :  x =(-12-√216)/-18=(2+√ 6 )/3= 1.483  x =(-12+√216)/-18=(2-√ 6 )/3= -0.150 Rearrange: Rearrange the equation by subtracting what is to the right of the ...

After you perform long division x = -2 + \frac{3}{\log_45+1}

\displaystyle{x}={25.526} Explanation: \displaystyle{1.2}^{{x}}-{1}={104} \displaystyle{1.2}^{{x}}={104}+{1} \displaystyle{1.2}^{{x}}={105} Taking log on both the sides \displaystyle{\log{{\left({1.2}^{{x}}\right)}}}={\log{{\left({105}\right)}}} ...

\displaystyle{x}={4} . Explanation: \displaystyle{11}^{{{x}-{1}}}={1331} . \displaystyle\therefore{11}^{{x}}\cdot{11}^{{-{{1}}}}={1331} . \displaystyle\therefore{11}^{{x}}={1331}\cdot{11}={11}^{{3}}\cdot{11}^{{1}}={11}^{{4}} ...