You have proved that if d\mid a and d\mid b, and c=ax+by, then d\mid c. That is not at all what we want to show. The result will be easy once we prove: Lemma: If \gcd(a,b)=1, there exist ...

Let g=gcd(a,b). Whenever ax+by=cz we have g|cz, but since gcd(g,c)=1, g|z. So if a=a'g, b=b'g, z=rg, we are looking for solutions of a'x + b'y = cr, where gcd(a',b')=1. This ...

\displaystyle{A}={2} \displaystyle{B}={1} Explanation: Given: \displaystyle{A}{x}+{B}{y}={7}\ \text{ [1]} \displaystyle{A}{x}-{B}{y}={9}\ \text{ [2]} Substitute 4 for x and -1 ...

It's just a funny way to call a pretty elementary arithmetic operation: \frac{4238-97y}{95}=\frac{44\cdot 95+58-(95y)-2y}{95}=\frac{44\cdot 95}{95}-\frac{95y}{95}+\frac{58-2y}{95}= =44-y+\frac{58-2y}{95}

To show that V is closed under addition, we need to show that A+B lies in V (i.e. satisfies your linear equation) for any A,B \in V. Letting A = (x_1,y_1) and B = (x_2,y_2), we have to ...

Suppose d is a common divisor of these numbers, then d | 2n(2n+1)-(4n^2+1)=2n-1. But then d | (2n+1)-(2n-1)=2. So d is either 1 or 2. But both 2n+1 and 4n^2+1 are odd so d has to be ...