2^x=8x\ \implies\ \frac 18 =x2^{-x}\ \implies\ \frac 18 =xe^{-x\ln2}\ \implies\ \frac {-\ln 2}8 =(-x\ln 2)e^{-x\ln 2} The point of this manipulation is to get the right hand side of the equation ...

Yes there are. There are infinitely many complex solutions for the equation 2^x = -1, in fact! We first rewrite 2^x=-1 as (e^{\ln 2})^x = e^{x\ln 2}=-1. Now e^{ix} = \cos x + i\sin x, ...

We know,\log_{10}10=1 But \log_{10}10=\log_{10}(2\cdot5)=\log_{10}2+\log_{10}5 \implies \log_{10}2=1-\log_{10}5=1-0.7=0.3 Now taking logarithm on the given equation x\log_{10}2=\log_{10}10=1 ...

\displaystyle{x}={\left({3.906891}\right)} (approximately) Explanation: Given \displaystyle{\left(\text{XXX}\right)}{2}^{{x}}={15} Since \displaystyle{{\log}_{{2}}{\left({2}^{{x}}\right)}}={x} ...

Use basic properties of logarithms to remove \displaystyle{x} from the exponent to find that \displaystyle{x}={{\log}_{{2}}{\left({20}\right)}}\approx{4.322} Explanation: We will use the ...

2^x\Bigl(2^x-1\Bigl) + 2^{x-1}\Bigl(2^{x-1} -1 \Bigl) + .... + 2^{x-99}\Bigl(2^{x-99} - 1 \Bigl)= 2^{2x}-2^x + 2^{2x-2}-2^{x-1} + .... + 2^{2x-198}-2^{x-99}= (2^{2x}+ 2^{2x-2} .... + 2^{2x-198})-(2^x +2^{x-1} + .... + 2^{x-99})= ...