\displaystyle{x}\approx{1.875}\ \text{ to 4 dec. places} Explanation: \displaystyle\text{using the }\ \text{law of logarithms} \displaystyle•{\left({x}\right)}{{\log{{x}}}^{{n}}\Leftrightarrow}{n}{\log{{x}}} ...

\displaystyle{x}={{\log}_{{10}}{30}}\approx{1.477} Explanation: \displaystyle{{\log}_{{b}}{p}}={q} is equivalent to \displaystyle{b}^{{q}}={p} Therefore \displaystyle{10}^{{x}}={30} ...

(5x^10^4)2Final result : (5•2x10000) Reformatting the input : Changes made to your input should not affect the solution:  (1): "x1"   was replaced by   "x^1". Step by step solution : Step  1 ...

102x=500 One solution was found :                   x = 5 Rearrange: Rearrange the equation by subtracting what is to the right of the equal sign from both sides of the equation : ...

Since you have used the notation of raising 10 to the power of x so I am assuming you know what it means. Keeping that in mind, you can also easily observe that as x(>=0) increases, so does the value ...

That's precisely what logarithms are for. In this case, the logarithm with base 10 (one of the two most common logarithms). 10^x=y take the logarithm on both sides: x=\log_{10}y Using the ...