Because we assume that a,b>1 it follows that 2^n=1+ab>a+b=2^m. Hence n>m, and 1<a<2^m-1. Using b=2^m-a gives 2^n=1+ab=1+a(2^m-a)=1-a^2+2^ma. Reducing this modulo 2^m gives a^2-1\equiv0\pmod{2^m}. ...

\displaystyle={9}{p}^{{9}} Explanation: \displaystyle{\left({3}{p}^{{3}}\right)}^{{2}}\cdot{p}^{{3}} \displaystyle={9}{p}^{{6}}\cdot{p}^{{3}} \displaystyle={9}{p}^{{9}}

Well one mole of carbon specifies \displaystyle{6.022}\times{10}^{{23}} INDIVIDUAL carbon atoms, i.e. a mole of carbon......... Explanation: And thus we take the quotient....... \displaystyle\frac{{{1.35}\times{10}^{{24}}\cdot{C}\cdot\text{atoms}}}{{{6.022}\times{10}^{{23}}\cdot{C}\cdot\text{atoms}\cdot{m}{o}{l}^{{-{{1}}}}}}={2.24}\cdot{m}{o}{l} ...

It is not the same: it only goes in one direction. Yes, it is possible they are both true , but not a universal certainty. And, I don't think it has much to do with a^2-1 . If x \equiv 0 \bmod ma ...

First, if B is an n \times m matrix with n \not= m (it's not square) then B^{-1} will not exist. Only square matrices can have (two-sided) inverses. Second, in general (AB)^{-1}=B^{-1}A^{-1} ...

A general form of a exponential function can be defined as y(x)=a\cdot r^x with r>0. Now you can insert the given x/y values. 1= a\cdot r^{-1} 5= a\cdot r^{-2} Now divide the first equation by ...