(x-1)2=25 Two solutions were found :  x = 6  x = -4 Rearrange: Rearrange the equation by subtracting what is to the right of the equal sign from both sides of the equation : ...

There might be more than 1 ways. One method I use is through logarithms. Apply log on both sides. (x-1) log 4 =(x) log 3 x (log 4 - log 3) = log 4 => x = \frac{log 4}{log 4 - log 3} ...

Means we have to prove that 4^x-1 = multiple of 3. LHS= 4^x - 1 =( 2^2)^x - 1 =2^(2*x) - 1 =(2^x)^2 - 1^2 ; a^2 - b^2= (a+b)*(a-b) =(2^x - 1) * (2^x + 1) =product of number one less than a even ...

See below. Explanation: Making \displaystyle{e}^{\lambda}={5} we have \displaystyle{5}^{{-{{1}}}}{e}^{{\lambda{x}}}={3}{x} or \displaystyle\frac{{5}^{{-{{1}}}}}{{3}}={x}{e}^{{-\lambda{x}}}=\frac{{1}}{\lambda}{\left(\lambda{x}\right)}{e}^{{-\lambda{x}}} ...

5x=15 to the power of x equals 1Take the log of both sides log10(5x)=log10(1) Rewrite the left side of the equation using the rule for the log of a power x•log10(5)=log10(1) Isolate the variable x ...

Solution: \displaystyle{x}\approx{0.269} Explanation: \displaystyle{10}^{{{7}{x}}}={76} taking log on both sides we get , \displaystyle{7}{x}{\log{{10}}}={\log{{76}}}{\quad\text{or}\quad}{7}{x}={\log{{76}}}{\left({\log{{10}}}={1}\right)} ...